Semilattice Indecomposable Finite Semigroups With Large Subsemilattices
Abstract
In this paper we show that if Y is a subsemilattice of a finite semilattice indecomposable semigroup S then |Y|≤ 2 |S|-14+1. We also characterize finite semilattice indecomposable semigroups S which contains a subsemilattice Y with |S|=4k+1 and |Y|=2 |S|-14+1=2k+1. They are special inverse semigroups. Our investigation is based on our new result proved in this paper which characterize finite semilattice indecomposable semigroups with a zero by only use the properties of its semigroup algebra.
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