Rings of Teter type
Abstract
Let R be a Cohen--Macaulay local K-algebra or a standard graded K-algebra over a field K with a canonical module ωR. The trace of ωR is the ideal tr(ωR) of R which is the sum of those ideals (ωR) with ∈ HomR(ωR,R). The smallest number s for which there exist 1, …, s ∈ HomR(ωR,R) with tr(ωR)=1(ωR) + ·s + s(ωR) is called the Teter number of R. We say that R is of Teter type if s = 1. It is shown that R is not of Teter type if R is generically Gorenstein. In the present paper, we focus especially on 0-dimensional graded and monomial K-algebras and present various classes of such algebras which are of Teter type.
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