Characterizations of (m,n)-Jordan derivations on some algebras

Abstract

Let R be a ring, M be a R-bimodule and m,n be two fixed nonnegative integers with m+n≠0. An additive mapping δ from R into M is called an (m,n)-Jordan derivation if (m+n)δ(A2)=2mAδ(A)+2nδ(A)A for every A in R. In this paper, we prove that every (m,n)-Jordan derivation from a C*-algebra into its Banach bimodule is zero. An additive mapping δ from R into M is called a (m,n)-Jordan derivable mapping at W in R if (m+n)δ(AB+BA)=2mδ(A)B+2mδ(B)A+2nAδ(B)+2nBδ(A) for each A and B in R with AB=BA=W. We prove that if M is a unital A-bimodule with a left (right) separating set generated algebraically by all idempotents in A, then every (m,n)-Jordan derivable mapping at zero from A into M is identical with zero. We also show that if A and B are two unital algebras, M is a faithful unital (A,B)-bimodule and U=[arrayccA &M \ & B \\array] is a generalized matrix algebra, then every (m,n)-Jordan derivable mapping at zero from U into itself is equal to zero.