Test ideals in diagonal hypersurface rings II

Abstract

Let R=k[x1, ..., xn]/(x1d + ... + xnd), where k is a field of characteristic p, p does not divide d and n ≥ 3. We describe a method for computing the test ideal for these diagonal hypersurface rings. This method involves using a characterization of test ideals in Gorenstein rings as well as developing a way to compute tight closures of certain ideals despite the lack of a general algorithm. In addition, we compute examples of test ideals in diagonal hypersurface rings of small characteristic (relative to d) including several that are not integrally closed. These examples provide a negative answer to Smith's (2000, Comm. in Alg.) question of whether the test id eal in general is always integrally closed.

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