The Hrushovski Property for Compact Special Cube Complexes
Abstract
We show that any compact nonpositively curved cube complex Y embeds in a compact nonpositively curved cube complex R where each combinatorial injective partial local isometry of Y extends to an automorphism of R. When Y is special and the collection of injective partial local isometries satisfies certain conditions, we show that R can be chosen to be special and the embedding Y R can be chosen to be a local isometry.
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