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  1. Counting to Infinity: Graded Modal Logic with an Infinity Diamond.Ignacio Bellas Acosta & Yde Venema - 2024 - Review of Symbolic Logic 17 (1):1-35.
    We extend the languages of both basic and graded modal logic with the infinity diamond, a modality that expresses the existence of infinitely many successors having a certain property. In both cases we define a natural notion of bisimilarity for the resulting formalisms, that we dub $\mathtt {ML}^{\infty }$ and $\mathtt {GML}^{\infty }$, respectively. We then characterise these logics as the bisimulation-invariant fragments of the naturally corresponding predicate logic, viz., the extension of first-order logic with the infinity quantifier. Furthermore, for (...)
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  • A Single-Sorted Theory of Multisets.Hoang-Vu Dang - 2014 - Notre Dame Journal of Formal Logic 55 (3):299-332.
    An axiomatic account of multiset theory is given, where multiplicities are of the same sort as sets. Various theories are proposed covering different existing multiset systems, as well as a stronger theory which is equiconsistent with Zermelo–Fraenkel set theory and with antifoundation. The inclusion relation receives a recursive definition in terms of membership and is shown to be not always antisymmetric.
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  • Non-wellfounded set theory.Lawrence S. Moss - 2008 - Stanford Encyclopedia of Philosophy.
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  • A Tractarian Universe.Albert Visser - 2012 - Journal of Philosophical Logic 41 (3):519-545.
    In this paper we develop a reconstruction of the Tractatus ontology. The basic idea is that objects are unsaturated and that Sachlagen are like molecules. Bisimulation is used for the proper individuation of the Sachlagen. We show that the ordering of the Sachlagen is a complete distributive, lattice. It is atomistic , i.e., each Sachlage is the supremum of the Sachverhalte below it. We exhibit three normal forms for Sachlagen: the bisimulation collapse, the canonical unraveling and the canonical bisimulation collapse. (...)
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