Symmetric (σ,τ)-algebras and (σ,τ)-Hochschild cohomology

Abstract

On an associative algebra, we introduce the concept of symmetric (σ,τ)-derivations together with a regularity condition and prove that strongly regular symmetric (σ,τ)-derivations are inner. Symmetric (σ,τ)-derivations are (σ,τ)-derivations that are simultaneously (σ,τ)-derivations as well as (τ,σ)-derivations, generalizing a property of commutative algebras. Motivated by this notion, we explore the geometry of symmetric (σ,τ)-algebras and prove that there exist a unique strongly regular symmetric (σ,τ)-connection. Furthermore, we introduce (σ,τ)-Hochschild cohomology and show that, in first degree, it describes the outer (σ,τ)-derivations on an associative algebra. Along the way, examples are provided to illustrate the novel concepts.