Counting Finite Linearly Ordered Involutive Bisemilattices

机译：计算有限的线性有序对合Bisemilattices

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The class of involutive bisemilattices plays the role of the algebraic counterpart of paraconsistent weak Kleene logic. Involutive bisemilattices can be represented as Plonka sums of Boolean algebras, that is semilattice direct systems of Boolean algebras. In this paper we exploit the Plonka sum representation with the aim of counting, up to isomorphism, finite involutive bisemilattices whose direct system is given by totally ordered semilattices.

机译：对合双半格的类别扮演了超常一致弱Kleene逻辑的代数对应物的角色。对合双半格可以表示为布尔代数的Plonka和，即布尔代数的半格直接系统。在本文中，我们利用Plonka和表示来计算直到同构为止的有限对合双半格，其直接系统由全有序半格给出。

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《International conference on relational and algebraic methods in computer science》|2018年|166-183|共18页
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Stefano Bonzio; Michele Pra Baldi; Diego Valota;
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Finite involutive bisemilattices; Weak Kleene logic Plonka sums;

机译：有限渐近双半格;弱Kleene逻辑Plonka总和;

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1. A Duality for Involutive Bisemilattices [J] . Bonzio Stefano, Loi Andrea, Peruzzi Luisa Studia Logica . 2019,第2期

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2. A Lax integrable hierarchy, N-Hamiltonian structure, r-matrix, finite-dimensional Liouville integrable involutive systems, and involutive solutions [J] . Yan ZY., Zhang HQ. Chaos, Solitons and Fractals: Applications in Science and Engineering: An Interdisciplinary Journal of Nonlinear Science . 2002,第7期

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3. Bijective Counting of Involutive Baxter Permutations [J] . Eric Fusy Fundamenta Informaticae . 2012,第1a4期

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4. Counting Finite Linearly Ordered Involutive Bisemilattices [C] . Stefano Bonzio, Michele Pra Baldi, Diego Valota International Conference on Relational and Algebraic Methods in Computer Science . 2018

机译：计数有限线性订购的涉及涉及的Bisemilartices
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7. A duality for involutive bisemilattices [O] . Bonzio, Stefano, Loi, Andrea, Peruzzi, Luisa 2017

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Counting Finite Linearly Ordered Involutive Bisemilattices

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