Extending structures for anti-dendriform algebras and anti-dendriform bialgebras

TL;DR

This paper develops a comprehensive framework for anti-dendriform algebras, introducing extending structures, bicrossed products, and bialgebras, and explores solutions to related algebraic equations, advancing the theoretical understanding of these algebraic systems.

Contribution

It introduces new structures and methods for anti-dendriform algebras, including extending structures, bicrossed products, and the AD-YBE, expanding the theoretical landscape.

Findings

Unified product for anti-dendriform algebras studied

Introduction of anti-dendriform D-bialgebras and their relation to associative algebras

Construction of skew-symmetric solutions to AD-YBE using O-operators

Abstract

In this paper, we first explore the extending structures problem by the unified product for anti-dendriform algebras. In particular,the crossed product and non-abelian extension are studied. Furthermore, we explore the inducibility problem of pairs of automorphisms associated with a non-abelian extension of anti-dendriform algebras, and derive the fundamental sequences of Wells. Then we introduce the bicrossed products and matched pairs of anti-dendriform algebras to solve the factorization problem. Finally, we introduce the notion of anti-dendriform D-bialgebras as the bialgebra structures corresponding to double construction of associative algebras with respect to the commutative Cone cocycles. Both of them are interpreted in terms of certain matched pairs of associative algebras as well as the compatible anti-dendriform algebras. The study of coboundary cases leads to the introduction of the AD-YBE, whose skew-symmetric solutions give coboundary anti-dendriform D-bialgebras. The notion of O-operators of anti-dendriform algebras is introduced to construct skew-symmetric solutions of the AD-YBE. We also characterize the relationship between the skew-symmetric solutions of AD-YBE and O-operators.