The Oka principle for holomorphic Legendrian curves in C2n+1
Abstract
Let M be a connected open Riemann surface. We prove that the space L(M, C2n+1) of all holomorphic Legendrian immersions of M into C2n+1, n≥ 1, endowed with the standard holomorphic contact structure, is weakly homotopy equivalent to the space C(M, S4n-1) of continuous maps from M to the sphere S4n-1. If M has finite topological type, then these spaces are homotopy equivalent. We determine the homotopy groups of L(M, C2n+1) in terms of the homotopy groups of S4n-1. It follows that L(M, C2n+1) is (4n-3)-connected.
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