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Paper detail

Degree 2 Transformation Semigroups as Continuous Maps on Graphs: Foundations and Structure

We develop the theory of transformation semigroups that have degree 2, that is, act by partial functions on a finite set such that the inverse image of points have at most two elements. We show that the graph of fibers of such an action gives a deep connection between semigroup theory and graph theory. It is known that the Krohn-Rhodes complexity of a degree 2 action is at most 2. We show that the monoid of continuous maps on a graph is the translational hull of an appropriate 0-simple semigroup. We show how group mapping semigroups can be considered as regular covers of their right letter mapping image and relate this to their graph of fibers.

preprint2020arXivOpen access
Stuart W. MargolisJohn Rhodes
math.COmath.GR
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Stuart W. MargolisJohn Rhodes

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