Sylvester's double sums: an inductive proof of the general case

KRICK, TERESA; SZANTO, AGNES

JOURNAL OF SYMBOLIC COMPUTATION

ACADEMIC PRESS LTD-ELSEVIER SCIENCE LTD

Año: 2012 vol. 47 p. 942 - 953

0747-7171

In 1853 J. Sylvester introduced a family of double sum expressions for two finite sets of indeterminates and showed that some members of the family are essentially the polynomial subresultants of the monic polynomials associated with these sets.In 2009, in a joint work  with C. D´Andrea and H. Hong  we gave the complete description of all the members of the family as expressions in the coefficients of these polynomials.More recently, M.-F. Roy and A. Szpirglas presented a new and natural inductive proof for the cases  considered by Sylvester.Here we show how induction also allows to obtain the full description of Sylvester´s double-sums.