Associative Rota--Baxter operators on the Sweedler algebra $H_4$

Maxim V. Podkorytov

arXiv:2602.03133·math.RA·February 4, 2026

Associative Rota--Baxter operators on the Sweedler algebra $H_4$

Maxim V. Podkorytov

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TL;DR

This paper classifies all Rota--Baxter operators on the Sweedler algebra $H_4$, providing a complete list and understanding of their structure up to conjugation and dualization.

Contribution

It offers the first comprehensive classification of Rota--Baxter operators on $H_4$, detailing their kernels and automorphism equivalence classes.

Findings

01

Complete list of Rota--Baxter operators on $H_4$

02

Classification based on kernel dimension

03

Description of subalgebras of $H_4$

Abstract

In this paper, we classify all Rota--Baxter operators on the Sweedler algebra $H_{4}$ up to conjugation and dualization. Modulo algebra (anti)automorphisms of $H_{4}$ , we first describe its subalgebras and then analyse the kernel of a Rota--Baxter operator. The classification is carried out according to the dimension of this kernel, yielding a complete description of such operators. A complete list of operators is given in the theorem of the final section.

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Taxonomy

TopicsAdvanced Topics in Algebra · Matrix Theory and Algorithms · Algebraic and Geometric Analysis