Local well-posedness for incompressible neo-Hookean Elastic equations in almost critical Sobolev spaces

Abstract

Inspired by a pioneer work of Andersson-Kapitanski AK, we prove the local well-posedness of the Cauchy problem of incompressible neo-Hookean equations if the initial deformation and velocity belong to Hs+1(Rn) × Hs(Rn), s>n+12 (n=2,3). Moreover, if the initial data is small, then we can lower the regularity to s>n2, where n+22 and n2 is respectively a scaling-invariant exponent for deformation and velocity in Sobolev spaces. Our new observation relies on two folds: a reduction to a second-order wave-elliptic system of deformation and velocity; and a "wave-map type" null form intrinsic in this coupled system. In particular, the wave nature with "wave-map type" null form allows us to prove a bilinear estimate of Klainerman-Machedon type for nonlinear terms. So we can lower 12-order regularity in 3D and 34-order regularity in 2D for well-posedness compared with AK.