Holomorphic line bundles on the loop space of the Riemann sphere (Q1880401)

Let \(M\) be a finite dimensional complex manifold. Its loop space \(LM\) consisting of all \(C^ k\) or Sobolev \(W^{k,p}\) maps \(S^ 1 \to M\) is an infinite dimensional complex manifold. The author studies holomorphic line bundles on the loop space \(L\mathbb P_ 1\) of the Riemann sphere. The loop group \(LPGL\) acts on \(L\mathbb P_ 1\). It is proven that the group of \(LPGL\)-invariant holomorphic line bundles on \(L\mathbb P_ 1\) is isomorphic to an infinite dimensional Lie group, and that the space of holomorphic sections of any such line bundle is finite dimensional. Also, the dimension for a generic bundle is computed.