Multiplicative Lie derivation of triangular 3-matrix rings

Abstract

A map φ on an associative ring is called a multiplicative Lie derivation if φ([x,y])=[φ(x),y]+[x,φ(y)] holds for any elements x,y, where [x,y]=xy-yx is the Lie product. In the paper, we discuss the multiplicative Lie derivations on the triangular 3-matrix rings T= T3( Ri; Mij). Under the standard assumption Qi Z( T)Qi= Z(Qi T Qi), i=1,2,3, we show that every multiplicative Lie derivation : T T has the standard form =δ+γ with δ a derivation and γ a center valued map vanishing each commutator.