• PARTIALLY ORDERED FILTERS IN PARTIALLY ORDERED SEMIGROUPS
Abstract
In this paper the terms, po filter, po filter of a po semigroup generated by a subset and principle po filter generated by an element a in a po semigroup are introduced. It is proved that in a po semigroup S, the nonempty intersection of a family of po filters is also a po filter of S. It is also proved that a nonempty subset F of a po semigroup S is a po filter if and only if S\F is a completely prime po ideal of S or empty. It is proved that every po filter F of a po semigroup S is a i) po-c-system of S ii) po-m-system of S and iii) po-d-system of S. It is proved that the po filter of a po semigroup S generated by a nonempty subset A is the intersection of all po filters of S containing A. Let S be a po semigroup and a ∈ S, then it is proved that N(a) is the least filter of S containing {a}.
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