Factorization invariants in half-factorial affine semigroups

Abstract

Let N A be the monoid generated by A = a1, ..., an ⊂eq Zd. We introduce the homogeneous catenary degree of N A as the smallest N ∈ N with the following property: for each a ∈ N A and any two factorizations u, v of a, there exists factorizations u = w1, ..., wt = v of a such that, for every k, d(wk, wk+1) ≤ N, where d is the usual distance between factorizations, and the length of wk, |wk|, is less than or equal to |u|, |v|. We prove that the homogeneous catenary degree of N A improves the monotone catenary degree as upper bound for the ordinary catenary degree, and we show that it can be effectively computed. We also prove that for half-factorial monoids, the tame degree and the ω-primality coincide, and that all possible catenary degrees of the elements of an affine semigroup of this kind occur as the catenary degree of one of its Betti elements.