Involution on the Graded Grothendieck Ring of Varieties and D-Singularities

Abstract

We realize a graded variant K0(Varkdim) of the Grothendieck ring of varieties as a quadratic extension of the subring K0(Varksp) spanned by classes of smooth and proper varieties. As such, there exists a natural involution D on K0(Varkdim). We show that D commutes with the symmetric power operations Symm up to zero divisors. Moreover, we study varieties which are smooth up to cut-and-paste relations, which we call D-singular varieties, and we give applications to compactifications of varieties and the irrationality of Kapranov zeta functions.