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Simple, local and subdirectly irreducible state residuated lattices
Volume 62, no. 2
(2021),
pp. 365–383
https://doi.org/10.33044/revuma.1722
Abstract
This paper is devoted to investigating the notions of simple, local and
subdirectly irreducible state residuated lattices and some of their related
properties. The filters generated by a subset in state residuated
lattices are characterized and it is shown that the lattice of filters of
a state residuated lattice forms a complete Heyting algebra. Maximal,
prime and minimal prime filters of a state residuated lattice are
investigated and it is shown that any filter of a state residuated lattice
contains a minimal prime filter.
Finally, the relevant notions are discussed and characterized.
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Published by the Unión Matemática Argentina |