Holomorphic line bundles on the loop space of the Riemann sphere

Abstract

The loop space LP1 of the Riemann sphere consisting of all Ck or Sobolev Wk,p maps from the circle S1 to P1 is an infinite dimensional complex manifold. The loop group LPGL(2,C) acts on LP1 . We prove that the group of LPGL(2,C) invariant holomorphic line bundles on LP1 is isomorphic to an infinite dimensional Lie group. Further, we prove that the space of holomorphic sections of these bundles is finite dimensional, and compute the dimension for a generic bundle.

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