Classifying locally compact semitopological polycyclic monoids
Abstract
We present a complete classification of Hausdorff locally compact polycyclic monoids up to a topological isomorphism. A polycyclic monoid is an inverse monoid with zero, generated by a subset such that xx-1=1 for any x∈ and xy-1=0 for any distinct x,y∈. We prove that any non-discrete Hausdorff locally compact topology with continuous shifts on a polycyclic monoid M coincides with the topology of one-point compactification of the discrete space M\0\.
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