Atiyah sequence and Gauge transformations of a principal 2-bundle over a Lie groupoid

Abstract

In this paper, a notion of a principal 2-bundle over a Lie groupoid has been introduced. For such principal 2-bundles, we produced a short exact sequence of VB-groupoids, namely, the Atiyah sequence. Two notions of connection structures viz. strict connections and semi-strict connections on a principal 2-bundle arising respectively, from a retraction of the Atiyah sequence and a retraction up to a natural isomorphism have been introduced. We constructed a class of principal G=[G1 G0]-bundles and connections from a given principal G0-bundle E0→ X0 over [X1 X0] with connection. An existence criterion for the connections on a principal 2-bundle over a proper, \'etale Lie groupoid is proposed. The action of the 2-group of gauge transformations on the category of strict and semi-strict connections has been studied. Finally we noted an extended symmetry of the category of semi-strict connections.