Generalized Jordan derivations of Incidence Algebras
Abstract
For a given ring R and a locally finite pre-ordered set (X, ≤), consider I(X, R) to be the incidence algebra of X over R. Motivated by a Xiao's result which states that every Jordan derivation of I(X,R) is a derivation in the case R is 2-torsion free, one proves that each generalized Jordan derivation of I(X,R) is a generalized derivation provided R is 2-torsion free, getting as a consequence the above mentioned result.
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