Biderivations and commuting linear maps on Hom-Lie algebras

Abstract

The purpose of this paper is to determine skew-symmetric biderivations Biders(L, V) and commuting linear maps Com(L, V) on a Hom-Lie algebra (L,α) having their ranges in an (L,α)-module (V, , β), which are both closely related to Cent (L, V), the centroid of (V, , β). Specifically, under appropriate assumptions, every δ∈Biders(L, V) is of the form δ(x,y)=β-1γ([x,y]) for some γ∈ Cent (L, V), and Com(L, V) coincides with Cent (L, V). Besides, we give the algorithm for describing Biders(L, V) and Com(L, V) respectively, and provide several examples.