Local analog of the Deligne-Riemann-Roch isomorphism for line bundles in relative dimension 1

Abstract

We prove a local analog of the Deligne-Riemann-Roch isomorphism in the case of line bundles and relative dimension 1. This local analog consists in computation of the class of 12th power of the determinant central extension of a group ind-scheme G by the multiplicative group scheme over Q via the product of 2-cocyles in the second cohomology group. These 2-cocycles are the compositions of the Contou-Carr\`ere symbol with the -product of 1-cocycles. The group ind-scheme G represents the functor which assigns to every commutative ring A the group that is the semidirect product of the group A((t))* of invertible elements of A((t)) and the group of continuous A-automorphisms of A-algebra A((t)). The determinant central extension naturally acts on the determinant line bundle on the moduli stack of geometric data (proper quintets). A proper quintet is a collection of a proper family of curves over Spec A, a line bundle on this family, a section of this family, a relative formal parameter at the section, a formal trivialization of the bundle at the section that satisfy further conditions.