Logical dual concepts based on mathematical morphology in stratified institutions: applications to spatial reasoning

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Journal of Applied Non-Classical Logics 29 (4):392-429 (2019)
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Abstract

Several logical operators are defined as dual pairs, in different types of logics. Such dual pairs of operators also occur in other algebraic theories, such as mathematical morphology. Based on this observation, this paper proposes to define, at the abstract level of institutions, a pair of abstract dual and logical operators as morphological erosion and dilation. Standard quantifiers and modalities are then derived from these two abstract logical operators. These operators are studied both on sets of states and sets of models. To cope with the lack of explicit set of states in institutions, the proposed abstract logical dual operators are defined in an extension of institutions, the stratified institutions, which take into account the notion of open sentences, whose satisfaction is parametrised by sets of states. A hint on the potential interest of the proposed framework for spatial reasoning is also provided.

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10.1080/11663081.2019.1668678

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Citations of this work

Abstract Categorical Logic.Marc Aiguier & Isabelle Bloch - 2023 - Logica Universalis 17 (1):23-67.

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References found in this work

The completeness of the first-order functional calculus.Leon Henkin - 1949 - Journal of Symbolic Logic 14 (3):159-166.
Axioms for abstract model theory.K. Jon Barwise - 1974 - Annals of Mathematical Logic 7 (2-3):221-265.
The Completeness of the First-Order Functional Calculus.Leon Henkin - 1950 - Journal of Symbolic Logic 15 (1):68-68.

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