Extending structures for associative conformal algebras

Abstract

In this paper, we give a study of the C[∂]-split extending structures problem for associative conformal algebras. Using the unified product as a tool, which includes interesting products such as bicrossed product, cocycle semi-direct product and so on, a cohomological type object is constructed to characterize the C[∂]-split extending structures for associative conformal algebras. Moreover, using this theory, the extending structures of an associative conformal algebra A which is free as a C[∂]-module by the C[∂]-module Q=C[∂]x are described using flag datums of A. Furthermore, we give a classification of the extending structures of A by Q=C[∂]x in detail up to equivalence when A is a free associative conformal algebra of rank 1.