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7 Pith papers cite this work. Polarity classification is still indexing.

7 Pith papers citing it

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representative citing papers

Conditionals and Modalities in Constructive Quantum Logics

math.LO · 2026-06-30 · unverdicted · novelty 6.0

Axiomatizes iEx-logic as intersection of intuitionistic logic and orthomodular logic with Sasaki hook, and proves the lattice of its extensions is the product of intermediate logics and orthomodular logics lattices.

On the enumeration of Tarski fixed points

cs.DM · 2023-08-15 · unverdicted · novelty 6.0

Derives query lower bounds matching lattice width for Tarski fixed point enumeration of isotone maps and gives poly-space algorithms for increasing/decreasing cases on lattices including binary relations.

Uncertainty About Evidence

cs.LO · 2019-07-22 · unverdicted · novelty 6.0

Introduces models with world-dependent evidence sets to distinguish actual evidence entailment from known entailment, with a sound and complete bi-modal axiomatization generalizing topological spaces.

Reformalization of the Jordan Curve Theorem

cs.AI · 2026-07-02 · unverdicted · novelty 5.0

The authors perform and analyze three reformalizations of the Jordan Curve Theorem from Mizar to Lean, HOL Light to Lean, and HOL Light to Agda.

Priestley Representation of Distributive Precontact Lattices

math.LO · 2026-06-23 · unverdicted · novelty 5.0

The paper gives a Priestley representation for distributive precontact lattices and links precontact substructures, strong sublattices, and congruences to lattice preorders and closed sets in the dual space.

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Showing 2 of 2 citing papers after filters.

  • Conditionals and Modalities in Constructive Quantum Logics math.LO · 2026-06-30 · unverdicted · none · ref 5

    Axiomatizes iEx-logic as intersection of intuitionistic logic and orthomodular logic with Sasaki hook, and proves the lattice of its extensions is the product of intermediate logics and orthomodular logics lattices.

  • Priestley Representation of Distributive Precontact Lattices math.LO · 2026-06-23 · unverdicted · none · ref 9

    The paper gives a Priestley representation for distributive precontact lattices and links precontact substructures, strong sublattices, and congruences to lattice preorders and closed sets in the dual space.