Title of article :
ON INTEGRALITY and GOING-DOWN INSIDE THE FIXED RING OF A MONOID RING
Author/Authors :
Dobbs, David E. Department of Mathematics - University of Tennessee, Knoxville , Shapiro, Jay Department of Mathematics - George Mason University, Fairfax Virginia
Abstract :
An example is given of a finitely generated abelian torsion-free
monoid S on which the group G with two elements acts via semigroup automorphisms such that for any field K, when the given action is extended so
that G acts on the monoid ring K[X; S] via ring automorphisms that fix K
elementwise, the ring extension K[X; SG] ⊆ (K[X; S])G is not integral and
does not satisfy the going-down property
Keywords :
Commutative ring , ring extension , group action , fixed ring , integrality , going-down , semigroup , fixed semigroup , semigroup ring
Journal title :
International Electronic Journal of Algebra
