σ-Biderivations and σ-commuting maps of triangular algebras

Abstract

Let be an algebra and σ an automorphism of . A linear map d of is called a σ-derivation of if d(xy) = d(x)y + σ(x)d(y), for all x, y ∈ . A bilinear map D: × is said to be a σ-biderivation of if it is a σ-derivation in each component. An additive map of is σ-commuting if it satisfies (x)x - σ(x)(x) = 0, for all x ∈ . In this paper, we introduce the notions of inner and extremal σ-biderivations and of proper σ-commuting maps. One of our main results states that, under certain assumptions, every σ-biderivation of a triangular algebras is the sum of an extremal σ-biderivation and an inner σ-biderivation. Sufficient conditions are provided on a triangular algebra for all of its σ-biderivations (respectively, σ-commuting maps) to be inner (respectively, proper). A precise description of σ-commuting maps of triangular algebras is also given. A new class of automorphisms of triangular algebras is introduced and precisely described. We provide many classes of triangular algebras whose automorphisms can be precisely described.