The relative rank of the endomorphism monoid of a finite G-set
Abstract
For a group G acting on a set X, let EndG(X) be the monoid of all G-equivariant transformations, or G-endomorphisms, of X, and let AutG(X) be its group of units. After discussing few basic results in a general setting, we focus on the case when G and X are both finite in order to determine the smallest cardinality of a set W ⊂eq EndG(X) such that W AutG(X) generates EndG(X); this is known in semigroup theory as the relative rank of EndG(X) modulo AutG(X).
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