Generalized Positive Energy Representations of Groups of Jets
Abstract
Let V be a finite-dimensional real vector space and K a compact simple Lie group with Lie algebra k. Consider the Fr\'echet-Lie group G := J0∞(V; K) of ∞-jets at 0 ∈ V of smooth maps V K, with Lie algebra g = J0∞(V; k). Let P be a Lie group and write p := Lie(P). Let α be a smooth P-action on G. We study smooth projective unitary representations of G α P that satisfy a so-called generalized positive energy condition. In particular, this class captures representations that are in a suitable sense compatible with a KMS state on the von Neumann algebra generated by (G). We show that this condition imposes severe restrictions on the derived representation d of g p, leading in particular to sufficient conditions for |G to factor through J02(V; K), or even through K.
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