Elementary matrix factorizations over B\'ezout domains

Abstract

We study the homotopy category hef(R,W) (and its Z2-graded version HEF(R,W)) of elementary factorizations, where R is a B\'ezout domain which has prime elements and W=W0 Wc, where W0∈ R× is a square-free element of R and Wc∈ R× is a finite product of primes with order at least two. In this situation, we give criteria for detecting isomorphisms in hef(R,W) and HEF(R,W) and formulas for the number of isomorphism classes of objects. We also study the full subcategory hef(R,W) of the homotopy category hmf(R,W) of finite rank matrix factorizations of W which is additively generated by elementary factorizations. We show that hef(R,W) is Krull-Schmidt and we conjecture that it coincides with hmf(R,W). Finally, we discuss a few classes of examples.