A Lax Pair Structure for the Half-Wave Maps Equation

Abstract

We consider the half-wave maps equation ∂t S = S |∇| S, where S= S(t,x) takes values on the two-dimensional unit sphere S2 and x ∈ R (real line case) or x ∈ T (periodic case). This an energy-critical Hamiltonian evolution equation recently introduced in LS,Zh, which formally arises as an effective evolution equation in the classical and continuum limit of Haldane-Shastry quantum spin chains. We prove that the half-wave maps equation admits a Lax pair and we discuss some analytic consequences of this finding. As a variant of our arguments, we also obtain a Lax pair for the half-wave maps equation with target H2 (hyperbolic plane).