On the Cubical Homology Groups of Free Partially Commutative Monoids

Abstract

We study a Leech homology of a locally bounded free partially commutative monoid M(E,I). Given a contravariant natural system of abelian groups F on M(E,I) we build a precubical set T(E,I) with a homological system of abelian groups F and prove that the Leech homology groups Hn(M(E,I),F) are isomorphic to the cubical homology groups Hn(T(E,I),F), n≥ 0. As a consequence we have confirmed a conjecture that if the free partially commutative monoid does not contain >n mutually commuting generators, then its the homological dimension ≤ n. We have built the complexes of finite length for a computation of the Leech homology of such monoids and the Hochschild homology of their monoid rings. The results are applied to the homology of asynchronous transition systems. We give the positive answer to a question that the homological dimension of the asynchronous system does not greater than the maximal number of its mutually independent events. We have built the complex for computing the integral homology groups of an asynchronous transition system by the Smith normal form of integer matrices.

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