[101
101] NOTES ON LAGRANGE’S THEOREM. 7
iables v, v, w ... by
t may be considered
sessions (Ixcli/ ... and
i the functions which
variables; the former
to u, v..., the latter
jquently the notation
in which expression 8 U , 8 V ... are to be replaced by
8 U F + 8> u e + 8 U $ ... 8/ 4- 8 v e + 8A ....
The complete expansion is easily arrived at by induction, and the form is somewhat
singular. In the case of a single variable u we have □ = 8 U F , in the case of two
variables, □ = 8 U F 8 F + 8 u F 8 v e + 8^8/. Or writing down only the affixes, in the case of
a single variable we have F; in the case of two variables FF, F6, cf>F; and in the
case of three variables FFF, (f)FF, F%F, F9F, FF6, FF<j>, F99, F9<fi, F%9, (f>F(j),
e determinants. This
xFcf), <t>F9, 5 where it will be observed that 9 never occurs in the
first place, nor <£ in the second place, nor 9, <£ (in any order) in the first and second
places, &c., nor 9, cf), x. (i 11 an y orc ler) in the first, second, and third places. And the
same property holds in the general case for each letter and binary, ternary, &c.
combination, and for the entire system of letters, and the system of affixes contains
every possible combination of letters not excluded by the rule just given. Thus in the
case of two letters, forming the system of affixes FF, F9, <fiF, 9F, F(f>, 9<fi, <f)9, the last
four are excluded, the first three of them by containing 9 in the first place or </>
in the second place, the last by containing 4>, 9 in the first and second places: and
ling functions become
. ... dxdy ...
alue which ^— ,
dudv ...
lies are changed into
there remains only the terms FF, F9, cf)F forming the system given above. Substituting
the expanded value of □ in the expression for F (,x, y...), the equation may either be
permitted to remain in the form which it thus assumes, or we may, in order to
obtain the finally reduced form, after expanding the powers of h, k... , connect the
symbols 8 u e , 8 x f ... 8 U F , &c. with the corresponding functions 9, c/>... F, and then omit the
affixes ; thus, in particular, in the case of a single variable the general term of Fx is
far as they enter into
n order that we may
V to replace h, k, &c.
(the ordinary form of Lagrange’s theorem). In the case of two letters the general
term of F {x, y) is
hpi-q
[pfW SuP ~ l8 ° q ~ 1 <t> q Zv0 p 8 u F + 9V8 U <}>18* F]
(see the Mécanique Celeste, [Ed. 1, 1798] t. i. p. 176). In the case of three variables,
the general term is
hpLqJr
... ' * - s p-^S v-'S r ~ 1 fflp<Wv r 8 8 8 Fa- 1
As h8 v 9. h8 v 9 ... affect
[p\P Yqqi \ r\ r ~ J
by 8 U 6 , 8 V °,..., where
tiation is only to be
espectively enter into
t in the same manner,
the sixteen terms within the { } being found by comparing the product 8 U 8 V 8 W with
the system FFF, 6FF, &c., given above, and then connecting each symbol of differen
tiation with the function corresponding to the affix. Thus in the first term the
8 U , 8 V , 8 W , each affect the F, in the second term the 8 U affects cj> q , and the 8 V and 8 W
each affect the F, and so on for the remaining terms. The form is of course deducible
to multiply this last
from Laplace’s general theorem, and the actual development of it is given in Laplace’s
Memoir in the Hist, de I’Acad. 1777. I quote from a memoir by Jacobi which I take
this opportunity of referring to, “De resolutione equationum per series infinitas,”
Crelle, t. vi. [1830], pp. 257—286, founded on a preceding memoir, “Exercitatio algebraica
circa discerptionem singularem fractionum quae plures variabiles involvunt,” t. v. [1830],
pp. 344—364.
Stone Buildings, April 6, 1850.
