Low regularity well-posedness of nonlocal dispersive perturbations of Burgers' equation

Abstract

We consider the Cauchy problem associated to a class of dispersive perturbations of Burgers' equations, which contains the low dispersion Benjamin-Ono equation, (also known as low dispersion fractional KdV equation), ∂tu-Dxα∂xu=∂x(u2) \, , and prove that it is locally well-posed in Hs( K), K= R or T, for s>sα, where equation* sα=cases 1-3α4 & for 23 α 1; 32(1-α) & for 13 α 23; 32-α1-α & for 0 < α 13 . cases equation* The uniqueness is unconditional in Hs( K) for s>\12,sα\. Moreover, we obtain a priori estimates for the solutions at the lower regularity threshold s>sα where equation* sα=cases 12- α 4 & for 23 α 1; 1-α & for 12 α 23; 32-α1-α & for 0 < α 12 . cases equation* As a consequence of these results and of the Hamiltonian structure of the equation, we deduce global well-posedness in Hs( K) for s>sα when α>23, and in the energy space Hα2( K) when α>45.