We introduce arboreal categories, which have an intrinsic process structure, allowing dynamic notions such as bisimulation and back-and-forth games, and resource notions such as number of rounds of a game, to be defined. These are related to extensional or "static" structures via arboreal covers, which are resource-indexed comonadic adjunctions. These ideas are developed in a very general, axiomatic setting, and applied to relational structures, where the comonadic constructions for pebbling, Ehrenfeucht-Fraïssé and modal bisimulation games recently introduced in [Abramsky et al., 2017; S. Abramsky and N. Shah, 2018; Abramsky and Shah, 2021] are recovered, showing that many of the fundamental notions of finite model theory and descriptive complexity arise from instances of arboreal covers.
Arboreal Categories and Resources / S. Abramsky, L. Reggio (LEIBNIZ INTERNATIONAL PROCEEDINGS IN INFORMATICS). - In: 48th International Colloquium on Automata, Languages, and Programming (ICALP 2021) / [a cura di] N. Bansal, E. Merelli, J. Worrell. - [s.l] : LIPICS, 2021. - ISBN 978-3-95977-195-5. - pp. 1-20 (( Intervento presentato al 48. convegno International Colloquium on Automata, Languages, and Programming tenutosi a Glasgow nel 2021 [10.4230/LIPIcs.ICALP.2021.115].
Arboreal Categories and Resources
L. Reggio
2021
Abstract
We introduce arboreal categories, which have an intrinsic process structure, allowing dynamic notions such as bisimulation and back-and-forth games, and resource notions such as number of rounds of a game, to be defined. These are related to extensional or "static" structures via arboreal covers, which are resource-indexed comonadic adjunctions. These ideas are developed in a very general, axiomatic setting, and applied to relational structures, where the comonadic constructions for pebbling, Ehrenfeucht-Fraïssé and modal bisimulation games recently introduced in [Abramsky et al., 2017; S. Abramsky and N. Shah, 2018; Abramsky and Shah, 2021] are recovered, showing that many of the fundamental notions of finite model theory and descriptive complexity arise from instances of arboreal covers.
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