G-groups of Cohen-Macaulay Rings with n-Cluster Tilting Objects
Abstract
Let (R, m, k) denote a local Cohen-Macaulay ring such that the category of maximal Cohen-Macaulay R-modules mcm\ R contains an n-cluster tilting object L. In this paper, we compute G1(R) := K1(mod\ R) explicitly as a direct sum of a free group and a specified quotient of autR(L)ab when R is a k-algebra and k is algebraically closed (and char(k)≠ 2). Moreover, we give some explicit computations of autR(L)ab and G1(R) for certain hypersurface singularities.
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