Commutative nilpotent transformation semigroups
Abstract
Cameron, et al. determined the maximum size of a null subsemigroup of the full transformation semigroup T(X) on a finite set X and provided a description of the null semigroups that achieve that size. In this paper we extend the results on null semigroups (which are commutative) to commutative nilpotent semigroups. Using a mixture of algebraic and combinatorial techniques, we show that, when X is finite, the maximum order of a commutative nilpotent subsemigroup of T(X) is equal to the maximum order of a null subsemigroup of T(X) and we prove that the largest commutative nilpotent subsemigroups of T(X) are the null semigroups previoulsy characterized by Cameron, et al..
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