On the finiteness of certain factorization invariants

Abstract

Let H be a monoid, F(X) be the free monoid on a set X, and πH be the unique extension of the identity map on H to a monoid homomorphism F(H) H. Given A ⊂eq H, an A-word z (i.e., an element of F(A)) is minimal if πH( z) πH( z') for every permutation z' of a proper subword of z. The minimal A-elasticity of H is then the supremum of all rational numbers m/n with m, n ∈ N+ such that there exist minimal A-words a and b of length m and n, resp., with πH( a) = πH( b). Among other things, we show that if H is commutative and A is finite, then the minimal A-elasticity of H is finite. This yields a non-trivial generalization of the finiteness part of a classical theorem of Anderson et al. from the case where H is cancellative, commutative, and finitely generated (f.g.) modulo units and A is the set A(H) of its atoms. We also check that commutativity is somewhat essential here, by proving the existence of an atomic, cancellative, f.g. monoid with trivial group of units whose minimal A(H)-elasticity is infinite.