Jordan Derivations and Antiderivations of Generalized Matrix Algebras

Abstract

Let G=[A & M N & B] be a generalized matrix algebra defined by the Morita context (A, B,AMB,BNA, MN, NM). In this article we mainly study the question of whether there exist proper Jordan derivations for the generalized matrix algebra G. It is shown that if one of the bilinear pairings MN and NM is nondegenerate, then every antiderivation of G is zero. Furthermore, if the bilinear pairings MN and NM are both zero, then every Jordan derivation of G is the sum of a derivation and an antiderivation. Several constructive examples and counterexamples are presented.