On a one-dimensional α-patch model with nonlocal drift and fractional dissipation

Abstract

We consider a one-dimensional nonlocal nonlinear equation of the form: ∂t u = (-α u)∂x u - βu where =(-∂xx) 12 is the fractional Laplacian and 0 is the viscosity coefficient. We consider primarily the regime 0<α<1 and 0 β 2 for which the model has nonlocal drift, fractional dissipation, and captures essential features of the 2D α-patch models. In the critical and subcritical range 1-α β 2, we prove global wellposedness for arbitrarily large initial data in Sobolev spaces. In the full supercritical range 0 β<1-α, we prove formation of singularities in finite time for a class of smooth initial data. Our proof is based on a novel nonlocal weighted inequality which can be of independent interest.