On the Koszul property of toric face rings

Abstract

Toric face rings is a generalization of the concepts of affine monoid rings and Stanley-Reisner rings. We consider several properties which imply Koszulness for toric face rings over a field k. Generalizing works of Laudal, Sletsje and Herzog et al., graded Betti numbers of k over the toric face rings are computed, and a characterization of Koszul toric face rings is provided. We investigate a conjecture suggested by R\"omer about the sufficient condition for the Koszul property. The conjecture is inspired by Fr\"oberg's theorem on the Koszulness of quadratic squarefree monomial ideals. Finally, it is proved that initially Koszul toric face rings are affine monoid rings.