Monoidal categories and the Gerstenhaber bracket in Hochschild cohomology

In this monograph, the author extends S. Schwede's exact sequence interpretation of the Gerstenhaber bracket in Hochschild cohomology to certain exact and monoidal categories. Therefore the author establishes an explicit description of an isomorphism by A. Neeman and V. Retakh, which links $\mathrm{Ext}$-groups with fundamental groups of categories of extensions and relies on expressing the fundamental group of a (small) category by means of the associated Quillen groupoid. As a main result, the author shows that his construction behaves well with respect to structure preserving functors between exact monoidal categories. The author uses his main result to conclude, that the graded Lie bracket in Hochschild cohomology is an invariant under Morita equivalence. For quasi-triangular bialgebras, he further determines a significant part of the Lie bracket's kernel, and thereby proves a conjecture by L. Menichi. Along the way, the author introduces $n$-extension closed and entirely extension closed subcategories of abelian categories, and studies some of their properties.

Introduction Prerequisites Extension categories The Retakh isomorphism Hochschild cohomology A bracket for monoidal categories Application I: The kernel of the Gerstenhaber bracket Application II: The $\mathbf{Ext}$-algebra of the identity functor Appendix A. Basics Bibliography.