Notes on noncommutative Fitting invariants

Abstract

To each finitely presented module M over a commutative ring R one can associate an R-ideal FittR(M), which is called the (zeroth) Fitting ideal of M over R. This is of interest because it is always contained in the R-annihilator AnnR(M) of M, but is often much easier to compute. This notion has recently been generalised to that of so-called `Fitting invariants' over certain noncommutative rings; the present author considered the case in which R is an o-order in a finite dimensional separable algebra, where o is an integrally closed commutative noetherian complete local domain. This article is a survey of known results and open problems in this context. In particular, we investigate the behaviour of Fitting invariants under direct sums. In the appendix, we present a new approach to Fitting invariants via Morita equivalence.