Toric rings attached to simplicial complexes

Abstract

We consider standard graded toric rings R whose generators correspond to the faces of a simplicial complex . When R is normal, it is shown that its divisor class group is free. For a flag complex which is the clique complex of a perfect graph, a nice description for the class group and the canonical module of R in terms of the minimal vertex covers of the graph is given. Moreover, for a quasi-forest simplicial complex a quadratic Gr\"obner basis for the defining ideal of R is presented. Using this fact we give combinatorial descriptions for the a-invariant and the Gorenstein property of R.