Higher dimensional Teter rings

Abstract

Let (A,m) be a complete Cohen-Macaulay local ring. Assume A is not Gorenstein. We say A is a Teter ring if there exists a complete Gorenstein ring (B,n) with B = A and a surjective map B → A with e(B) - e(A) = 1 (here e(A) denotes multiplicity of A). We give an intrinsic characterization of Teter rings which are domains. We say a Teter ring is a strongly Teter ring if G(B) = i ≥ 0ni/ni+1 is also a Gorenstein ring. We give an intrinsic characterizations of strongly Teter rings which are domains. If k is algebraically closed field of characteristic zero and R is a standard graded Cohen-Macaulay k-algebra of finite representation type (and not Gorenstein) then we show that RM is a Teter ring (here M is the maximal homogeneous ideal of R).