Connected sums of Gorenstein local rings

Abstract

A new construction of rings is introduced, studied, and applied. Given surjective homomorphisms R T S of local rings, and ideals in R and S that are isomorphic to some T-module V, the connected sum R#TS is defined to be the local ring obtained by factoring out the diagonal image of V in the fiber product R×TS. When T is Cohen-Macaulay of dimension d and V is a canonical module of T, it is proved that if R and S are Gorenstein of dimension d, then so is R#TS. This result is used to study how closely an artinian ring can be approximated by Gorenstein rings mapping onto it. It is proved that when T is a field the cohomology algebra *R#kS(k,k) is an amalgam of the algebras *R(k,k) and *S(k,k) over isomorphic polynomial subalgebras generated by one element of degree 2. This is used to show that when T is regular, the ring R#TS almost never is complete intersection.