Differential Geometry of Gerbes

TL;DR

This paper develops a global framework for connective structures and 3-curvature of gerbes, extending classical notions from principal bundles to higher geometric objects, with new definitions and identities.

Contribution

It provides a global definition of connective structures and 3-curvature for gerbes, extending previous local descriptions to a comprehensive global theory.

Findings

Defined global connective structures for gerbes

Introduced a global 3-curvature as a 3-form on X

Derived a generalized Bianchi identity for gerbes

Abstract

We define in a global manner the notion of a connective structure for a gerbe on a space X. When the gerbe is endowed with trivializing data with respect to an open cover of X, we describe this connective structure in two separate ways, which extend from abelian to general gerbes the corresponding descriptions due to J.- L. Brylinski and N. Hitchin. We give a global definition of the 3-curvature of this connective structure as a 3-form on X with values in the Lie stack of the gauge stack of the gerbe. We also study this notion locally in terms of more traditional Lie algebra-valued 3-forms. The Bianchi identity, which the curvature of a connection on a principal bundle satisfies, is replaced here by a more elaborate equation.