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Autore principale: Ovalle, Carlos Ramírez
Natura: Preprint
Pubblicazione: 2026
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Accesso online:https://arxiv.org/abs/2603.28946
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author Ovalle, Carlos Ramírez
author_facet Ovalle, Carlos Ramírez
contents We study a resource-sensitive fragment of the problem of extracting a logical discipline from a class of neural architectures by passing through categorization. The starting point is not a pre-existing logic but a category of zone-labelled parametrised blocks together with a disciplined record of which forms of copying, discarding, and zone coercion are architecturally licensed. From this categorized architecture we read off a subexponential signature and then define a tensorial sequent calculus whose structural rules are indexed by the extracted zones. The paper proves three kinds of results. First, the resulting architectural category is symmetric monoidal. Second, the extracted proof system admits cut elimination. Third, derivations are sound with respect to the licensed categorical diagrams generated by the architectural discipline. The outcome is a theorem-bearing core of the architecture-to-category-to-logic programme: subexponential structure is not postulated in advance but read from categorical data encoding differentiated memory and context behaviour.
format Preprint
id arxiv_https___arxiv_org_abs_2603_28946
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle From categorized neural architectures to subexponential proof theory
Ovalle, Carlos Ramírez
Logic in Computer Science
03F52, 18C50, 18M15, 68T07
F.4.1; F.3.2; I.2.6
We study a resource-sensitive fragment of the problem of extracting a logical discipline from a class of neural architectures by passing through categorization. The starting point is not a pre-existing logic but a category of zone-labelled parametrised blocks together with a disciplined record of which forms of copying, discarding, and zone coercion are architecturally licensed. From this categorized architecture we read off a subexponential signature and then define a tensorial sequent calculus whose structural rules are indexed by the extracted zones. The paper proves three kinds of results. First, the resulting architectural category is symmetric monoidal. Second, the extracted proof system admits cut elimination. Third, derivations are sound with respect to the licensed categorical diagrams generated by the architectural discipline. The outcome is a theorem-bearing core of the architecture-to-category-to-logic programme: subexponential structure is not postulated in advance but read from categorical data encoding differentiated memory and context behaviour.
title From categorized neural architectures to subexponential proof theory
topic Logic in Computer Science
03F52, 18C50, 18M15, 68T07
F.4.1; F.3.2; I.2.6
url https://arxiv.org/abs/2603.28946