Bregje Pauwels scite author profile

We study abelian envelopes for pseudo-tensor categories with the property that every object in the envelope is a quotient of an object in the pseudo-tensor category. We establish an intrinsic criterion on pseudo-tensor categories for the existence of an abelian envelope satisfying this quotient property. This allows us to interpret the extension of scalars and Deligne tensor product of tensor categories as abelian envelopes, and to enlarge the class of tensor categories for which all extensions of scalars and tensor products are known to remain tensor categories. For an affine group scheme G, we show that pseudotensor subcategories of RepG have abelian envelopes with the quotient property, and we study many other such examples. This leads us to conjecture that all abelian envelopes satisfy the quotient property.

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Monoidal abelian envelopes with a quotient property

Coulembier

Etingof

Ostrik

et al. 2022

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We study abelian envelopes for pseudo-tensor categories with the property that every object in the envelope is a quotient of an object in the pseudo-tensor category. We establish an intrinsic criterion on pseudo-tensor categories for the existence of an abelian envelope satisfying this quotient property. This allows us to interpret the extension of scalars and Deligne tensor product of tensor categories as abelian envelopes, and to enlarge the class of tensor categories for which all extensions of scalars and tensor products are known to remain tensor categories. For an affine group scheme G, we show that pseudo-tensor subcategories of 𝖱𝖾𝗉 ⁡ G {\operatorname{{\mathsf{Rep}}}G} have abelian envelopes with the quotient property, and we study many other such examples. This leads us to conjecture that all abelian envelopes satisfy the quotient property.

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Quasi-Galois theory in symmetric monoidal categories

Pauwels

2017

Alg. Number Th.

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Given a ring object A in a symmetric monoidal category, we investigate what it means for the extension 1 → A to be (quasi-)Galois. In particular, we define splitting ring extensions and examine how they occur. Specializing to tensor-triangulated categories, we study how extension-of-scalars along a quasi-Galois ring object affects the Balmer spectrum. We define what it means for a separable ring to have constant degree, which is a necessary and sufficient condition for the existence of a quasi-Galois closure. Finally, we illustrate the above for separable rings occurring in modular representation theory.

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The Gerstenhaber structure on the Hochschild cohomology of a class of special biserial algebras

Meinel¹,

Nguyen²,

Pauwels³

et al. 2018

Preprint

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We determine the Gerstenhaber structure on the Hochschild cohomology ring of a class of self-injective special biserial algebras. Each of these algebras is presented as a quotient of the path algebra of a certain quiver. In degree one, we show that the cohomology is isomorphic, as a Lie algebra, to a direct sum of copies of a subquotient of the Virasoro algebra. These copies share Virasoro degree 0 and commute otherwise. Finally, we describe the cohomology in degree n as a module over this Lie algebra by providing its decomposition as a direct sum of indecomposable modules.

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The Gerstenhaber structure on the Hochschild cohomology of a class of special biserial algebras

et al. 2021

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Bregje Pauwels

Monoidal Abelian Envelopes with a quotient property

Monoidal abelian envelopes with a quotient property

Quasi-Galois theory in symmetric monoidal categories

The Gerstenhaber structure on the Hochschild cohomology of a class of special biserial algebras

The Gerstenhaber structure on the Hochschild cohomology of a class of special biserial algebras

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