Fiber integration of gerbes and Deligne line bundles

Abstract

Let π: X S be a family of smooth projective curves, and let L and M be a pair of line bundles on X. We show that Deligne's line bundle L,M can be obtained from the K2-gerbe GL,M constructed in a previous work by the authors via an integration along the fiber map for gerbes that categorifies the well known one arising from the Leray spectral sequence of π. Our construction provides a full account of the biadditivity properties of L,M. The functorial description of the low degree maps in the Leray spectral sequence for π we develop are of independent interest, and along the course we provide an example of their application to the Brauer group.