704]
A MEMOIR ON THE SINGLE AND DOUBLE THETA-FUNCTIONS.
471
In the second case, writing /x +1, f +1 for ¡x, f, the new values of /x, f will
be both even, and we have the like expression with only the characters \ (a + a),
h, (a — a!) each increased by 1; so in the third case we obtain the like expression
with only the characters ^ (/3 + /3'), ^ (/3 — ¡3') each increased by 1; and in the fourth
case the like expression with the four upper characters each increased by 1. The
product of the two theta-functions is thus equal to the sum of the four products,
according to the theorem.
Resume of the ulterior theory of the single functions.
15. For the single theta-functions the Product-theorem comprises 16 equations,
and for the double theta-functions, 256 equations: these systems will be given in
full in the sequel. But attending at present to the single functions, I write down
here the first four of the 16 equations, viz. these are
0.0
Ko)
(u + u').^f (
q)o-o=
XX'+YY',
1.0
rH o
à1
„ ^
1
0
YX' + XY',
0.1
a 0
l
» *
0
1
XX' — YY\
1.1
1
„ *
1
1
- YX' + XY'-
where X, Y denote 0 ^ (2u), 0 (J^j (2u) respectively, and X', Y' the same functions
of 2u! respectively. In the other equations we have on the left-hand the product of
different theta-functions of u + v!, u — u respectively, and on the right-hand expressions
involving other functions, X 1} Y lt Xf Yf &c., of 2u and 2u respectively.
16. By writing u' = 0, we have on the left-hand, squares or products of theta-
functions of u, and on the right-hand expressions containing functions of 2u: in
particular, the above equations show that the squares of the four theta-functions are
equal to linear functions of X, Y; that is, there exist between the squared functions
two linear relations: or again, introducing a variable argument x, the four squared
functions may be taken to be proportional to linear functions
31 (a — x), 33 (b - x), (5 (c — x), 2) (d — x),
where 21, 33, (£, 2), a, b, c, d, are constants. This suggests a new notation for the
four functions, viz. we write
Ko)«- KS) W ’
* (J) OX
Ki) (,i)
= Au, Bu,
Gu,
Du ;
and the result just mentioned then is
A 2 u : Bhi :
Chi :
D 2 u
II
1
1
: (£ (c — x) :
3) (d — x),
