Anti-dendriform algebras, new splitting of operations and Novikov type algebras

TL;DR

This paper introduces anti-dendriform algebras as a novel way to split associativity, explores their properties, and establishes connections with Novikov algebras, expanding the algebraic framework for splitting operations.

Contribution

It defines anti-dendriform algebras, introduces anti-operators, and establishes relationships with dendriform and Novikov algebras, providing a new splitting of algebraic operations.

Findings

Anti-dendriform algebras characterized by two operations summing to an associative operation.

Existence of compatible anti-dendriform structures on associative algebras with Connes cocycles.

Correspondences between subclasses of dendriform and anti-dendriform algebras via q-algebras.

Abstract

We introduce the notion of anti-dendriform algebras as a new approach of splitting the associativity. They are characterized as the algebras with two operations whose sum is associative and the negative left and right multiplication operators compose the bimodules of the sum associative algebras, justifying the notion due to the comparison with the corresponding characterization of dendriform algebras. The notions of anti-$\mathcal O$-operators and anti-Rota-Baxter operators on associative algebras are introduced to interpret anti-dendriform algebras. In particular, there are compatible anti-dendriform algebra structures on associative algebras with nondegenerate commutative Connes cocycles. There is an important observation that there are correspondences between certain subclasses of dendriform and anti-dendriform algebras in terms of $q$-algebras. As a direct consequence, we give the notion of Novikov-type dendriform algebras as an analogue of Novikov algebras for dendriform algebras, whose relationship with Novikov algebras is consistent with the one between dendriform and pre-Lie algebras. Finally we extend to provide a general framework of introducing the notions of analogues of anti-dendriform algebras, which interprets a new splitting of operations.