Polynomial identities for the Jordan algebra of a symmetric bilinear form

Let W s s W Ž p. [ W Ž2 q . be a direct sum of two vector spaces of dimension p p, 2 q 0 1 and 2 q, respectively, over a field k of characteristic zero, p s 2, 3, . . . , ϱ; q s ² : s 1, 2, . . . , ϱ; and let x, y be a nondegenerate bilinear form on W which is ² Ž p . Ž 2q. : symmetric on W and ske

In this paper we explore a research problem of Greene: to find inequalities for the Miibius function which become equalities in the presence of modularity. We replace these inequalities with identities and give combinatorial interpretations for the difference.

Symmetric functions can be considered as operators acting on the ring of polynomials with coefficients in R. We present the package SFA, an implementation of this action for the computer algebra system Maple. As an example, we show how to recover different classical expressions of Lagrange inversion

Let K be a finite field of characteristic p > 2, and let M 2 ðKÞ be the matrix algebra of order two over K. We describe up to a graded isomorphism the 2-gradings of M 2 ðKÞ. It turns out that there are only two nonisomorphic nontrivial such gradings. Furthermore, we exhibit finite bases of the grade