On coquasitriangular pointed Majid algebras
Hua-Lin Huang, Gongxiang Liu
TL;DR
This paper classifies coquasitriangular pointed Majid algebras using quiver methods, providing a comprehensive framework and examples for their structure and classification.
Contribution
It introduces a quiver-based approach to classify coquasitriangular pointed Majid algebras and characterizes the Hopf quivers that admit such structures.
Findings
Classified Hopf quivers with coquasitriangular Majid algebra structures
Provided quiver setting for general coquasitriangular pointed Majid algebras
Obtained new examples and classification results
Abstract
We study coquasitriangular pointed Majid algebras via the quiver approaches. The class of Hopf quivers whose path coalgebras admit coquasitriangular Majid algebras is classified. The quiver setting for general coquasitriangular pointed Majid algebras is also provided. Through this, some examples and classification results are obtained.
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Taxonomy
TopicsAlgebraic structures and combinatorial models · Advanced Topics in Algebra · Nonlinear Waves and Solitons