Abstract :
Let W(G) denote the path group of an arbitrary complex connected Lie group. The existence of a heat
kernel measure νt on W(G) has been shown in [M. Cecil, B.K. Driver, Heat kernel measure on loop
and path groups, preprint, http://www.math.uconn.edu/~cecil/papers/p2.pdf; Infin. Dimens. Anal. Quantum
Probab. Relat. Top., submitted for publication]. The present work establishes an isometric map, the Taylor
map, from the space of L2(νt )-holomorphic functions on W(G) to a subspace of the dual of the universal
enveloping algebra of Lie(H(G)), where H(G) is the Lie subgroup of finite energy paths. This map is
shown to be surjective in the case where G is a simply connected graded Lie group.
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