On the existence of birational maximal Cohen-Macaulay modules over biradical extensions in mixed characteristic

Abstract

Let S be an unramified regular local ring of mixed characteristic p≥ 3 and Sp the subring of S obtained by lifting to S the image of the Frobenius map on S/pS. Let R be the integral closure of S in a biradical extension of degree p2 of its quotient field obtained by adjoining p-th roots of sufficiently general square free elements f,g∈ Sp. We show that R admits a birational maximal Cohen-Macaulay module. It is noted that R is not automatically Cohen-Macaulay.