Deformation Cohomology for Braided Commutativity
Masahico Saito, Emanuele Zappala
TL;DR
This paper extends Yang-Baxter Hochschild cohomology to classify and analyze infinitesimal and higher order braided commutative deformations of braided algebras, with detailed applications to Hopf algebras.
Contribution
It introduces a new cohomology theory for braided commutative deformations, expanding the understanding of algebraic structures with Yang-Baxter operators.
Findings
Classifies infinitesimal braided commutative deformations.
Provides obstructions for higher order deformations.
Constructs nontrivial examples of braided commutative Hopf algebras.
Abstract
Braided algebras are algebraic structures consisting of an algebra endowed with a Yang-Baxter operator, satisfying some compatibility conditions.Yang-Baxter Hochschild cohomology was introduced by the authors to classify infinitesimal deformations of braided algebras, and determine obstructions to higher order deformations. Several examples of braided algebras satisfy a weaker version of commutativity, which is called braided commutativity and involves the Yang-Baxter operator of the algebra. We extend the theory of Yang-Baxter Hochschild cohomology to study braided commutative deformations of braided algebras. The resulting cohomology theory classifies infinitesimal deformations of braided algebras that are braided commutative, and provides obstructions for braided commutative higher order deformations. We consider braided commutativity for Hopf algebras in detail, and obtain some…
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Taxonomy
TopicsAdvanced Operator Algebra Research · Advanced Algebra and Geometry · Algebraic structures and combinatorial models