From ad483265ebf2c88b84bf23c66b7a143304c52773 Mon Sep 17 00:00:00 2001 From: aristote Date: Sun, 27 Jul 2025 12:15:34 +0200 Subject: move back to json and rename --- publications/conferences.yaml | 177 ------------------------------------------ 1 file changed, 177 deletions(-) delete mode 100644 publications/conferences.yaml (limited to 'publications/conferences.yaml') diff --git a/publications/conferences.yaml b/publications/conferences.yaml deleted file mode 100644 index 055d028..0000000 --- a/publications/conferences.yaml +++ /dev/null @@ -1,177 +0,0 @@ ---- -references: -- id: aristoteActiveLearningDeterministic2024 - abstract: >- - We study monoidal transducers, transition systems arising as deterministic - automata whose transitions also produce outputs in an arbitrary monoid, for - instance allowing outputs to commute or to cancel out. We use the - categorical framework for minimization and learning of Colcombet, Petrişan - and Stabile to recover the notion of minimal transducer recognizing a - language, and give necessary and sufficient conditions on the output monoid - for this minimal transducer to exist and be unique (up to isomorphism). The - categorical framework then provides an abstract algorithm for learning it - using membership and equivalence queries, and we discuss practical aspects - of this algorithm’s implementation. - accessed: - - year: 2024 - month: 2 - day: 7 - author: - - family: Aristote - given: Quentin - citation-key: aristoteActiveLearningDeterministic2024 - collection-title: Leibniz International Proceedings in Informatics (LIPIcs) - container-title: 32nd EACSL Annual Conference on Computer Science Logic (CSL 2024) - DOI: 10.4230/LIPIcs.CSL.2024.11 - event-place: Dagstuhl, Germany - event-title: Computer Science Logic (CSL) - ISBN: 978-3-95977-310-2 - ISSN: 1868-8969 - issued: - - year: 2024 - language: en - note: Helena Rasiowa award for the Best Student Paper - page: 11:1-11:20 - publisher: Schloss-Dagstuhl - Leibniz Zentrum für Informatik - publisher-place: Dagstuhl, Germany - title: >- - Active Learning of Deterministic Transducers with Outputs in Arbitrary - Monoids - type: paper-conference - URL: https://drops.dagstuhl.de/entities/document/10.4230/LIPIcs.CSL.2024.11 - volume: '288' - -- id: aristoteActiveLearningUpwardclosed2025 - abstract: >- - We give a new proof of a result from well quasi-order theory on the - computability of bases for upwards-closed sets of words. This new proof is - based on Angluin's L* algorithm, that learns an automaton from a minimally - adequate teacher. This relates in particular two results from the 1980s: - Angluin's L* algorithm, and a result from Valk and Jantzen on the - computability of bases for upwards-closed sets of tuples of integers. - - - Along the way, we describe an algorithm for learning quasi-ordered automata - from a minimally adequate teacher, and extend a generalization of Valk and - Jantzen's result, encompassing both words and integers, to finitely - generated monoids. - accessed: - - year: 2025 - month: 5 - day: 6 - author: - - family: Aristote - given: Quentin - citation-key: aristoteActiveLearningUpwardclosed2025 - collection-title: Leibniz International Proceedings in Informatics (LIPIcs) - container-title: 11th Conference on Algebra and Coalgebra in Computer Science (CALCO 2025) - event-place: Dagstuhl, Germany - event-title: Conference on Algebra and Coalgebra in Computer Science (CALCO) - issued: - - year: 2025 - language: en - publisher: Schloss Dagstuhl – Leibniz-Zentrum für Informatik - publisher-place: Dagstuhl, Germany - title: Active learning of upward-closed sets of words - type: paper-conference - URL: https://hal.science/hal-05051620 - -- id: aristoteLearningWeightedAutomata2025 - abstract: >- - We develop a generic reduction procedure for active learning problems. Our - approach is inspired by a recent polynomial-time reduction of the exact - learning problem for weighted automata over integers to that for weighted - automata over rationals (Buna-Marginean et al. 2024). Our procedure improves - the efficiency of a category-theoretic automata learning algorithm, and - poses new questions about the complexity of its implementation when - instantiated to concrete categories. As our second main contribution, we - address these complexity aspects in the concrete setting of learning - weighted automata over number rings, that is, rings of integers in an - algebraic number field. Assuming a full representation of a number ring OK, - we obtain an exact learning algorithm of OK-weighted automata that runs in - polynomial time in the size of the target automaton, the logarithm of the - length of the longest counterexample, the degree of the number field, and - the logarithm of its discriminant. Our algorithm produces an automaton that - has at most one more state than the minimal one, and we prove that doing - better requires solving the principal ideal problem, for which the best - currently known algorithm is in quantum polynomial time. - accessed: - - year: 2025 - month: 4 - day: 28 - author: - - family: Aristote - given: Quentin - - family: Gool - given: Sam - dropping-particle: van - - family: Petrişan - given: Daniela - - family: Shirmohammadi - given: Mahsa - citation-key: aristoteLearningWeightedAutomata2025 - container-title: >- - LICS '25: Proceedings of the 40th Annual ACM/IEEE Symposium on Logic in - Computer Science - event-place: New York, NY, USA - event-title: Logics in Computer Science (LICS) - issued: - - year: 2025 - language: en - publisher: The Association for Computing Machinery - publisher-place: New York, NY, USA - title: Learning Weighted Automata over Number Rings, Concretely and Categorically - type: paper-conference - URL: https://hal.science/hal-05040143 - -- id: aristoteMonotoneWeakDistributive2025 - abstract: >- - In both the category of sets and the category of compact Hausdorff spaces, - there is a monotone weak distributive law that combines two layers of - non-determinism. Noticing the similarity between these two laws, we study - whether the latter can be obtained automatically as a weak lifting of the - former. This holds partially, but does not generalize to other categories of - algebras. We then characterize when exactly monotone weak distributive laws - over powerset monads in categories of algebras exist, on the one hand - exhibiting a law combining probabilities and non-determinism in compact - Hausdorff spaces and showing on the other hand that such laws do not exist - in a lot of other cases. - accessed: - - year: 2025 - month: 2 - day: 25 - author: - - family: Aristote - given: Quentin - citation-key: aristoteMonotoneWeakDistributive2025 - collection-title: Leibniz International Proceedings in Informatics (LIPIcs) - container-title: >- - 42nd International Symposium on Theoretical Aspects of Computer Science - (STACS 2025) - DOI: 10.4230/LIPIcs.STACS.2025.10 - editor: - - family: Beyersdorff - given: Olaf - - family: Pilipczuk - given: Michał - - family: Pimentel - given: Elaine - - family: Thắng - given: Nguyễn Kim - event-place: Dagstuhl, Germany - event-title: Symposium on Theoretical Aspects of Computer Science (STACS) - ISBN: 978-3-95977-365-2 - ISSN: 1868-8969 - issued: - - year: 2025 - language: en - page: 10:1–10:20 - publisher: Schloss Dagstuhl – Leibniz-Zentrum für Informatik - publisher-place: Dagstuhl, Germany - title: >- - Monotone Weak Distributive Laws over the Lifted Powerset Monad in Categories - of Algebras - type: paper-conference - URL: https://drops.dagstuhl.de/entities/document/10.4230/LIPIcs.STACS.2025.10 - volume: '327' -... -- cgit v1.2.3