Canonical connection on contact manifolds

Abstract

We introduce a canonical affine connection on the contact manifold (Q,), which is associated to each contact triad (Q,λ,J) where λ is a contact form and J: is an endomorphism with J2 = -id compatible to dλ. We call it the contact triad connection of (Q,λ,J) and prove its existence and uniqueness. The connection is canonical in that the pull-back connection φ*∇ of a triad connection ∇ becomes the triad connection of the pull-back triad (Q, φ*λ, φ*J) for any diffeomorphism φ:Q Q satisfying φ*λ = λ (sometimes called a strict contact diffeomorphism). It also preserves both the triad metric g(λ,J) = dλ(·, J·) + λ λ and J regarded as an endomorphism on TQ = R\Xλ\ , and is characterized by its torsion properties and the requirement that the contact form λ be holomorphic in the CR-sense. In particular, the connection restricts to a Hermitian connection ∇π on the Hermitian vector bundle (,J,g) with g = dλ(·, J·)|, which we call the contact Hermitian connection of (,J,g). These connections greatly simplify tensorial calculations in the sequels oh-wang1, oh-wang2 performed in the authors' analytic study of the map w, called contact instantons, which satisfy the nonlinear elliptic system of equations ∂π w = 0, \, d(w*λ j) = 0 in the contact triad (Q,λ,J).