Algebraic constructions for left-symmetric conformal algebras

Abstract

Let R be a left-symmetric conformal algebra and Q be a C[∂]-module. We introduce the notion of a unified product for left-symmetric conformal algebras and apply it to construct an object H2R(Q,R) to describe and classify all left-symmetric conformal algebra structures on the direct sum E=R Q as a C[∂]-module such that R is a subalgebra of E up to isomorphism whose restriction on R is the identity map. Moreover, we study H2R(Q,R) in detail when Q, R are free as C[∂]-modules and rankQ=1. Some special products such as crossed product and bicrossed product are also investigated.