Splitting theorem for sheaves of holomorphic k-vectors on complex contact manifolds

Abstract

A complex contact structure γ is defined by a system of holomorphic local 1-forms satisfying the completely non-integrability condition. The contact structure induces a subbundle Ker\, γ of the tangent bundle and a line bundle L. In this paper, we prove that the sheaf of holomorphic k-vectors on a complex contact manifold splits into the sum of O(k Ker\, γ) and O(L k-1 Ker\, γ) as sheaves of C-module. The theorem induces the short exact sequence of cohomology of holomorphic k-vectors, and we obtain vanishing theorems for the cohomology of O(k γ).