Spaces of directed paths on pre-cubical sets II
Abstract
For a given pre-cubical set (--set) K with two distinguished vertices , , we prove that the space (K) of d-paths on the geometric realization of K with source and target is homotopy equivalent to its subspace t(K) of tame d-paths. When K is the underlying --set of a Higher Dimensional Automaton A, tame d-paths on K represent step executions of A. Then, we define the cube chain category of K and prove that its nerve is weakly homotopy equivalent to (K).
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