Subintegrality and ideal class groups of monoid algebras

Abstract

(1) Let M⊂ N be a commutative cancellative torsion-free and subintegral extension of monoids. Then we prove that in the case of ring extension A[M]⊂ A[N], the two notions, subintegral and weakly subintegral coincide provided Z⊂ A. (2) Let A ⊂ B be an extension of commutative rings and M⊂ N an extension of commutative cancellative torsion-free positive monoids. Let I be a radical ideal in N. Then A[M](I M)A[M] is subintegrally closed in B[N]IB[N] if and only if the group of invertible A-submodules of B is isomorphic to the group of invertible A[M](I M)A[M]-submodules of B[N]IB[N].