Properties of Congruence Lattices of Graph Inverse Semigroups
Abstract
From any directed graph E one can construct the graph inverse semigroup G(E), whose elements, roughly speaking, correspond to paths in E. Wang and Luo showed that the congruence lattice L(G(E)) of G(E) is upper-semimodular for every graph E, but can fail to be lower-semimodular for some E. We provide a simple characterisation of the graphs E for which L(G(E)) is lower-semimodular. We also describe those E such that L(G(E)) is atomistic, and characterise the minimal generating sets for L(G(E)) when E is finite and simple.
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