Your search keyword '"Stroiński A"' showing total 11 results

1. A Coboundary Temperely-Lieb Category for $\mathfrak{sl}_2$-Crystals

Author

Alqady, Moaaz and Stroiński, Mateusz

Subjects

Mathematics - Representation Theory, Mathematics - Combinatorics, Mathematics - Quantum Algebra, 17B37 (Primary) 05E10 (Secondary)

Abstract

By considering a suitable renormalization of the Temperley--Lieb category, we study its specialization to the case $q=0$. Unlike the $q\neq 0$ case, the obtained monoidal category, $\mathcal{TL}_0(\Bbbk)$, is not rigid or braided. We provide a closed formula for the Jones--Wenzl projectors in $\mathcal{TL}_0(\Bbbk)$ and give semisimple bases for its endomorphism algebras. We explain how to obtain the same basis using the representation theory of finite inverse monoids, via the associated M\"obius inversion. We then describe a coboundary structure on $\mathcal{TL}_0(\Bbbk)$ and show that its idempotent completion is coboundary monoidally equivalent to the category of $\mathfrak{sl}_{2}$-crystals. This gives a diagrammatic description of the commutor for $\mathfrak{sl}_{2}$-crystals defined by Henriques and Kamnitzer and of the resulting action of the cactus group. We also study fiber functors of $\mathcal{TL}_0(\Bbbk)$ and discuss how they differ from the $q\neq 0$ case., Comment: 34 pages

Published

2025

2. Simple algebras and exact module categories

Author

Coulembier, Kevin, Stroiński, Mateusz, and Zorman, Tony

Subjects

Mathematics - Representation Theory, Mathematics - Category Theory, Mathematics - Quantum Algebra, 18D25, 18M05

Abstract

We verify a conjecture of Etingof and Ostrik, stating that an algebra object in a finite tensor category is exact if and only if it is a finite direct product of simple algebras. Towards that end, we introduce an analogue of the Jacobson radical of an algebra object, similar to the Jacobson radical of a finite-dimensional algebra. We give applications of our main results in the context of incompressible finite symmetric tensor categories., Comment: 25 pages, 18 figures; comments welcome!

Published

2025

3. Speak & Improve Corpus 2025: an L2 English Speech Corpus for Language Assessment and Feedback

Author

Knill, Kate, Nicholls, Diane, Gales, Mark J. F., Qian, Mengjie, and Stroinski, Pawel

Subjects

Computer Science - Computation and Language

Abstract

We introduce the Speak & Improve Corpus 2025, a dataset of L2 learner English data with holistic scores and language error annotation, collected from open (spontaneous) speaking tests on the Speak & Improve learning platform. The aim of the corpus release is to address a major challenge to developing L2 spoken language processing systems, the lack of publicly available data with high-quality annotations. It is being made available for non-commercial use on the ELiT website. In designing this corpus we have sought to make it cover a wide-range of speaker attributes, from their L1 to their speaking ability, as well as providing manual annotations. This enables a range of language-learning tasks to be examined, such as assessing speaking proficiency or providing feedback on grammatical errors in a learner's speech. Additionally the data supports research into the underlying technology required for these tasks including automatic speech recognition (ASR) of low resource L2 learner English, disfluency detection or spoken grammatical error correction (GEC). The corpus consists of around 315 hours of L2 English learners audio with holistic scores, and a subset of audio annotated with transcriptions and error labels.

Published

2024

4. Reconstruction of module categories in the infinite and non-rigid settings

Author

Stroiński, Mateusz and Zorman, Tony

Subjects

Mathematics - Quantum Algebra, Mathematics - Category Theory, Mathematics - Representation Theory

Abstract

By building on the notions of internal projective and injective objects in a module category introduced by Douglas, Schommer-Pries, and Snyder, we extend the reconstruction theory for module categories of Etingof and Ostrik. More explicitly, instead of algebra objects in finite tensor categories, we consider quasi-finite coalgebra objects in locally finite tensor categories. Moreover, we show that module categories over non-rigid monoidal categories can be reconstructed via lax module monads, which generalize algebra objects. For the monoidal category of finite-dimensional comodules over a (non-Hopf) bialgebra, we give this result a more concrete form, realizing module categories as categories of contramodules over Hopf trimodule algebras -- this specializes to our tensor-categorical results in the Hopf case. In this context, we also give a precise Morita theorem, as well as an analogue of the Eilenberg--Watts theorem for lax module monads and, as a consequence, for Hopf trimodule algebras. Using lax module functors we give a categorical proof of the variant of the fundamental theorem of Hopf modules which applies to Hopf trimodules. We also give a characterization of fusion operators for a Hopf monad as coherence cells for a module functor structure, using which we similarly reinterpret and reprove the Hopf-monadic fundamental theorem of Hopf modules due to Brugui\`eres, Lack, and Virelizier., Comment: 65 pages; big overhaul; added module structure on the algebras of a lax module monad by Linton coequalizers; comments very welcome!

Published

2024

5. Identity in the presence of adjunction

Author

Stroiński, Mateusz

Subjects

Mathematics - Category Theory, Mathematics - Quantum Algebra, Mathematics - Representation Theory

Abstract

We develop a theory of adjunctions in semigroup categories, i.e. monoidal categories without a unit object. We show that a rigid semigroup category is promonoidal, and thus one can naturally adjoin a unit object to it. This extends the previous results of Houston in the symmetric case, and addresses a question of his. It also extends the results in the non-symmetric case with additional finiteness assumptions, obtained by Benson-Etingof-Ostrik, Coulembier and Ko-Mazorchuk-Zhang. We give an interpretation of these results using comonad cohomology, and, in the absence of finiteness conditions, using enriched traces of monoidal categories. As an application of our results, we give a characterization of finite tensor categories in terms of the finitary 2-representation theory of Mazorchuk-Miemietz., Comment: 33 pages

Published

2024

6. Module categories, internal bimodules and Tambara modules

Author

Stroiński, Mateusz

Subjects

Mathematics - Category Theory, Mathematics - Representation Theory

Abstract

We use the theory of Tambara modules to extend and generalize the reconstruction theorem for module categories over a rigid monoidal category to the non-rigid case. We show a biequivalence between the $2$-category of cyclic module categories over a monoidal category $\mathscr{C}$ and the bicategory of algebra and bimodule objects in the category of Tambara modules on $\mathscr{C}$. Using it, we prove that a cyclic module category can be reconstructed as the category of certain free module objects in the category of Tambara modules on $\mathscr{C}$, and give a sufficient condition for its reconstructability as module objects in $\mathscr{C}$. To that end, we extend the definition of the Cayley functor to the non-closed case, and show that Tambara modules give a proarrow equipment for $\mathscr{C}$-module categories, in which $\mathscr{C}$-module functors are characterized as $1$-morphisms admitting a right adjoint. Finally, we show that the $2$-category of all $\mathscr{C}$-module categories embeds into the $2$-category of categories enriched in Tambara modules on $\mathscr{C}$, giving an ''action via enrichment'' result., Comment: 63 pages

Published

2022

7. Finite quotients of singular Artin monoids and categorification of the desingularization map

Author

Jonsson, Helena, Mazorchuk, Volodymyr, Westin, Elin Persson, Srivastava, Shraddha, Stroinski, Mateusz, and Zhu, Xiaoyu

Subjects

Mathematics - Representation Theory, Mathematics - Group Theory

Abstract

We study various aspects of the structure and representation theory of singular Artin monoids. This includes a number of generalizations of the desingularization map and explicit presentations for certain finite quotient monoids of diagrammatic nature. The main result is a categorification of the classical desingularization map for singular Artin monoids associated to finite Weyl groups using BGG category $\mathcal{O}$.

Published

2022

8. Simple transitive 2-representations of bimodules over radical square zero Nakayama algebras via localization

Author

Jonsson, Helena and Stroiński, Mateusz

Subjects

Mathematics - Representation Theory, 18N10, 16D20, 16G10

Abstract

We study the classification problem of simple transitive 2-representations of the 2-category of finite-dimensional bimodules over a radical square zero Nakayama algebra. This results in a complete classification of simple transitive 2-representations whose apex is a finitary two-sided cell. We define a notion of localization of 2-representations. We construct previously unknown simple transitive 2-representations as localizations of cell 2-representations. Using the universal property of our construction we prove that any simple transitive 2-representation with finitary apex is equivalent to a localization of a cell 2-representation., Comment: 25 pages

Published

2021

9. Weighted colimits of 2-representations and star algebras

Author

Stroiński, Mateusz

Subjects

Mathematics - Representation Theory

Abstract

We apply the theory of weighted bicategorical colimits to study the problem of existence and computation of such colimits of birepresentations of finitary bicategories. The main application of our results is the complete classification of simple transitive birepresentations of a bicategory studied in arXiv:1805.05724, which confirms a conjecture made therein., Comment: 31 pages

Published

2021

10. Simple transitive 2-representations of 2-categories associated to self-injective cores

Author

Stroiński, Mateusz

Subjects

Mathematics - Representation Theory

Abstract

Given a finite dimensional algebra $A$, we consider certain sets of idempotents of $A$, called self-injective cores, to which we associate 2-subcategories of the 2-category of projective bimodules over $A$. We classify the simple transitive 2-representations of such 2-subcategories, vastly generalizing the main result of arXiv:1805.05724., Comment: 21 pages

Published

2020

11. On Dirichlet Products Evaluated at Fibonacci Numbers

Author

Stroinski, Uwe

Subjects

Mathematics - Number Theory, 11B39 (primary) 11N05 (secondary)

Abstract

In this work we discuss Dirichlet products evaluated at Fibonacci numbers. As first applications of the results we get a representation of Fibonacci numbers in terms of Euler's totient function, an upper bound on the number of primitive prime divisors and representations of some related Euler products. Moreover, we sum functions over all primitive divisors of a Fibonacci number and obtain a non--trivial fixed point of this operation., Comment: 22 pages, 1 figure

Published

2016