0. 13 2.3. Simplified Relations between Cartesian and Bipolar Coordinates. ]_£ 2.4. Equivalent Configurations; Iseikonic Transformations ... 17 2.3. Significance of Iseikonic Transformations . 19 2.6. The Distorted Room Equivalent to a Rectangular Room .... 21 2.7. The Distorted Room Equivalent to a Rectangular Room (Analytical Derivation) . 23 2.8. Angular Coordinates for Observation with Head Movements . . 25 3 CHARACTERIZATION OF A METRIC BY QUADRATIC DIFFERENTIALS 3-1. The Metric of Plane Euclidean Geometry . 29 3-2. Two-dimensional Metric Manifolds in General . 30 3-3- General Coordinates in the Euclidean Plane . 31 3*4. Non-Euclidean Geometries in Two Dimensions . 32 3.5. The Metric of Three-dimensional Manifolds . 34 3-6. Non-Euclidean Geometries in Three Dimensions . 33 3-7- Geometries of Constant Curvature . 36 3.8. Constancy of Size. Rigid Transformations . 38 4 THE PSYCHOMETRIC OF VISUAL SENSATIONS 4.1. Assignment of Linear Size to Angular Differentials .... 40 4.2. Size Assignment by Observation with Fixed Head. 40 4.3. Size Assignment by Observation with Moving Head. 4.4. Relation of Both Methods of Observation. 42 4.5. Spherical Symmetry of the Metric.* * 4-5 4.6. Parallelism of Line Elements on the x-axis. 44 4.7. Vertical Rods on a Vieth-Muller Circle. 45 4.8. The Hypothesis M(y) = 1. ’ ^ 4.9. The Hypothesis of Constant Curvature.* * 43 MATHEMATICAL ANALYSIS OP BINOCULAR VISION Section 5 DERIVATION OF THE HYPERBOLIC METRIC OF VISUAL SENSATIONS 5.1. Observation of Objects in the Horizontal Plane . 5.2. Observations on Vieth-Muller Circles . 5.5. Observations on Vieth-Muller Circles (continued) . 5-4. The Hyperbolic Metric of Visual Sensations and the Relativ¬ istic Metric of Space-Time Manifolds . 5-5- Applications of the Result . 6 GEODESIC LINES: THE HOROPTER PROBLEM . 6.1. Formulation of the Problem . 6.2. The Corresponding Problem in the c, rj, C Space. 6.5. Relation of the x,y-plane and the r]-plane. 6.4. Geodesic Lines of the Horizontal Plane (Horopters) . 6.5- Frontal Plane Horopters . 6.6. Images of Geodesics in the £, r^-plane. 6.7. General Shape of Frontal Plane Horopters . 6.8. Vertex Curvature of Frontal Plane Horopters . 6.9. Frontal Plane Horopters in the Euclidean and Elliptic Geometry . 7 THE ALLEY PROBLEM 7.1. Distance Curves . 7.2. Discussion of the Distance Curves . 7-7. Parallel Curves in General . 7.4. Parallel Curves (1st Type) . 7-5* Parallel Curves (2nd Type) . 7.6. Interpretation of the Parallelism of 2nd Type . 7.7. The Projective Map of Geometries of Constant Curvature . . . 7.8. A Method for Determining cr and f. 8 RIGID TRANSFORMATIONS OF THE HYPERBOLIC SPACE 8.1. General Statement of the Problem . 8.2. Hyperbolic Rotations . 8.3. Hyperbolic Reflections . 8.4. Inversions: Hyperbolic Translatory Shifts . 8.5. Special Group of Rigid Transformations for Design of Distorted Rooms . 8.6. Numerical Calculation of Distorted Rooms . 8.7. Topological Discussion of Distorted Rooms Congruent to a Rectangular Room . 8.8. Congruent and Equivalent Rooms . . CONCLUSION . Page 51 51 57 58 60 61 62 64 65 66 67 69 70 73 74 76 77 78 80 83 84 86 89 89 90 91 94 95 98 102 103 INTRODUCTION 0ur a^m ln the following investigation is to develop a mathematical theory oi visual perception. In particular we are concerned with binocular vision, i.e. with the perception provided by the concerted action of two eyes. We hope to dem¬ onstrate that certain observations analyzed from a general geometrical point of * view lead to a theory of binocular vision, which has some rather interesting con¬ sequences and.which gives a natural explanation to certain well-known phenomena oi visual optics. Before developing this theory in detail, we shall outline the general premises upon which our solution of the -problem is based. 1* i‘,T<3 recognize, by binocular vision, that we are surrounded by a threedimensional manifold of objects. These objects have, besides characteristic qual¬ ities of color and brightness, form and localization. In a visual sensation we thus are not only immediately aware of a distribution of colors and brightnesses but also of the fact that certain of these qualities are combined to unities namely, objects, which have a definite geometrical form and a definite localiza¬ tion in a three-dimensional space. We shall call this space the visual space. Our problem is to investigate its geometrical character, i.e., the qualities of for>rn and localization in visual sensations. The concept of the visual space becomes clearer from the following consid¬ eration. .We can coordinate the "sensed" points in a particular visual sensation to the points of a three-dimensional geometrical manifold. This of course can be done in many different ways. We shall call the result of such a coordination a geometrical map of the visual sensation. Consider, for example, the coordination which is the basis of the projection theory of binocular vision. A sensed point s represented by.the intersection point of two projection lines which are drawn from lwo fixed points of the Euclidean space. The base points are the centers of rotation of the eyes and the projection lines the optical axes. 'We obtain by this construction a Euclidean map of the visual sensation. However, we cannot be sure that the map.represents truly the sensed qualities of form and localization of the objects* Thls would be the case the apparent distance of any two sensed points were aiways proportional to the geometrical distance of the associated points of the Euclidean map. Clearly, this is not true. Astronomical objects like the sun or the moon are seen at finite distances; their sensed size is also finite and in no way pro¬ portional to astronomical dimensions. Even the sky itself gives the impression of a dome ol unite radius. It certainly does not introduce any special size sensa¬ tion comparable to Euclidean infinity in its relation to finite Euclidean size. These considerations indicate our actual problem: To find a coordination ° .- i'°into 1 a v]’-:jual sensation to the points of a geometrical manifold suci that the apparent distance of any two sensed points is always proportional to the geometrical distance of the correlated points. A coordination of this' type is called a psychometric coordination. Whether or not such a coordination is possible is a psychological problem which requires a special consideration. Certain basic psychological facts which we shall discuss in § 1 indicate, however that in the case of visual sensations, a psychometric coordination is possible! Moreover, we 2 MATHEMATICAL ANALYSIS OF BINOCULAR VISION shall prove from these facts that the geometric manifold in which a psychometric map of visual sensations can be obtained Is uniquely determined. The geometry In this manifold then represents the visual qualities of form and localization in mathematical formulation. It establishes the possibility of measuring in the vis¬ ual space. Our above discussion of the Euclidean map obtained by projection from two centers does not prove that the visual space is a non-Euclidean manifold. It only shows that this method of coordination yields a map which is not psychometric. There could still exist other coordinations of sensed points to points of the Euclidean space which lead to psychometric map3. However, such a coordination will be impossible, If the visual space should be non-Euclidean. Let us illustrate this situation by the two-dimensional non-Euclidean man¬ ifold of points on the sphere. We can coordinate the points of the sphere to the points of the Euclidean plane and thus construct a plane map of the sphere. We may study the spherical geometry by the plane map and Its principle of construc¬ tion. However, we must not try to judge the actual 3ize or shape of objects on the sphere by the Euclidean size and shape of their images on the map. A map on which this is allowed is called Isometric and the coordination an Isometric trans¬ formation. In our example such a transformation Is imposoible: A sphere cannot be mapped isometrically to a plane. Instead of the spherical geometry let us consider the geometry on a cylin¬ der or on a cone. In these cases it is possible to construct isometric maps. We also may say that a cylinder or cone can be applied to a plane without "stretch¬ ing" the material from which It is made. The problem of Isometric mapping occupies a significant position in mathe¬ matics. In fact, we may consider this originally practical problem as the begin¬ ning of one of the roads which have led to the establishment of geometries differ¬ ent from the Euclidean geometry. In Gauss' theory of curved surfaces conditions were given for isometric transformation of surfaces onto each other. Riemann, after Gauss, generalized thbse results to manifolds of three and more dimensions and formulated their significance for the general space problem. The general re¬ sult is as follows : The geometry In a manifold can be derived from its metric, i.e., from a rule for measuring the size of small line elements. Two such mani¬ folds can be coordinated Isometrically to each other only under certain conditions which the metric of the first manifold must satisfy in relation to the metric of the other. If the second manifold is Euclidean, then these conditions give the answer to the question of whether an isometric Euclidean map of the first manifold can be constructed. Manifolds where the answer Is negative are called non-Euclidean; In this case no Euclidean map can be considered as true in all respects. Suppose now that we study visual sensations by the Euclidean map obtained by projection from two centers, or, in fact, by any other Euclidean map. This means that we try to interpret visual observations by applying indiscriminately the relations of Euclidean geometry. If the visual space should be non-Euclidean, then any conclusion we draw from our results must be questioned and we must expect eventually to find contradictions with observations. Such contradictions then can be eliminated only by reinterpreting our observations in a non-Euclidean visual space. 2. We can explore our environment in an entirely different way, namely, by physical measurements. With the aid of certain general principles the results of these measurements are combined mathematically and the environment Is recognized INTRODUCTION 5 as a manifold of physical objects. Their qualities are principally different from the sensed qualities of visual perception. Instead of colors and brightness we obtain optical qualities referring to reflection or transmission of light waves. Instead of sensed form and localization we have measured physical form and physical localization in a three-dimensional space. We shall call this space the physical space and have to distinguish it carefully from the visual space. We assume the physical space to be Euclidean in what is to follow. This is certainly justified in the environment where sensory depth perception by binocular vision is effective. Of course there is a certain relationship between the two spaces. This relation is established by the stimuli provided by the light which is emitted or reflected by physical objects. A small part of this radiated energy Is picked up by the dioptric system of our eyes and, by certain electrical and chemical dis¬ turbances, transmitted to the brain. The immediate and definite character of the associated visual sensation may tempt us to the belief that it is determined In all its qualities by these light stimuli. Indeed, if we subscribe to the projec¬ tion theory of binocular vision, we tacitly make this assumption, since we Identify physical and visual space. But even by considering these spaces as metrically different we can still believe in a necessary one-to-one correspondence of physical and visual space. A configuration of physical objects seems to create, by neces¬ sity, one and the same visual sensation for a given observer. However, this belief does not stand a critical test. Actually, a visual sensation is the response of a living organism to physical stimuli. Thus we can scarcely hope to find the explanation of visual sensations and their sensed quali¬ ties in the complicated chain of physical events by which the organism is stimu¬ lated. We must take account of other factors which are given by the organism it¬ self and not by the stimuli. These are psychological factors determined by the purposes, expectations, and the experiential background of the observer. By adopting this point of view we have to consider the following possibil¬ ity. Objects can be identical in certain aspects of physical form and localiza¬ tion but are seen as objects which differ in these aspects. Vice versa, two sen¬ sations can be Identical in all their qualities though related to different physi¬ cal objects. That this is true even in the realm of binocular vision Is clearly shown by some experiments carried out at the Dartmouth Eye Institute. A set of rooms with curved walls has been constructed; the walls are provided with curved window patterns. Every one of these distorted rooms gives the appearance of the same rectangular room, i.e., the same sensation is related to an Infinite set of physically different rooms. In a second experiment, perspective patterns are drawn upon a vertical board. The apparent localization of the board changes strikingly if the pattern is varied though physically the board is not moved. An Infinite set of apparently different localizations thus can be related to the same physical localization. ^We stress the point that in both demonstrations the ob¬ servation is binocular. We conclude from the above experiments that It "would be futile to attempt to express the relation of visual and physical space in the form of a necessary one-to-one correspondence. The qualities of visual sensations are not uniquely determined by the physical stimuli. Since, on the other hand, we cannot consider sensations and stimuli as entirely unrelated, we are forced to the conclusion that only certain special elements of visual sensations are determined by the stimuli. *The80 demonstrations have been designed by A. Ames, Jr. The mathematical analysis of the exper¬ iments has been given by A. Stein. 4 MATHEMATICAL ANALYSIS OF BINOCULAR VISION The, essence of the following theory will he that, in fact, there exist immutable relationships but that they are confined to the assignments of apparent size to physical line elements. Consider two infinitely close luminous points in the physical 3pace. Our hypothesis is that their apparent relative distance is deter¬ mined by the physical coordinates of the two points. For these differential or primitive size sensations and only for these we shall assume a necessary function¬ al dependence upon the cooresponding differentials of the stimuli. We stress the point that this relation of apparent size to physical qual¬ ities of localization is purely a mathematical relation. It does not Introduce the concept of physical causality and thus does not express sensory size qualities by physical units. In fact, it Is a relation of two geometrical manifolds to each other: The visual space obtained by psychometric coordination and the geometrical manifold which represents the physical space. Our postulate Is clearly compatible with the fact that visual sensations are not uniquely determined by the stimuli. Indeed, an actual sensation requires in addition to assigning size to its differential elements the Integration of these elements to a unity. Thus arbitrary parameters of Integration are available. These parameters are chosen by the observer and, in the choice, he depends on his psy¬ chological condition. The mathematical expression for the apparent size of a line element In terms of Its physical coordinates can be found by analyzing certain observations, i.e., by an inductive empirical investigation. On the other hand, this expression establishes a Riemannian metric for the visual space, namely, a rule for measuring the size of lnifinltely small line elements. Though referring to the infinitely small, it nevertheless already determines the general character of the visual space. It thus must give us the answer to the question whether or not the visual space Is Euclidean. Our answer will be that, in fact, the metric of visual sensa¬ tions is non-Euclidean. In particular we hope to demonstrate that the geometry of the visual space is the hyperbolic geometry of Lobachevski. Section 1 PSYCHOMETRIC COORDINATION 1.1. It seems to be paradox, at first sight, to Introduce the concept of a metric in a manifold of sensations, i.e., the concept of measuring psychological qualities by coordination of numbers. Indeed, psychological manifolds, like heat sensations, or sensations of brightness, do not seem to be provided with a metric. We may say that sensation' Si is greater or smaller than sensation S2, but not how much greater or smaller. How then can we speak about a manifold of sensations of space which has a non-Euclidean metric? It is, however, problematic whether greater or smaller is the only prop¬ erty of psychological manifolds which we may recognize. Consider, for example, the sensation of pitch in sound perception. pare three pitch sensations If trained, we are well able to com¬ Si, S2, S3 i.e., to judge whether the contrast (S2S3) is greater or smaller than the contrast (SiS2). In space sensations a similar phenomenon may be observed. Let us consider for example, the sensation of height. The contrast (SiS2), between two such sen- ,, g3 sations, is Interpreted as the size of the object between Sx and S2. Obviously we are in the position to judge whether (SiS2) is greater or . smaller than (S2S3). We also may say that, by our sensations of height, we assign vertical size independent of vertical localization. S| ^ ^ We shall show next that recognition of greater and smaller and recognition of greater and smaller contrast implies the existence of a metric and that this metric is in essence uniquely determined. 1 ■ ^‘ Let us first, tor simplicity's sake, consider a one-dimensional man¬ ifold of sensations. Our problem is to coordinate numbers, x, to the sensations, S, of this manifold. This, of course, can be done in a great variety of ways; let x = x(S) (1.21) be such a coordination, and let us also assume that the manifold of coordinated numbers, x, 1orms a continuous manifold. However, we require that this coordina¬ tion shall be such that and that if the contrast x(S2) > x(Si) if S2 > Si x(S3) - x(S2) > x(S2) - x(Si) (s3s2) > (S2Si) (1.22) Only if these conditions are satisfied can we consider the coordination as repre sentlng the characteristics 01 the sensations in question. 6 MATHEMATICAL ANALYSIS OF BINOCULAR VISION We 3how next that the "function" x(S) is In Its essentials uniquely deter¬ mined. Indeed, let X = X(S) be another coordination of the type (1.22). Then we may consider X as a mathematical function of x. This follows from the fact that to every sensation S there belongs one and only one number x and also one and only one number X. Consequently to a given number x there belongs one and only one number X, l.e., X = f(x). Furthermore, from x2 > Xi it follows that S2 > Si and thus X2 > Xi. Finally, from x3 - x2 > x^ - x± that (S3S2) >(S2Si) and thus that X3 - X2 > X2 - Xi. Thi3 means that the function X = f(x) must satisfy the conditions f(x2) > f(xi) if x2 > xi (1.25) f(x3) - f(x2) > f(x2) - f(xO if x3 - x2 > x2 - Xi whatever number Xi and x2 may be. From the last condition (1.25) and from the continuity of the function f(x), it follows that f(x3) - f(x2) = f(x2) - f(xi) (1.24) if x3 - x2 = x2 - xi. This last result we may formulate as follows: If x2 is the arithmetic mean VWj! x2 = ?(xi + x3) (1-25) of two numbers xi, x3, then the value f(x2) of the function f(x) at x2 is also the arithmetic mean of the values f(xi) and f(x3), i . e ., f(x2) = \ [f(xi) + f(x3)] (1.26) The only continuous functions f(x) satisfying this condition for any two values Xi, x3 are the linear functions X = f(x) = ax + b (1.27) where a and b are arbitrary constants. The arbitrariness of the constant a means that no absolute size is given but only relative size. (Change of unit of size.) The-arbitrariness of b means that the origin or the scale Is undetermined. In these limits, however, we see that the psychometric coordination o_f numbers To sensations "is uniquely determined, if the sensations allow recognition of greater and smaller and of greater and smaller contrast. We mention that this result can be obtained under very much weaker condi¬ tions. We need only to require that contrasts (SiS2) (S2S3) can be compared if S2 and S3 lie in the immediate neighborhood of Si. 1 5. In the case of sensation manifolds of more than one dimension, we have to proceed a little differently. Let us consider a two-dimensional manifold of sensations and coordinate these sensations S to the points P of a two- PSYCHOMETRIC COORDINATION 7 dimensional manifold m of points. The geometric relations in the point manifold shall be determined by a quadratic differential. da2 = edx2 + 2fdxdy + gdy2 (1-51) where x, y are the coordinates The above differential determines the distance of two oi a point P and e, f, g functions of x, y. * is called the metric of the point manifold; it neighboring points P = (x,y) and P' = (x+dx, y + dy). We assume again that it is possible to compare contrasts of sensations l.e., to recognize whether the contrast (SiS{) of two sensations Si and S{ is greater, and S2. equal to, or smaller than the contrast (S2S2) of two other sensations S2 We now require the coordination of sensations S and points P to be such R disi_P tha _ -fie distances day and da2 of the points Pi, p{ and P2, P2 give a true measure of the contrasts (SiS|) and S2S2), of two pairs coordinated "neighboring" sensations Si, Si and S2, S2. R. d-52 In other vopd3, ve require that da? eidx? + 2fidxidyi + gidy? = e2dx| + 2f£dx2dy2 + g2dyf = dal (1-32) if (Sisi) = (s2s2) and vice versa. Only with this condition satisfied can the coordination of sensations and points be considered as representing truly the characteristics of the sensations in question. We shall call it a psychometric coordination. Let us now assume that, for a given manifold of sensations, such a psycho¬ metric coordination is possible. Then we can show that, in essence, the point manifold m and its metric are uniquely determined. Indeed, let M be another manifold of points and dl2 = EdX2 + 2FdXdY + GdY2 its metric expressed In certain coordinates X, Y. (1-33) Let us assume that our given manifold of sensations can be coordinated psychometrlcally to M so that always df! | dzi if (SiS{) | (s2si) (1.34) and vice versa. Since the sensations o are coordinated in one-to-one correspond- ence to the points (x, y) of m as well as to the points (X, Y) of M, it follows that X, Y must be functions of x, y: x = x(*,y) Y = Y(*,y) We conclude furthermore by (1.32) $nd (1.34); ♦In § 3 the concept of a metric is explained in greater detail. (1-35) 8 MATHEMATICAL ANALYSIS OF BINOCULAR VISION The inequalities t eidx? + 2f1dx1dy1 + gidy? e2dxf + 2f2dx2dy2 + g2dyl laply the corresponding inequalities EidX? + BFidXidYi + GdY? = E2dX§ + 2F2dX2dY2 + G2dY§ whatever dxx. Uyi; dx2, dy2; and xi, yij x2, y2 may be. It is not difficult to see that this is possible only if the quadratic differentials da and dZ2 are related by the identity df2 = ada2 or EdX + 2FdXdY + GdY2 = a(edx2 + 2fdxdy + gdy2) (I.36) ’•'here a is a constant. pother words: By submitting the differential dZ2 of M to the transfor£a|_lon (JL • 35 j. the differential dq^ is obtained multiplied with a constant a. As ~e_ci"e, we may interpret thi3 appearance of an arbitrary constant a as indicat■Ln& the arbitrariness of the unit of 3ize In psychometric evaluation. In general It Is not possible to transform a given quadratic differen¬ tial edx + 2fdxdy + gdz2 into another one EdX2 + 2FdXdY + GdY2 with arbitrarily chosen coefficients E, F. G. The result that, in the case of the above differen¬ tials dcr and dX2, such a transformation is possible, points to the fact that, geometrically, the point manlfolds rn and M are identical. The points of M are , Identical with the points of m but characterized by different numbers X, Y instead 1 I»e., by different coordinates. It is clear that the geometrical characteristics of a point manifold must be independent of the choice of the coordinate system. It may be mentioned again that the above result already follows If all the three sensations Sj, S2, S2 lie in an infinitesimal neighborhood of Si; recogni¬ tion of greater or smaller contrast thus Is required only if two pairs of sensa¬ tions Si, S{; S2, S^ are sufficiently near to each other. 1.4. A similar consideration for sensational manifolds of three dimensions leads to an analogous result. If a psychometric coordination of sensations to a point manifold is at all possible, then there exists only one such manifold. The geometrical distance of two neighboring points P and P' given by a quadratic dif¬ ferential • da2 = gudx2 + g22dy2 + g33dz2 + 2gi2dxdy + 2gi3dxdz + 2g23dydz (1.4l) measures the contrast of the two associated neighboring sensations S and S'. The unit of the contrast size is the only Indeterminacy In this coordination. The question whether or not a geometrical manifold actually fits a given manifold of sensations according to the above contrast requirements can only be answered by an empirical investigation. For example, as to the space sensations oL binocular vision, we have no right to assume a priori that the Euclidean space, l.e., a manifold with the metric da2 = dx2 + dy2 + dz2 truly represents its characteristics. PSYCHOMETRIC COORDINATION 9 In the following, we shall assume the possibility of psychometric coordin¬ ation o_ 7ioual space sensations to a geometrical manifold. We shall also assume cnat contrasts of space sensations can be compared. This means we may compare the sizes of two arbitrary line elements in space even if these line elements are not atiachen _o the same base point. We then know from the above result that there exists cmy one geometrical manifold which represents the characteristics of binoc¬ ular vision psychometrically. Our aim is to determine this manifold. Section 2 BIPOLAR COORDINATES In order to facilitate the mathematical investigation of our problem, we Introduce first a suitable bipolar coordinate system. Thi3 system allows us to characterize a point of the physical, space by three angles a, 3,9 instead of by three Cartesian coordinates x, y, z. We shall discuss in this section the rela¬ tion of these two coordinate systems. 2.1. The Cartesian coordinate system is oriented relative to the observer as follows: His eyes are at the points y = — 1 of the y-axis, the x,y-plane is z his horizontal plane, the x,z-plane his median plane. We assume first that the observer views his environment without head movements so that--to be more precise--the centers of rotation of his two eyes remain at the points y = — 1 of the y-axis. We now construct a plane through the y-axis and through a point P of coordinates x, y, z. This plane is called the plane of elevation of the observed point. Let 9 be the angle of elevation, i.e., the angle of the plane of elevation with the horizontal plane. We draw next, in the plane of elevation, two lines from the eyes to the point P. a and 3 are the angles of these lines with the y-axis. As indicated in Fig. 1, we measure the angle a from the positive direction of the y-axis, but 3 from the negative direction. One verifies easily that the relation between the linear coordinates x, y, z and the angular coordinates a, 3> 9 given by the formulae 2 cos 9 y+ 1 x = 9 'cot a = cot a + cot 3 \fix2 + z‘ /! , y = cot a cot a - cot 3 + cot 3 ’ .cot 3 = l - y X2 + Z2 (2.11) 2 sin 0 Z = cot a + cot 3 ’ cot 9 = —z The transformation of the x, y, everywhere regular except on the y-axis. treats each plane of elevation alike, we of the horizontal plane. In thi3 case z = 0; 9 = 0, and thus 2 1 +y X = cot a + cot 3 * cot a = cot a - cot 3 y = cot a + cot 3 cot p X 3, 9 space is (2.12) BIPOLAR COORDINATES 11 V t— 0> C* = 0,(3=TT Fig. 2 We Illustrate this transformation of the x,y-plane into the angular a, 3-plane by deter¬ mining the region of the a, 3-plane which cor¬ responds to the right half-plane x = 0. This region is bounded by the y-axis and an ideal curve infinitely far away. The values of the angular coordinates a, 3 on the boundary are given In Fig. 2. They determine immediately the boundary of the domain of the a, 3-plane which corresponds to the half-plane x = 0 (Fig. 3). We conclude that the half-plane x = 0 is transformed into the Interior of the triangle shown in Fig. 3. To every point x > 0 there belongs one and only one point a, 3 in the Interior of this triangle. The transformation thus is regular in all interior points. As to the transformation of the boundary elements, we notice, however, a striking irregularity. The two eyes are transformed into two lines of the a, 3-plane. The sections -1< y < 1, y < -1, y > 1 of the y-axis, on the other hand, are compressed into 3 separate points (0, 0); (k, 0); (0 n) respectively. The significance of the bipolar coordinates for the physiological aspects of binocular vision is easily understood. Let us assume that the two eyes are in the 'primary position," l.e., the optical axes are parallel to the x-axis. Then a point P with coordinates a, 3, 0 is projected onto the retina of the right e-e with spherical coordinates (a, 0) and onto the retina of the left eye with soherlcal coordinates (3, 0). Indeed, the planes of elevation 0 = const. Intersect the two retinae in longitudinal sections, l.e., great circles through the retinal points on the y-axis. The cones a = const, intersect the retina of the right e^e in lateral sections, l.e., circles of latitude around the y-axis. The cones 3 = const, give.the lateral sections of the left eye. (Fig. 4) Fig. 4 12 MATHEMATICAL ANALYSIS OF BINOCULAR VISION We also notice that a line element (dx, dy, dz) attached to a point P will be projected as a line element (da, d0) onto the right retina and as (-dp, d0) onto the left retina. da, dp, d9 thereby may be found from dx, dy, dz by differ¬ entiating the equations (2.11). The quantity d0 determines the vertical extension of the line element, the quantity da + dp., the horizontal disparity, and finally -?(dp - da), the horizon¬ tal extension. As is well known in binocular vision, the sensation of depth is directly related to the horizontal disparity. Clearly, it would vanish if we let the dis¬ tance of the two eyes converge to zero. By the mechanism of our vision the two retinal images are seen as one fused image, provided that the horizontal disparity is not too great. The disparity in the horizontal direction, i.e., the difference of extension of the two images parallel to the y-axis, is perceived as a new space dimension of the line element, namely, depth, in addition to vertical and horizon¬ tal extension. It is characteristic for our bipolar coordinates that the two Images of a line element in space (dx, dy, dz) must have the same vertical extension d0 on the retina. It i3, however, easily possible by artificial means, for example in a stereoscope or haploscope, to provide the eyes with individual images which have different vertical extensions d9i and d02. Mathematically this would mean offer¬ ing to the observer line elements from a four-dimensional manifold da, dp, d9i and d92. However, even if this vertical disparity d9i - dO2 is small enough that a fused image is seen, there is no sensation of a new space dimension. In other words, our mind refuses to digest the well-meant offer of four-dimensional line elements--either the two images are not fused or, if fused, the vertical disparity is completely ignored. The bipolar coordinates a, P, 0 preserve their good physiological meaning if the eyes do not remain in the primary position but view objects directly by convergence. The angles a, p, 9 then determine the position of the two optical axes of the eyes. A point P then is projected into the center of the retina (fovea), the region of clearest vision. Also a line element (dx, dy, dz) attached to P is observed in the center of the retina. Its Images, however, are still characterized by the bipolar differentials (da, d0) and (dp, d0). d0 determines the vertical extension; -^(dp - da), the horizontal extension; da + dp, the hori¬ zontal disparity. Again da + dp is sensed as depth. It is true that eye movements are of a more complicated nature than as¬ sumed above. If the optical axes of the byes are moved to converge at a point P which is not in the horizontal plane, then this movement Is accompanied by welldetermined rotational movements of the retina around the optic axis. This tor¬ sional movement of the eyes has the effect that retinal points on the horizontal section (0 = 0) in Fig. 4, do not lie, after the movement towards P, in the plane of elevation through P. In other word3, our differentials (da, d9); (dp, d0) do not determine directly the location of the images of a line element in a coordi¬ nate system solidly engraved on the retina. In such a system we would obtain two sets of differentials--(da*, d0i*) and (-dp*, d02*) for the right and left eye respectively--which, of course, can be’ found from (da, dp, d9) if the mechanism of torsion is known. It is-a problem which of these different coordinates are sig¬ nificant for the interpretation and localization of the original line element: the coordinates da, dp, d0 in cur bipolar system oriented on the base line between both eyes, or the coordinates (da*, d0i*), (-dp*, dO2*) in systems solidly at¬ tached to the retinae. BIPOLAR COORDINATES 13 The following consideration seems to favor the assumption that the bipolar differentials give the significant clues for interpretation and localization, if the line element is viewed with both eyes. Consider two line elements with d9 = 0, I.e., line elements which lie in a plane of elevation. It is quite In¬ conceivable that the fact of their lying in a plane / / / / of elevation will not be recognized directly in spite of the fact that none of the quantities d9i*. d02 In the solidly attached coordinate systems vanishes. If the same combination of line elements, however, is viewed only with one eye, we can judge Its orientation probably only by referring to fixed coordinate lines on the retina. Binocular vision Big. 5 thus gives us, in addition to depth perception, a greater certainty In directional localization, namely, orientation relative to the base line of the two eye3. Exactly this fact. however, is expressed in our bipolar coordinates. For this reason we shall base our considerations in the following upon the bipolar coordinates a, 3, 0 and disregard torsional movements of the eyes. 2.2. Modified bipolar coordinates. For many purposes it Is advantageous to use a modification of the bipolar coordinates a, {3, 0 which expresses more di¬ rectly their physiological meaning. We introduce the bipolar latitude and the bipolar parallax 9 = i(P - a) V=n - a- 3 (2.21) (2.22) For a discussion of these modified coordinates y, 9, 9 we may confine ourselves to the horizontal plane 9=0. The meaning of yis clear; the angle subtended by the lines of sight at the point of convergence, P. Obviously, y may vary from 0 to n. For the inter¬ pretation of 9 construct the circle through P and the eyes R and L. (Vieth-Muller circle.) The x-axls is intersected at P0 and Q0 by this circle. One easily proves that the angle under which the arc P0P appears from either R, L, or Q0 is equal to 9 = -§(3 - a). This shows that it is justified to interpret 9 as determining the lateral position of a point P. A line element (dx, dy, dz) attached to a point P can be characterized by the differentials dY, d9, d9 . From our former considerations it follows that 19 and d0 determine the lateral and vertical extension of the retinal Images and that dy measures the horizontal dis¬ parity. The latter is sensed as depth extension of the line element. 14 MATHEMATICAL ANALYSIS OF BINOCULAR VISION One proves readily that the relation between Cartesian coordinates x, y, z and bipolar coordinates y, 9, 0 is given by the formulae: cos 29 + cos y X cos 0, sin y tan Y 2 /x2 + z2 x2 + y2 + z2- 1 y - sin 2 9 sIn y ’ cos 29 + cos Y z sin 0, sin y tan 29 = 2y y/x2 + z2 x2 + z2 - y2+ 1 tan 0 = (2.23) the horizontal plane cos 29 + cos y X sin y y = s in 29 sin y 2x tan y = x 2 + y 2 - ,1 tan _ 29 = —g2x-y—2 x -y +1 (2.24) It follows that the curves y = const, are given by the Vieth-Muller cir¬ cles through the eyes: x2 + y2 - 2x cot Y = 1 (2.25) and the curves 9 = const, by the hyperbolae of Hlllebrand -x2 + y2 + 2xy cot 29 = 1 (2.26) through the eyes. These hyperbolae have the asymptotes y = x tan 9 (2.27) i.e., lines through the origin of direction 9. At any practical distance the hyperbolae 9 = const, coincide with these lines, as can be seen in Fig. 7* This demonstrates again the justification of Interpreting 9 as characteristic for the lateral position of a point P and d9 as lateral extension of a line element. In order to investigate the regularity of the transformation (2.23), let us determine the domain of the Y, 9-plane into which the half-plane x = 0 is transformed. Fig. 8 shows the values of 9 and Y on the boundary of the half-plane x = 0. At infinity we have y = 0. At the right eye: y - 29 = rc At the left eye: Y + 29 = n; This gives as domain in the y, 9-plane a triangle bounded by sections of the lines Y - 0, y - 29 = 7t, y + 29 = 71. The eyes are stretched into the lines and y - 29 = 71 Y + 29 = n BIPOLAR COORDINATES Fig. 15 16 MATHEMATICAL ANALYSIS OF BINOCULAR VISION The remaining sections of the y-axis are compressed into three single points (0, 71/2); (0, -n/2) ; (n, 0). The transformation is regular at interior points but highly irregular on the boundary. 2.3. Simplified relations between Cartesian and bipolar coordinates. In many practical applications we can replace the relations (2.23) by simplified approximate formulae by considering the distance of the eyes and thus the bipolar parallax y as small. We may replace in (2.23) sin y by y and cos y by 1, and ob¬ tain 2 cos2 9 cos 9 x = ---— Y 2 sin 9 cos 9 y Y 2 /x2 -t z2 Y x2 + y2 + z2 tan 9 y yrx~2 +: zi2 (2..31) - 2 - cos2£ 9 si- n 9 , t. an a 0 z Y X These relations may be used safely lor objects which are far enough away from the eyes (x > 30, for example). In the horizontal plane we havd 2 cos 9 x = -:- , Y 2 sin 9 cos 9 y - Y 2x 2, 2 x +y tan 9 = I x (2.32) The curves y = const, are now circles x2 + y2 - 2y x 0 (2.35) through the point x = y = 0 with centers on the x-axis. The curves 9 = const, are the straight lines> y = x tan 9 through the origin (Fig. 10). (2.34) BIPOLAR COORDINATES 17 This result allows us easily to determine the domain in the y, 9-plane into which the half plane x = 0 is trans¬ formed. y can assume all values between 00 and 0, and 9 all values between - tc/2 and + n/2. The transformation is regular at all Interior points x > 0. The irregularity of the boundary coordination is illustrated In Fig. 11 and Fig. 12. dot! = da2 or d Yi = d y2 C\J CCL II dPi d 9i = d9s d0x = d02 dGi = d02 (2.41) Su^h line elements give to an observer the same binocular clues on the retinae, i.e., the same horizontal disparity dy, the same lateral extension d9 and the same vertical extension d0. For this reason we call such line elements binocularly equivalent. Since most external objects may be considered as configurations of line elenients--a curve in space is a one-parameter manifold of line elements, a surface in space a two-parameter manifold of line elements--we may extend the concept of equivalence to such configurations. 18 MATHEMATICAL ANALYSIS OF BINOCULAR VISION Consider, for example, a curve in space. We may characterize it by three functions a = a (t) 3 = 0(t) (2.42) 0 = 0 (t) ■where t is a parameter. Another curve in space must be considered equivalent to this curve it its line elements da1, d3 1 , d01 are equal to the line elements of the original curve. This obviously is the case then and only then if a' = a(t) + 6 P' = 0(t) + e (2.43) 6 • = 0 (t) + X 6, e, X being arbitrary constants. In a similar manner we obtain equivalent surfaces. In parametric form by three functions. A surface Is obtained a = a(s, t) 3 = 3(3, t) 0 = 0 (s, t) which determine a two-parameter manifold of line elements (2.44) da = a8 ds + at dt d0 = 3S ds + 3t dt d0 = 0a ds + 01 dt (2.45) Another surface a1, 3', 9' ds equivalent to this surface if its line ele¬ ments da', dp', d01 can be coordinated to the original line elements such that da' = da d 3' = dp d01 = d0 This leads immediately to the result that an equivalent surface must have the form a1 = a(s, t) + 6 3' = 3(3, t) + e 0' = 0(s, t) + X where §, e, X are arbitrary constants. (2.46) BIPOLAR COORDINATES 19 We may integrate the above results from a more general point of view by interpreting the relations a' = a + 5 0' = 3 + e- (2.47) O' =0 + X as a group of transformations of the angular a, (3, 0 3pace. In fact, they repre¬ sent the simplest type of transformations of this space, namely, translatory shifts. If these transformations, however, are formulated in the Cartesian y> z coordinates, an interesting and in no way trivial group of transformations of the physical x, y, z space is obtained. A general investigation of these transformations should give us many general results interesting for binocular vision. Any configuration submitted to such transformation will be seen by the same sequence of retinal images before and after the transformation. For this reason we shall call the transformations (2.47) iseikonic transformations. Math¬ ematically we recognize Immediately a characteristic feature of these transformations. A cone a = const, through the right eye is transformed into another cone through this eye. Similarly a cone 0 = const, through the left eye into another such cone. These two basic sets of cones thus are transformed without distorting but only interchanging the individual cones. ii" we prel er the use of the modified coordinates y, iseikonic transformations by the relations 0 we can express Y' = Y + x 9' =
, d0, and still be of entirely different physical size. If these "local signs" dy, dq>, d9 are the only basis for visual sensations, then It Is hard to understand how we can judge the difference in actual size with such remarkable accuracy. Is this judg¬ ment obtained purely by former experience, or is it at least partly an element of direct visual sensation? In other words, is judgment of size only the result of training, or can we assume that it has developed from a seed which Is an Immutable part of primitive sensation of space?
The-fact that two line elements can have the same impinging characteris¬ tics dy, dcp, d0, but different apparent linear size, forces us to reconsider the significance of the absolute values y, 9, 0, especially of the convergence y. We shall. In §4, relate the apparent size ds of a line element dy, d9, d0 to the bipolar parallax, y, i.e., to the convergence of the eyes. We shall not attempt to explain this relation of size estimation to convergence physiologically, but shall consider it as a hypothesis necessary for the solution of our problem: To establish a metric for the manifold of visual sensations.
By the introduction of the convergence y as a significant element of bi¬ nocular vision, we have to conclude that equivalent configurations can not be truly indistinguishable. However, we shall see that our postulated relation of apparent size and convergence does not necessarily mean absolute localization In space. On the contrary, the special functional relation of both which we shall establish In §6 allows an even greater group of configurations metrically equiva¬ lent to a given configuration. This means that a group of transformations of the space exists which transforms a given configuration Into other ones with identical binocular characteristics. These transformations we shall call rigid transformations, and two configurations of this type, congruent configurations. Instead of a three-parameter group as the iseikonic transiormatlons, we shall -ind a sixparameter group of rigid transformations. Ames's postulate of the existence of a group of surfaces Indistinguishable from a given surface thus Is evqn more guaran¬ teed, if we Introduce into binocular vision the convergence y as a significant
factor.
BIPOLAR COORDINATES
21
In. §8 we shall derive a set of distorted rooms with Vails congruent to the plane walls of a rectangular room. The result will be, that these congruent rooms are nearly identical with the equivalent rooms to he derived in §2.6 and 3 2.7, though obtained from entirely different mathematical principles. We thus may consider equivalent rooms as a good approximation of congruent rooms. However, we shall see that the differences between both types are great enough to be easily observable. To compare the Impressions of both types of rooms as to the convic¬ tion of seeing an ordinary rectangular room can be considered a direct test of the two theories.
2.6. The distorted room equivalent to a rectangular room. We assume that the walls of an originally rectangular rooms are given by the planes
x = x0
y - -y°
(2.61)
Z = ±Zo
We consider a special iseikonlc transformations of the space represented by the relations
Y' = Y + T
/Ed£2 + 2Fd^dr] + Gdr)2 /e6£2 + 2F5E,bri + Gbr)
based upon the quadratic differential (5-32) must be the same as the angle found by (5-13).
Furthermore, the geodesic lines of the differential (3-32), i.e., uie curves for which the Integral
Ed£2 + 2Fdcdr] + Gdr]'
assumes a minimum, must be given by functions vhlch In the curved coordinate system lead to the straight lines of the Euclidean plane.
The property which all the quadratic diit erentials (5.52) have in common obviously is that they are obtained from (5.12) by a transformation of the coordinates. Vice versa, we may say that, by a suitable transformation of the coordinates, the line element (5-32) can be transformed Into the normal form (5.12).
5.4. The above consideration leads us to the ques¬ tion: Suppose a geometrical manifold is given, and, after choosing a coordinate system in it, we obtain a metric differential
CHARACTERIZATION OF A METRIC BY QUADRATIC DIFFERENTIALS
33
ds2 = Ed%2 + 2Fd!-dr) + Gdrj2
(3-41)
where E, F, G, are known functions of % and rj . Is it then always possible to find a transformation
x = ffe , tj )
(3.42)
y = g(E , rj )
of the coordinates such that in the new coordinate system the line element (3*41) assumes the Euclidean form ds2 = dx2 + dy2? Since the transformation (3*42) is the analytical expression for drawing in the Euclidean x,y-plane a map of the given metric manifold (3*41), it then would be possible to obtain a plane isomet¬ ric map of the given two-dimensional manifold. •In other words : Euclidean meas¬ urements of size on the plane map would give the size of objects in the original manifold (3.4l).
The answer to our question, however, is negative: Unless the functions E, F, G -satisfy a certain mathematical condition, the desired transformation is impossible. Indeed, if the functions E, F, G are given, then the equations (3*33) represent a system of three partial differential equations of first order for two unknown functions f(l-, rj ) and g(£ , j] ) . The system, obviously. Is overdetermined and in general will have no solution. A solution can be expected only If the functions E, F, G satisfy a certain mathematical condition. If we interpret the geometry associated with a quadratic differential
ds2 = Edx2+ 2Fdxdy + Gdy2
(3.43)
as the geometry on a curved surface in the three-dimensional Euclidean space—as we always can-then the formulation of the above condition is given by Gauss' theorems egregium: The Gaussian Curvature K of a surface can be derived from the coefficients E, F, G of the metric differential (3.43). The curvature K of the Euclidean plane is zero, and, as a geometrical quantity, must be zero for any choice of the coordinate system. This means, for a differential (3*43) which has been obtained from the Euclidean differential ‘ds2 = dx2 + dy2 by transforma¬ tion of the coordinates, that the result of introducing the functions E, F, G into the Gaussian expression for E mus l be identically zero. Also the reverse is true: If the i unctions E, F, G satisfy the condition K = 0, then a transformation (3*42) can be found which transforms the differential (3.43) into the normal Euclidean form ds2 = dx2 + dy2. A line element (3*43) of this special type is called a Euclidean line element.
It is not difficult to give examples of non-Euclidean line elements. The geometry on a sphere of radius one is characterized by the metric differential
ds2 = dx2 + sin2 x dy2
(3.44)
where t} , 0
z = M? , 7] , c)
(3.61)
°f analytlc representations of (3-51) may be obtained, namely
quadratic differentials of the general form
’
ds = gud? + g22d7j + g33d t,2 + 2g12d£dT) + 2g13d^dC + 2g23d71d£
(3-62)
tion. of tv,*
p’i^v , cceerrttaaiinn 1fnunnoc1t1ionnnqs of £c , q, £y , name-«ly, quadratic combina¬
tions of the first derivatives of the functions f, g, h:
hi = fp2 + g>c?2 + h 2
g22 = fn2 + gA^2 + h^2
g33 = f ^ + g £ + h £
gl2 = f?fq +
613 = fB,fC + g^Sc + h?hc
gsa = f Tjf ? + gqg^ +
(3.63)
All these different forms have in common the fact that a transformation can be
found which transforms (3.62) into the Euclidean normal form [”
h 1 e
tries derived t rom these differentials thus have the character of the soliS
Euclidean geometry.
iiU
ferentlalh(3
“wh^h^ U’))0wlns probleffl; Consider a general quadratic dif-
^ M 52 possible to
8111
general such a transformation is impossible. InTa-t
—hZ-t
' 1
obtain for the three functions f, g, h, of a transformation (3*61), a sjlTem ™
(3.63) of six quadratic differential equations. This system is overdetenSined
and has thus, in general, no solution. In order to insure the existence of a
solution, three conditions must be satisfied by the coefficients gik. These
36
MATHEMATICAL ANALYSIS OF BINOCULAR VISION
conditions can be derived from Riernann13 Tensor of Curvature. a generalization of Gau33 curvature to the case of manifolds of three dimensions. The three essen¬ tial components of Riernann's tensor can be expressed in terms of the functions glk and their derivatives. If the differential (3-62) represents a Euclidean line element, then all components of Riernann'3 tensor are Identically zero. Vice versa if the components of this tensor are Identically zero, then a transformation (3.61) may be found which transforms (3-62) Into the Euclidean normal form (3-51), so that the manifold in question is isometric to the Euclidean space. This re¬ sult implies the remarkable fact that the question whether or not a given metric manifold of three dimensions is Euclidean can be answered by measurements in the manifold Itself. It means the curvature of such a manifold can be recognized even if observation from a viewpoint In an additional fourth dimension is impos¬ sible.
3.7. Among the general metric differentials
ds = gudx2 + g2sdy2 + g3sdz2 + 2g12dxdy + 2g13dxdz + 2g23dydz
(3-71)
there exists a special group distinguished by the property that Riernann's tensor 0l curvature I3 constant, l.e., its three components are Independent of the lo¬ calization. Riernann ha3 shown that all these line elements of constant curvature can be transformed into a normal form similar to (3*^6) In case of two dimensions:
ds2 =
d£2 + dn2 + dC
[L + £ K (^2 + T!2 + C2)]
(3.72)
where K is a constant, namely, the cobstant Riemannian curvature of the threedimensional manifold.
For K = 0 we obtain the Euclidean geometry:
ds2 = dc2 + dr]2 + dC2 For K < 0, for example K = + 1, the elliptic geometry:
(3.73)
ds2 =
E
d^2 + dii2 + df
n2 + f)]
For K > 0, for example K = -1, the hyperbolic geometry
(3.74)
ds2 = d e + d t] + d
E-i< f n + 2 + t2)]
(3.75)
Instead of Riernann's normal fora, we shall use later on another form which Is found by (3-72) by introducing polar coordinates
^ = R cos 9 cos 0
N = R sin 9
(3-76)
£ = R cos 9 sin 0
CHARACTERIZATION OF A METRIC BY QUADRATIC DIFFERENTIALS
This gives
^ 2 _ dR + R (d cp2 + cos2^ d 02)
(i +f R2)2
37 (3-77)
The geodesic distance D of a point P from the origin ob¬ viously Is obtained by summing up line elements ds which have no lateral or vertical extension d , d0 . -The dependence of this size factor M on the distance D Is given by (3.782), I.e., it Is
M = sin D M= D M = sinh D
In the elliptic case K = 1 in the Euclidean case K = 0 in the hyperbolic case K = -1
(3.783)
element is advantageous. We submit (3.78I) to the f
K = 1:
- tan D = a (y + n)
K = 0: K = -1:
- log -jy D = a (y + p) - t a nh-^ D = 0 (Y + H)
(3.79)
where a and g are constants and y a variable replacing the distance D. It follows quite easily that
K = 1: ds2 =
1
cosh a (y +
K = 0: ds2 = 2 e_2cI ^7 + P)
K = -1: ds2 = -—— 1 ---sinh2 a (y + p )
2d y2 + d 0 is Imaged into a sickle-shaped figure which lies inside the unit circle of the £ , r] -plane.
GEODESIC LINES: THE HOROPTER PROBLEM
65
6.4. The geodesic lines of the horizontal plane (Horopters). The geodesic lines of the horizontal plane are the solutions of the problem of variation
fHY) /^2 dy2 + d
(6.51)
GEODESIC LINES: THE HOROPTER PROBLEM
67
The constant k characterizes the point x0 vhere the horopter intersects the x-axis. Indeed, for cp = 0 ve have in the three cases
k = cosh cr (y0 + (i) k = iea(Yo +
k = sinh o’ (Yo + 4) vhere yQ then determines the point xQ by
Xo = cot Yo
(6.52) (6.53)
form
V/ith the aid of (6.32) we may write the frontal plane horopters in the
.
cosh a(y + jjl)
Hyperbolic geometry: ---y-= cos q>
cosh cr (Yo + p.)
Euclidean geometry: e°^ Y°) = cos 9
(6.54)
PV] , ,.
,
Elliptic geometry:
sinhcr(y + li) sinha(yo + p.)
= cos © r
Since the right side cannot be larger than one, and since on the left side we have functions of y which are monotically increasing, we conclude that on all of these curves
Y * Yo
(6.55)
In other words: The frontal plane horopters lie outside the Vieth-Muller circle through the median point xQ of the horopters (Fig. 54).
Fig. 54
6.6. The geodesic lines of the horizontal plane assume a remarkably simple form if the £ , r\ map of our geometries is chosen. Ve know that these geodesic lines then are given by the llghc rays In a medium of index of refraction
n = 1 + ep
(6.61)
We obtain these "light rays" by Introducing p = e~a^Y+4) Jn thQ general equation (6.48). This gives
66
or where
MATHEMATICAL ANALYSIS OF BINOCULAR VISION
2k p cos(9 - To) = 1-1 - sp 2 S2 + n2) + 2(S.So + n.rio) = 1 So = k C03 To, >1o = .k sin cp0.
(6.62) (6.63)
Obviously these curves are circles in case of the hyperbolic or elliptic geometries (e = — l), and straight lines in the Euclidean case (e = 0).
Without 103s of generality we may assume rj0 = 0 and thus discuss only the frontal plane horopters symmetrical to the ^-axis. Indeed, all other geodesic lines may be obtained from these special geodesic lines simply by rotation around the origin £ = 7] = 0.
form
In the hyperbolic case, e = -1, we write the resulting equation in the
(5 - S0)2 + V2 =
- l
(6.64)
and recognize a circle around a point f;0 > 1 of the %-axis which Intersects the unit circle at right angles (Fig. 55)• The geodesic- lines of the hyberbollc
Fig. 55
geometry thus are resresented in the i-, rj map of this geometry by the circles which Intersect the unit circle at right' angles.
In the elliptic case we have
(S + So)2 + 42 = 1 + S o
(6.65)
and recognize a circle around the point -£0 which goes through the points r) = -tl of the unit circle (Fig. 56). The geodeslc lines of the elliptic geometry thus are given by the circles which Intersect the unit circle at two points at oppo¬ site ends of a diameter.
The geodesic lines of the Euclidean geometry finally are simply the
straight lines of the
r)-plane (Fig. 57)*
GEODESIC LINES: THE HOROPTER PROBLEM
69
6.J. The above results can be used in a simple
way to determine the general form of the horopter
curves in the physical x,y-plane. We have seen
(Fig. 53) that the half-plane x * 0 is represented in
the
’l-plane by a moon-shaped domain. If we draw In
this domain the horopter curves of the hyperbolic ge¬
ometry, for example, we observe Immediately that these
curves are divided into two groups (Fig. 58)• The
curves of the first group go from the median point,
directly towards the boundary circle p = px (infin¬
ity of the x,y-plane) without leaving the domain. The
curves of the second group, however, cross first the
red lines (eyes), leave the domain, cross the same
red lines again, and then reach p = p 1 in the original domain. These two groups are separated by one horopter which just touches the red lines.
This means, in the x,y-plane, that the horopter curves of the first group go from a point x m of the x-axis without leaving the half-plane x = 0, towards infinity which is reached, asymptotically at a certain angle
?co < ti/2.
The curves of the second group go from their median point x m to the eyes, cross Into the left half-plane x < 0, loop back through the eyes into the right half¬ plane, and approach infinity asymptotically. This general behavior Implies that, for great values of xm, the horopters must be convex towards the left and for small values of xm concave to the left. At a certain median point xm = xQ, the horopter will be nearly flat. This is Illustrated In Fig. 59, where a schematic drawing oi these curves is given. For a numerically correct picture refer to Fig. 71.
The geodesic lines of our hyperbolic geometry thus have, in the x,y-plane a general form which agrees perfectly with the horopter curves determined'by'ex¬ periment in the neighborhood of the x-axis. However, we cannot consider this as
70
MATHEMATICAL ANALYSIS OF BINOCULAR VISION
evidence for the hyperbolic geometry, since the two other geometries furnish horopter curves with the same phenomenon: changing. In the neighborhood of a point
X? J ® X"aXi!' fr0m.COncave to convex curves. This can be seen by replacing in
~g‘ 5
e geodesic lines of the hyperbolic geometry by the proper geodesic lines
oi the Euclidean and elliptic geometry (Fig. 60).
Euclidean Geometry
Fig. 60
Ell.pt.ca/ Geometry
6.8. The phenomenon that frontal plane horopters are concave In the neigh¬ borhood of the observer but convex at greater distances can obviously be used for a numerical test of the theory. We determine for this purpose in this section the curvature of the horopter curves on the x-axis. We carry out the calculation only for the hyperbolic metric.
The frontal plane horopters of the hyperbolic metric are given by the first equation (6-54) :
In the neighborhood of 9
cosh g(y +F ) cosh a ( Yq + p)
0, we have
cos 9
(6.81)
and
cosh a(Y + h) = cosh cr(Y0 + N) + a sinh cr(Yo + F) Ay +
cos 9 = 1 - -|92 +. Hence we may replace (6.8l) by
AY = - ^ coth a ( Yq +N)?2
(6.82)
If we are Interested only in the shape which the curves have in the immediate neighborhood of the x-axis.
GEODESIC LINES: THE HOROPTER PROBLEM
71
We next have to translate the relation (6.82) Into Cartesian x,y coor¬ dinates. From the transformation formulae
x = cos 29 + cos Y slnl'
3 in 2q> y = sin y we conclude for small values of 9 that
(6.83)
■ _ 1 - 2y2 + cos Yo - sin YpAy
sin Yo + cos YqAy
+
1 + cos Yo •4 1
sin Yo
29:
1 + cos Yo
ay
} +
Sin Yo .
(6.84)
The expression on the right side contains all terms of second order in 9 since
Ay Is by (6.82) of second order in 9 so that (AY)2, etc., may be omitted for our
purpose.
By subtracting xG =
from (6.84), we find
Ax Now, if using (6.81),
1 + cos Y( sin Yo
29'
Ay
+
1 + cos Yo sin Yo
we obtain
Ay = C'9
A. x = _ - 1 - + -cL os ° Yo sin yo
(2 tan A1 yo + c) 2
The second equation (6.83) gives to a sufficient approximation
9 = sin yo y and thus, by introducing this in (6.87), we have
Ax = -I 0032
(2 tan iYo + 0)y=
(6.85)
(6.86)
(6.87)
(6.88)
(6 86) Thi3 13 3 Parab°la whlch ha3 the 3ame curvature K as the original curve
We thus may formulate the theorem: If a curve which is symmetrical to
the x-axls has, for small values of 9, the development
-
ay = C92 + . then the curvature of this curve on the x-axls is given by the expression
72
MATHEMATICAL ANALYSIS OF BINOCULAR VISION
With the aid of this result we obtain the curvature of the horopter curves (6.8l) by Introducing from (6.82) the value
C = - — coth c(y6 + p)
It follows
K = + cos2 -|yo { -2 tan j?yo + 7^ coth o(yo + p)J
(6.891)
in which Y0 characterizes the point x0 = cot -|yo where the horopter Intersects the x-axis.
The sign of K is given by the bracket in (6.891); this bracket approaches -°° if Yo -*• n , i.e., if x0 -*• 0. It approaches asymptotically the positive value
— coth au if x0 -> <*,, i.e., y0 -> 0. Consequently it must be zero at some point
2tx
~
x0 in between. For the computation of thl3 special value x0, we have the equation
K = 0, i.e., by (6.89I):
Y
1
tan -f tanh a (yo + f) = ^
(6.892)
Since x0 = cot -§Yo, we may write this equation as follows
x0 = 4o tanh ct(yo + F )
(6.893)
and conclude immediately that
x0 < 4
(6.894)
We can use the equation (6.892) and, more generally, the observable curva¬ ture relation (6.891) In order to determine the individual constants a and p of our hyperbolic metric.
In the next section we shall find another method based on the alley exper¬ iments. For one of Blumenfeld's observers (Lo) the constants a and p have been calculated on the basis of Blumenfeld's data:
a = 14.58 p = 0.0809
(6.895)
We use these values for the calculation of yo from the transcendental equation (6.892).
The result is
Yo = 2.°36
and hence
x0 = cot Yo/2 = 48.7
The Interpupillary distance of Blumenfeld's subject is 3O.5 mm. Hence we find that for this observer a frontal plane horopter at Xo = 148.2 cm. should have the curvature K = 0, i.e., coincide practically with a curve whloh Is phys1ca11y straight.
GEODESIC LINES: THE HOROPTER PROBLEM
75
6.9. It is easy to carry out similar calculation, for the Euclidean and elliptic geometry. From (6.54) it follows
a
1 2
AY = -^ 9
Ay
tanh a(yo + hOt* 2ct
(6.91)
for the Euclidean and elliptic horopters respectively. We Introduce the constants C which follow from (6.91) in our general theorem (6.89) and obtain formulae for the curvature K of the horopters:
Euclidean Geometry:
K = cos2 ^Yo (72^a - 2 tan -gYoj
Elliptic Geometry:
tanh cr( Yq + M-)
K = cos2 -§Yo
2a
- tan -§Yo,
(6.92)
The curvature K Is zero for a value Yo which satisfies the equations
.
iv
1
tan ¥Yo = 7^:
tan -§Y0 coth a(y0 + p) = -^
(6.95)
respectively. By introducing Xo = cot -“Yo, we obtain
Euclidean Geometry: x0 = 4a
Elliptic Geometry:
xQ - 4a coth cr(Yo + P-)
(6.94)
The difference between the three geometries thus reflects upon the rela¬ tion of the constant a to the position x0 where the frontal plane horopter Is physically plane. Indeed, we have the Inequalities
Xo < 4a
(Hyperbolic geometry)
x0 = 4a
(Euclidean geometry)
(6.95)
■=tot
A
O X
(Elliptic geometry)
Section 7 THE ALLEY PROBLEM
Fop the application of our theory to the alley problem, we distinguish with Blumenfeld*) two types of alleys: alleys which are formed by walls of equal apparent distance, and alleys formed by apparently parallel walls. The curves where the walls Intersect the horizontal plane are, for brevity, called Pis tance Curves and Parallel Curves.
Our first problem is to interpret these curves mathematically, i.e., to find mathematical conditions which describe adequately the psychological impres¬ sions of equality of distance and of parallelism. Thi3 problem is easily solved in the case of the distance curves, but we shall find that the concept of paral¬ lelism Involves certain difficulties. The reason for this difficulty can be seen in the fact that parallelism of lines has an immediate and intuitive meaning only in the Euclidean geometry.
7.1. Distance Curves. The basis for the construction of aidlstance alley
are the frontal plane horopters, i.e., the geodesic lines symmetrical to the
y
x-axis. Consider, for example, the geodesic
through P0 and determine a point Q0 on this line
which has a given geodesic distance 5 from P0-
Similarly, on another geodesic through Pi we can
find a point Qi which ha3 the same geodesic dis¬
tance from Pi. By doing this for the whole set
of geodesic lines, a curve is obtained by the
points Q which has a constant geodestic distance
S from the x-axis. If we determine a similar
curve symmetrically located on the other side of
the x-axis, an alley is found in which the two
walls have the constant geodesic distance 2S from
each other. We expect that these alleys are the mathematical expression for the
observed Distance Alleys.
We determine the equations of the distance curves simultaneously for all three geometries in question. On account of (6.48) we have for the frontal plane horopters the equation
2 k cos 9 = e Y*H)
e e -a(y+n)
(7.11)
where e = -1, 0, + 1 for the hyperbolic, Euclidean, and elliptic geometry respec¬ tively. By introducing temporarily the variable
ve may write
= ff(Y M-)
2 k cos 9 = e T - ee T
(7-12)
♦Blumenfeld, Walter: Untersuchungen liber die scheinbare Gr'dase lm Sehraume. Z.f. Psychol. u. Physiol, d. Sinnescrg., 65: 24l-Ul6, 1915*
THE ALLEY PROBLEM
75
The geodesic distance S of a point Q on such a curve from the median point P ( 9 = 0) is given by the Integral
9 S = 2
\/dT2 + dtp2 - e 1 + e ed 9
(7-13)
We consider x as function of 9 (given by 7*12), and thus have to evaluate the integral
p y 1 + 7T
S = 2/
e_x + e e x d 9
(7.131)
Wow, from (7.12) It follows that
and hence
-2 k sin 9 = (ex + ee-T) x'
1 +x
k2 sin2 9 + ir(eT + se T)2 T(ex + e'e-x)«
With the aid of the Identity
(7.14)
i(eT + e~T)^ = i(eT - e e_x)2 + e and by taking (7-12) into account, we may write (7-l4) as follow:
(7-141)
1 +X
so that our integral (7.131) becomes
k +e ~(eT + e e x)
S = v/k2 + From (7«l4l) it follows that
9 d 9
i(e'l+ e e~ T)2
(7.15)
(7.16)
and hence
1r(eT + e e x)2 = k2 cos29 +
S - \/ k
+ e
9
d 9
/ ,2
2
/ k cos 9 + e
(7.161)
= — arc tan v42 + - tan *
We write this last result in the form
1 tan
A
S =
e tan 9
(7.17)
It determines the geodesic distance S of a point of latitude 9 which lies on the horopter determined by the constant k.
76
MATHEMATICAL ANALYSIS OF BINOCULAR VISION
Finally we eliminate the constant k with the aid of (7.11). We first 'rite (7-17) a little differently by using the identity
>in /F S
tan y/e~ S 1 + tan2 s/T S
It foilow3
3in yTT S =
3 in 9
v/T
e + k cos m
and hence by (7.11) and (7.l4l):
— sin y/T S ve
or by reintroducing y by t = o-(y + fi) :
2 s in 9 eT + ee T
(7.18)
sin vT" S =
2 s in 9
VT
' '
Pff(Y + n) + e
cr(Y+fJ- )
(7-181)
The equation (7-181) determines the geodesic distance of any point of the hori¬ zontal plane from the x-axis in terms of Its bipolar coordinates y, 9. Finally,
we assign to e Its values -1, 0, + 1 and have the result that the geodesic distance of a point Q from the x-axis is given by the functions:
Hyperbolic Geometry: sinh S =
sin 9
sinh cr( y + M-)
Euclidean Geometry:
S = 2 sin 9 e~ a(7+v) (7-19)
Elliptic Geometry:
sin 9 sin S =
cosh a ( y + (j.)
The distance curves are characterized by the condition that the geodesic distance from the x-axis is constant. Thus these curves are given by the equatIons:
Hyperbolic Geometry: 3inh