On a 1D nonlocal transport equation with nonlocal velocity and subcritical or supercritical diffusion

Abstract

We study a 1D transport equation with nonlocal velocity with subcritical or supercritical dissipation. For all data in the weighted Sobolev space Hk(wλ,) L∞, with k=(0,3/2-α) and wλ, is a given family of Muckenhoupt weights. We prove a global existence result in the subcritical case α ∈ (1,2). We also prove a local existence theorem for large data in H2(wλ, ) L∞ in the supercritical case α ∈ (0,1). The proofs are based on the use of the weighted Littlewood-Paley theory, interpolation along with some new commutator estimates.