Connections on a principal Lie groupoid bundle and representations up to homotopy

Abstract

A Lie groupoid principal bundle is a surjective submersion π P M with an action of X on P with certain additional conditions. This paper offers a suitable definition for the notion of a connection on such bundles. Although every Lie groupoid X has its associated Lie algebroid A:=1* ds X0, it does not admit a natural action on its Lie algebroid. There is no natural action of X on TP either. Choosing a connection H⊂ TX1 on the Lie groupoid X, and considering its induced action up to homotopy of X on graded vector bundle TX0 A, we prove the existence of a short exact sequence of diffeological groupoids over the discrete category M (with appropriate vector space structures on the fibres) for the bundle π P M. We introduce a notion of connection on bundle π P M, and show that such a connection ω splits the sequence. Finally, we show that a connection pair (ω, H) on bundle π P M is isomorphic to any other connection pair.

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