Infinitesimal dilogarithm on curves over truncated polynomial rings

Abstract

Let C be a smooth and projective curve over the truncated polynomial ring km:=k[t]/(tm), where k is a field of characteristic 0. Using a candidate for the motivic cohomology group H3M(C,Q(3)) based on the Bloch complex of weight 3, we construct regulators to k for every m<r<2m. Specializing this construction, we obtain an invariant m,r(f g h) of rational functions f, g and h on C. The current work is a twofold generalization of our work on the infinitesimal Chow dilogarithm: we sheafify the previous construction and therefore do not restrict ourselves to triples of rational functions and we construct the regulator for any m<r<2m, rather than only for m=2. We also define regulators of cycles, which we expect to give a complete set of invariants for the infinitesimal part of CH2(km,3). This generalizes Park's work, where the additive Chow cycles, namely the case of cycles close to 0, is handled for r=m+1. In this paper, we generalize the reciprocity theorem to pairs of cycles which are the same modulo (tm) and for any m<r<2m. We expect the theory of the paper to give regulators on categories of motives over rings with nilpotents.