Central elements of the Jennings basis and certain Morita invariants

Abstract

From Morita theoretic viewpoint, computing Morita invariants is important. We prove that the intersection of the center and the nth (right) socle ZSn(A) := Z(A) Socn(A) of a finite-dimensional algebra A is a Morita invariant; This is a generalization of important Morita invariants --- the center Z(A) and the Reynolds ideal ZS1(A). As an example, we also studied ZSn(FG) for the group algebra FG of a finite p-group G over a field F of positive characteristic p. Such an algebra has a basis along the socle filtration, known as the Jennings basis. We prove certain elements of the Jennings basis are central and hence form a linearly independent set of ZSn(FG). In fact, such elements form a basis of ZSn(FG) for every integer 1 n p if G is powerful. As a corollary we have Socp(FG) ⊂eq Z(FG) if G is powerful.