Criteria for existence of semigroup homomorphisms and projective rank functions

Abstract

Let P, S, and T be semigroups, f:P S and g:P T semigroup homomorphisms, and X a generating set for S (possibly infinite). Clearly, a <i>necessary</i> condition for there to exist a homomorphism S T making a commuting triangle with f and g is that for every relation f(p) = w(x1,\,…\,,\,xn) holding in S, with p∈ P, w a semigroup word, and x1,\,…\,,\,xn ∈ X, there exist t1,\,…,\,tn∈ T satisfying g(p) = w(t1,\,…\,,\,tn). Under what assumptions will that also be sufficient? We show that one such family of assumptions is that (i) every element of S is a divisor some element of f(P), (ii) T is right and left cancellative, (iii) T is power-cancellative, i.e, xd = yd x = y for d > 0, and (iv) a certain technical condition which, in particular, holds if T admits a semigroup ordering with the order-type of the natural numbers. As an application, we obtain an elementary criterion for the existence of an integer-valued rank function on finitely generated projective modules over a ring.

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