Vanishing of one dimensional L2-cohomologies of loop groups
Abstract
Let G be a simply connected compact Lie group. Let Le(G) be the based loop group with the base point e which is the identity element. Let e be the pinned Brownian motion measure on Le(G) and let α∈ L2(1TLe(G),e) D∞,p(1TLe(G),e) (1<p<2) be a closed 1-form on Le(G). Using results in rough path analysis, we prove that there exists a measurable function f on Le(G) such that df=α. Moreover we prove that =0 for the Hodge-Kodaira type operator acting on 1-forms on Le(G).
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