Full text: The collected mathematical papers of Arthur Cayley, Sc.D., F.R.S., late sadlerian professor of pure mathematics in the University of Cambridge (Vol. 10)

458 ON THE ADDITION OF THE DOUBLE ^-FUNCTIONS, 
or as it may be written 
[703 
fi .X — Z .X — w ,y — z.y — IV = 
e.a — z.a — w 
x-y 
{y — z. y — w. a — y.'dX — x — z. x — iu. a — x.^ Y) 
€ • a — X . & y f / fy / Tiri 
H \w — x.w — y.a — w. VZ —z — x.z — y.a — z.v vv \, 
z — W 
an equation for the determination of O. 
Consider first the expression which multiplies e.a — z.a — w, this is 
= 7r{y- z -y 
C'lQ 
we have 
— w. a 2 VX — x — z . x — w . a 2 
BE l2 = J- {Vbie 1 f 1 a 2 c 2 d 1 , — Vbaeof^ajCidj], 
and multiplying this by 
we derive 
-d]2 • Cj2 • Di%, — Va^d^a/h, 
BE l2 . C 12 . D 12 . A 12 = ~ {c 2 d 2 a 2 VX - Cjd^ V Y}, 
t/ 12 
and similarly two other equations; the system may be written 
BE. C. D. A — ~ {c 2 d 2 a 2 VX — c^aj V Y], 
t/j2 
GE .D.B. A — „ {d 2 b 2 „ „ - djbj „ „ }, 
DE. B. C. A = „ {b 2 c 2 „ „ -bac 1} , „ }, 
the suffixes on the left-hand side being always 12. The letters b, c, d which enter 
cyclically into these equations are any three of the five letters other than a; the 
remaining two letters e and f enter symmetrically, for BE is a mere abbreviation for 
the double triad BEF. AGD; and the like for CE, and DE. 
Multiplying these equations by 
b — z.b — w c — z.c — w d — z.d—w 
b — c. b — d’ c — d. c — b’ d — b.d — c* 
respectively, and then adding, the right-hand side becomes 
= \y —z .y — w . a 2 y'X — x — z. x — w. a, V F}. 
b — z. b — w —1 
b — c.b — d c — d.d — b.b — c 
. c — d . B 3l 2 , etc., 
W riting
	        
Waiting...

Note to user

Dear user,

In response to current developments in the web technology used by the Goobi viewer, the software no longer supports your browser.

Please use one of the following browsers to display this page correctly.

Thank you.