348]
ON THE THEORY OE INVOLUTION.
301
which is Prof. Boole’s ancient theorem referred to in my Fifth Memoir on Quantics ( J ),
but which is now first exhibited in connexion with the general theory to which it
belongs.
16. It may be noticed that the condition for a twofold critic centre, or (what is
the same thing) a twofold factor of the Jacobian {which condition is of the degree
2 (2n — 3) in regard to the coefficients of TJ or F} is RQ — 0; and that we in fact have
2(2n-3) = n+3(n-2).
This remark is due to Dr Salmon.
Article, Nos. 17 to 42, relating to two Ternary Quantics.
17. Suppose now that Z7= (a, ..{$#, y, z) n , V=(a',.R[x } y, z) n are two ternary
quantics of the same order n, and write W = U + kV — (a + ha,. Q$x, y, z) n , so that
W=U + kV= 0
is the equation of a curve in involution with the curves U = 0, F = 0. But for
greater distinctness it is in general proper to retain U+fcV in place of W.
18. In order that the curve U+kV = 0 may have a node, we must have
simultaneously
S x (U+kV) = 0,
8 y (U + kV) = 0,
8 z (U+kV) =0,
and eliminating (x, y, z) from these equations we have
Disc 1 . (U+kV) = 0,
which is an equation of the degree 3 (n — l) 2 as regards k, and of the same order as
regards the coefficients of U, V conjointly.
19. To each of the S(n— l) 2 values of k there corresponds a point satisfying
the conditions in question, and which is therefore a node of the corresponding nodal
curve
U + kV = 0 ;
the points in question are the critic centres of the involution.
20. The critic centres may be differently obtained as follows; viz. if from the
three equations we eliminate k, we find
KU, ZyU, S Z U
B X V, 8yV,
= 0,
1 Pliil. Trans, vol. cxlviii. (1858), pp. 415—427, [156].
