on residuated lattices with universal quantifiers
نویسندگان
چکیده
we consider properties of residuated lattices with universal quantifier and show that, for a residuated lattice $x$, $(x, forall)$ is a residuated lattice with a quantifier if and only if there is an $m$-relatively complete substructure of $x$. we also show that, for a strong residuated lattice $x$, $bigcap {p_{lambda} ,|,p_{lambda} {rm is an} m{rm -filter} } = {1}$ and hence that any strong residuated lattice is a subdirect product of a strong residuated lattice with a universal quantifier ${ x/p_{lambda} }$, where $p_{lambda}$ is a prime $m$-filter. as a corollary of this result, we prove that every strong monadic mtl-algebra (bl- and mv-algebra) is a subdirect product of linearly ordered strong monadic mtl-algebras (bl- and mv-algebras, respectively).
منابع مشابه
On residuated lattices with universal quantifiers
We consider properties of residuated lattices with universal quantifier and show that, for a residuated lattice $X$, $(X, forall)$ is a residuated lattice with a quantifier if and only if there is an $m$-relatively complete substructure of $X$. We also show that, for a strong residuated lattice $X$, $bigcap {P_{lambda} ,|,P_{lambda} {rm is an} m{rm -filter} } = {1}$ and hence that any strong re...
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عنوان ژورنال:
bulletin of the iranian mathematical societyجلد ۴۱، شماره ۴، صفحات ۹۲۳-۹۲۹
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