Serre Dimension of Monoid Algebras

Abstract

Let R be a commutative Noetherian ring of dimension d, M a commutative cancellative torsion-free monoid of rank r and P a finitely generated projective R[M]-module of rank t. (1) Assume M is -simplicial seminormal. (i) If M∈ (), then Serre dim R[M]≤ d. (ii) If r≤ 3, then Serre dim R[int(M)]≤ d. (2) If M⊂ +2 is a normal monoid of rank 2, then Serre dim R[M]≤ d. (3) Assume M is c-divisible, d=1 and t≥ 3. Then P t P R[M]t-1. (4) Assume R is a uni-branched affine algebra over an algebraically closed field and d=1. Then P t P R[M]t-1.