Leighton's Theorem: extensions, limitations, and quasitrees
Abstract
Leighton's Theorem states that if there is a tree T that covers two finite graphs G1 and G2, then there is a finite graph G that is covered by T and covers both G1 and G2. We prove that this result does not extend to regular covers by graphs other than trees. Nor does it extend to non-regular covers by a quasitree, even if the automorphism group of the quasitree contains a uniform lattice. But it does extend to regular coverings by quasitrees.
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