Algorithmic Correspondence and Canonicity for Distributive Modal Logic

We define the algorithm ALBA for the language of the same distributive modal logic (DML) for which a Sahlqvist theorem was proved by Gehrke, Nagahashi, and Venema. Successful executions of ALBA compute the local first-order correspondents of input DML inequalities , and also guarantee their canonici...

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Published in:	Annals of Pure and Applied Logic
Main Authors:	Conradie, W., Palmigiano, A.
Format:	Article in Journal/Newspaper
Language:	English
Published:	2012
Subjects:	DML
Online Access:	https://dare.uva.nl/personal/pure/en/publications/algorithmic-correspondence-and-canonicity-for-distributive-modal-logic(065b1b8e-bd03-442f-a756-e4b142adf867).html https://doi.org/10.1016/j.apal.2011.10.004

id	ftunivamstpubl:oai:dare.uva.nl:openaire_cris_publications/065b1b8e-bd03-442f-a756-e4b142adf867
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spelling	ftunivamstpubl:oai:dare.uva.nl:openaire_cris_publications/065b1b8e-bd03-442f-a756-e4b142adf867 2024-09-30T14:34:09+00:00 Algorithmic Correspondence and Canonicity for Distributive Modal Logic Conradie, W. Palmigiano, A. 2012-03 https://dare.uva.nl/personal/pure/en/publications/algorithmic-correspondence-and-canonicity-for-distributive-modal-logic(065b1b8e-bd03-442f-a756-e4b142adf867).html https://doi.org/10.1016/j.apal.2011.10.004 eng eng https://dare.uva.nl/personal/pure/en/publications/algorithmic-correspondence-and-canonicity-for-distributive-modal-logic(065b1b8e-bd03-442f-a756-e4b142adf867).html info:eu-repo/semantics/closedAccess Conradie , W & Palmigiano , A 2012 , ' Algorithmic Correspondence and Canonicity for Distributive Modal Logic ' , Annals of Pure and Applied Logic , vol. 163 , no. 3 , pp. 338-376 . https://doi.org/10.1016/j.apal.2011.10.004 article 2012 ftunivamstpubl https://doi.org/10.1016/j.apal.2011.10.004 2024-09-12T16:38:25Z We define the algorithm ALBA for the language of the same distributive modal logic (DML) for which a Sahlqvist theorem was proved by Gehrke, Nagahashi, and Venema. Successful executions of ALBA compute the local first-order correspondents of input DML inequalities , and also guarantee their canonicity. The class of inequalities on which ALBA is successful is strictly larger than the newly introduced class of inductive inequalities , which in its turn properly extends the Sahlqvist inequalities of Gehrke et al. Evidence is given to the effect that, as their name suggests, inductive inequalities are the distributive counterparts of the inductive formulas of Goranko and Vakarelov in the classical setting. Article in Journal/Newspaper DML Universiteit van Amsterdam: Digital Academic Repository (UvA DARE) Annals of Pure and Applied Logic 163 3 338 376
institution	Open Polar
collection	Universiteit van Amsterdam: Digital Academic Repository (UvA DARE)
op_collection_id	ftunivamstpubl
language	English
description	We define the algorithm ALBA for the language of the same distributive modal logic (DML) for which a Sahlqvist theorem was proved by Gehrke, Nagahashi, and Venema. Successful executions of ALBA compute the local first-order correspondents of input DML inequalities , and also guarantee their canonicity. The class of inequalities on which ALBA is successful is strictly larger than the newly introduced class of inductive inequalities , which in its turn properly extends the Sahlqvist inequalities of Gehrke et al. Evidence is given to the effect that, as their name suggests, inductive inequalities are the distributive counterparts of the inductive formulas of Goranko and Vakarelov in the classical setting.
format	Article in Journal/Newspaper
author	Conradie, W. Palmigiano, A.
spellingShingle	Conradie, W. Palmigiano, A. Algorithmic Correspondence and Canonicity for Distributive Modal Logic
author_facet	Conradie, W. Palmigiano, A.
author_sort	Conradie, W.
title	Algorithmic Correspondence and Canonicity for Distributive Modal Logic
title_short	Algorithmic Correspondence and Canonicity for Distributive Modal Logic
title_full	Algorithmic Correspondence and Canonicity for Distributive Modal Logic
title_fullStr	Algorithmic Correspondence and Canonicity for Distributive Modal Logic
title_full_unstemmed	Algorithmic Correspondence and Canonicity for Distributive Modal Logic
title_sort	algorithmic correspondence and canonicity for distributive modal logic
publishDate	2012
url	https://dare.uva.nl/personal/pure/en/publications/algorithmic-correspondence-and-canonicity-for-distributive-modal-logic(065b1b8e-bd03-442f-a756-e4b142adf867).html https://doi.org/10.1016/j.apal.2011.10.004
genre	DML
genre_facet	DML
op_source	Conradie , W & Palmigiano , A 2012 , ' Algorithmic Correspondence and Canonicity for Distributive Modal Logic ' , Annals of Pure and Applied Logic , vol. 163 , no. 3 , pp. 338-376 . https://doi.org/10.1016/j.apal.2011.10.004
op_relation	https://dare.uva.nl/personal/pure/en/publications/algorithmic-correspondence-and-canonicity-for-distributive-modal-logic(065b1b8e-bd03-442f-a756-e4b142adf867).html
op_rights	info:eu-repo/semantics/closedAccess
op_doi	https://doi.org/10.1016/j.apal.2011.10.004
container_title	Annals of Pure and Applied Logic
container_volume	163
container_issue	3
container_start_page	338
op_container_end_page	376
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Algorithmic Correspondence and Canonicity for Distributive Modal Logic

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