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Subresiduated lattice ordered commutative monoids

Logic 2022-11-28 v1

Abstract

A subresiduated lattice ordered commutative monoid (or srl-monoid for short) is a pair (A,Q)(\textbf{A},Q) where A=(A,,,,e)\textbf{A}=(A,\wedge,\vee,\cdot,e) is an algebra of type (2,2,2,0)(2,2,2,0) such that (A,,)(A,\wedge,\vee) is a lattice, (A,,e)(A,\cdot,e) is a commutative monoid, (ab)c=(ac)(bc)(a\vee b)\cdot c = (a\cdot c) \vee (b\cdot c) for every a,b,cAa,b,c\in A and QQ is a subalgebra of \textbf{A} such that for each a,bAa,b\in A there exists cQc\in Q with the property that for all qQq\in Q, aqba\cdot q \leq b if and only if qcq\leq c. This cc is denoted by aQba\rightarrow_Q b, or simply by aba\rightarrow b. The srl-monoids (A,Q)(\textbf{A},Q) can be regarded as algebras (A,,,,,e)(A,\wedge,\vee,\cdot,\rightarrow, e) of type (2,2,2,2,0)(2,2,2,2,0). These algebras are a generalization of subresiduated lattices and commutative residuated lattices respectively. In this paper we prove that the class of srl-monoids forms a variety. We show that the lattice of congruences of any srl-monoid is isomorphic to the lattice of its strongly convex subalgebras and we also give a description of the strongly convex subalgebra generated by a subset of the negative cone of any srl-monoid. We apply both results in order to study the lattice of congruences of any srl-monoid by giving as application alternative equational basis for the variety of srl-monoids generated by its totally ordered members.

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Cite

@article{arxiv.2211.14186,
  title  = {Subresiduated lattice ordered commutative monoids},
  author = {Cornejo J. M. and San Martín H. J. and Sígal V},
  journal= {arXiv preprint arXiv:2211.14186},
  year   = {2022}
}

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