A Self-dual Polar Factorization for Vector Fields

Abstract

We show that any non-degenerate vector field u in L∞(, N), where is a bounded domain in N, can be written as equation u(x)= ∇1 H(S(x), x) for a.e. x ∈ , equation where S is a measure preserving point transformation on such that S2=I a.e (an involution), and H: N × N is a globally Lipschitz anti-symmetric convex-concave Hamiltonian. Moreover, u is a monotone map if and only if S can be taken to be the identity, which suggests that our result is a self-dual version of Brenier's polar decomposition for the vector field u as u(x)=∇ φ (S(x)), where φ is convex and S is a measure preserving transformation. We also describe how our polar decomposition can be reformulated as a self-dual mass transport problem.