Page:EB1911 - Volume 26.djvu/140

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122
SURFACE


tan é PSH tan § PHS-=const, and for the hyperbola tan %PSH/tan {, PHS=const, so for a line of curvature on a central quadric, if P be joined to two umbilics S and H by geodetics, either the product or the ratio of the tangents of %PSH and %PHS will be constant. Chasles proved that if an ellipse be intersected in the point A by a. confocal hyperbola, and from any point P on the hyperbola tangents PT, PT' be drawn to the ellipse, then the difference of the arcs of the ellipse TA, T'A=the difference of the tangents PT, PT'; and subsequently Graves showed that if from any point P on the outer of two confocal ellipses tangents be drawn to the inner, then the excess of the sum of the tangents PT, PT' over the intercepted arc TT' is constant. Precisely the same theorems hold for a quadric replacing the confocal by lines of curvature and the rectilinear tangents by geodetic tangents Hart still further developed the analogies with confocal conics, and established the following 2 If a geodetic polygon circumscribe a line of curvature, and all its vertices but one move on lines of curvature, this vertex will also describe a line of curvature, and when the lines of curvature all belong to the same system the perimeter of the polygon will be constant. 2. Geddelics on Developable Surfaces.-On these the geodetics are the curves which become right lines when the surface is unrolled into a plane. From this property a first integral can be immediately deduced. - 3. Geodetics on Surfaces of Revolution.-In all such the geodetics are the curves given by the equation r sin ¢=const, 1' being the perpendicular on the axis of revolution, d> the angle at which the curve crosses the meridian. The general problem of the determination of geodetics on any surface may be advantageously treated in connexion with that of “ parallel " curves. By “ parallel ” curves are meant curves whose geodetic distances from one another are constant-in other words, the orthogonal trajectories of a system of geodetics. In applying this method the determination of a system of parallel curves comes first, and the determination of the geodetics to which they are orthogonal follows as a deduction. If ¢> (u, fu) =const be a system of parallel curves, it is shown that ¢ must satisfy the partial differential equation dw 2- <f~><~> <d¢> 1- ~- = E(dv 2F du dv +G dv EG' F If ¢» (u, v, a) =const be a system of parallel curves satisfying this equation, then d¢/da=const is proved to represent the orthogonal geodetics. The same method enables us to establish a result first arrived at by jacobi, that whenever a first integral of the differential equation for geodetics can be found, the final integral is always reducible to quadratures. In this method ¢ corresponds to the characteristic function in the Hamiltonian dynamics, the geodetics being the paths of a particle confined to the surface when no extraneous forces are in action. The expression for the lineal element on a quadric in elliptic co-ordinates suggested to Liouville the consideration of the class of surfaces for which this equation takes the more general form ds2 =(U-V)(U12du2-I-Vlzdvg), where U, U1 are functions of u, and V, V1 functions of v, and shows that, for this class, the first integral of the equation of the parallels is immediately obtainable, and hence that of the corresponding geodetics. It is to be remarked that for this more general class of surfaces the theorems of Chasles and Graves given above will also hold good. Geodetics on a surface corresponding to right lines on a plane, the question arises what curves on a surface should be considered to correspond to plane circles. There are two claimants for the position: first, the curves described by a point whose geodetic distance from a given point is constant; and, second, the curves of constant geodetic curvature. On certain surfaces the curves which satisfy one of these conditions also satisfy the other, but in general the two curves must be carefully distinguished. The property involved in the second definition is more

intrinsic, and we shall

following Liouthe curves posgeodetic circles. be noted that U circles, except on surfaces of constant specific curvature, do not 0 return back upon themselves like circles in plana. As a particular instance, a geodetic on an ellipsoid (w ich is, of course, a geodetic circle of zero curvature), starting from an umbilic, when it returns again, as it does to that umbilic, makes a finite angle with its original starting position. As to the curve described by a point whose geodetic distance from a given centre is constant, Gauss showed from the fundamental property of a Y ln*

r therefore,

ville, call

sessing it It may geodetic —'

~ X v Fic. r. geodetic that this curve resembles the plane circle in being everywhere perpendicular to its radius. In the same way it holds that the curve described by a point the sum (or Idifference) of whose geo- /YT, detic distances from two I ' ' given points (foci) is con-, 1 stant, resembles the plane I ellipse (or hyperbola) in the property that it bisects at every point the external 1 (or internal) angle between { the geodetic focal radii, and, as a consequence, that the curves on any surface answering to confocal ellipses and hyperbolas intersect at right angles. The equation for the lineal ~ -element enables us to dis- ' . cuss geodetic circles on surfaces of constant specific curvature; for we have seen that if we choose as parameters geodetics and their orthogonal trajectories, the equation becomes

1 I ' x Z ' ty. mi* | I I 1 | ' 5 . 3 - . L-'§ "Z't””f°.-.f... °°' ""'|' T, 4 I I I I F I 1 1


A 1 1 ds2=du'-I-P2du2; and since "i fi/ (RR')"1 = - P"d2P/du”, Y and here (RR')'1===a°'2, FIG. 2. it follows P=A cos ua“+ B sin ua"1, or P=A cosh ua'1-|-B sinh ua", according as the surface is synclastic or ature k"1) be chosen for the starting curve u=0, and if v be made ' the length of the arc OY, intercepted on this circle by the curve 1/=const (see fig. 1), then A and B can be proved to be independent of u and P=, , l J. cos uu, '1 -I-ak'1 sin ua'1 for , 1 H I, I anticlastic. If a geodetic circle (curvI

 I
I
a
 I
 /
' I
/

a s nclastic surface, P= » cos ua°1+ak"1 sinh ua” r for an anticlastic sur- ', face. It follows from ' the expression for the geodetic curvature p'1= P"dP/du 'that in both 1 classes of surfaces all the " 1 I other orthogonal curves , u=const will be geo- ' detic circles. It also appears that on a syn elastic surface of constant specific curvature all the eodetics normal to a georfetic circle converge to a point on either side as on a sphere, and can be described with a stretched string taking either of these points as centre, the length of the string being a tan* ak"' (see fig. 2). These normals will be all cut orthogonally by an equator, I I, / I

I


I r I I 1 I I If I/

I/

Ill if FIG. 3. that is, by a geodetic circle of zero curvature. For anticlastic surfaces, however, we must distinguish two cases. If the curvature k"1 of the geodetic circle >a“' the geodetic normals meet in a point on the concave side of the geodetic circle, and can be described as on the synclastic b a stretched string, the length of the string being a tanh'1 ak '1, but in this case the geodetic normals have no equator (see fig. 3). If on the other hand the curvature of the geodetic circle be <a" the normals do not meet on either side, but do possess an equator, and at this equator the geodetic normals come nearer together than i 1 » 1 1 A I 1 1 |

n
»


,

.

lil |"

| I o 1

I I I I | I 1 ' I

I » I

I 1 FIG. 4. they do anywhere else (see fig. 4). . On a synclastic surface of constant specific curvature a"“ two near geodetics proceeding from a point always meet again at the geodetic