146
SURFACES DIVISIBLE INTO SQUARES BY THEIR CURVES OF CURVATURE.
[505
and if in the notation of Gauss we write
x? + yf + zf = E,
x£ + y 2 + z£ = G,
then adding the equations multiplied by x ly y ly z 1 respectively, and also adding the
equations multiplied by x 2y y. 2y z 2 respectively, we find
A =
L 1 dE
2 Ë dq ’
B =
1 1 dG
2 G dq
and the equations thus become
1 dE 1 dG
2jOC a ~~~ T-j -, CG\ ^ 002 — U.
Edq G dq
&c.
&c.
&c.,
which, in fact, agree with the equations (10 bis) in Lamés “Leçons sur les coordonnées
curvilignes,” Paris (1859), p. 89. The surface will be divisible into squares if only
E : G is the quotient of a function of p by a function of q, or say if
P = ©P, G = ®Q,
where © is any function of (p, q), but P and Q are functions of p and q respectively;
we then have
1 dE 1 d© 1 dG 1 d©
E dq © dq ’ G dp © dp ’
and the equations for x, y, z are
n 1 d<0 Id© .
AiOG4 -7=r 7 y X2 — Oj
© dq © dp
&c. &c.
&c.,
viz. x, y, z being functions of p, q such that x x x 2 + y x y 2 + z x z 2 — 0, and which besides
satisfy these equations, or say which each of them satisfy the equation
„ 1 d©
ZM4 ~ pr j Ui
<$)dq
1 d©
© dp
u 2 = 0,
then the values of x, y, z in terms of (p, q) determine a surface which has the
property in question.
