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

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