Abstract Factorization Theorems with Applications to Idempotent Factorizations

Abstract

Let be a preorder on a monoid H and s be an integer 2. The -height of an x ∈ H is the sup of the integers k 1 for which there is a (strictly) -decreasing sequence x1,…,xk of -non-units of H with x1 = x (with :=0), where u∈ H is a -unit if u 1H u and a -non-unit otherwise. We say H is -artinian if there exists no -decreasing sequence x1,x2,… of elements of H; and strongly -artinian if the -height of each element is finite. We establish that, if H is -artinian, then each -non-unit x∈ H factors through the -irreducibles of degree s, where a -irreducible of degree s is a -non-unit a∈ H that cannot be written as a product of s or fewer -non-units each of which is (strictly) smaller than a with respect to . In addition, we show that, if H is strongly -artinian, then x factors through the -quarks of H, where a -quark is a -min -non-unit. In the process, we also obtain upper bounds for the length of a shortest factorization of x (into either -irreducible of degree s or -quarks) in terms of its -height. Next, we specialize these abstract results to the case in which H is the multiplicative submonoid of a ring R formed by the zero divisors and the identity 1R, and is the preorder on H defined by a b iff rR(1R-b)⊂eq rR(1R-a), where rR(·) denotes a right annihilator. We can thus recover and improve on classical theorems of J.A. Erdos (1967), R.J.H. Dawlings (1981), and J. Fountain (1991) on idempotent factorizations in the endomorphism ring of a free module of finite rank over a skew field or a commutative DVD.