Integrating infinitesimal (super) actions

Abstract

In this paper we generalize some results of Richard Palais to the case of Lie supergroups and Lie superalgebras. More precisely, let G be a Lie supergroup, g its Lie superalgebra and let be an infinitesimal action (a representation) of g on a supermanifold M. We will show that there always exists a local (smooth left) action of G on M such that is the map that associates the fundamental vector field on M to an algebra element (we will say that the action integrates ). We also show that if is univalent, then there exists a unique maximal local action of G on M integrating . And finally we show that if G is simply connected and all (smooth, even) vector fields (X) are complete then there exists a global (smooth left) action of G on M integrating . Omitting all references to the super setting will turn our proofs into variations of those of Palais.