Global Well-Posedness Of A Non-Local Burgers Equation: The Periodic Case

Abstract

This paper is concerned with the study of a non-local Burgers equation for positive bounded periodic initial data. The equation reads ut - u |∇| u + |∇|(u2) = 0. We construct global classical solutions starting from smooth positive data, and global weak solutions starting from data in L∞. We show that any weak solution is instantaneously regularized into C∞. We also describe the long-time behavior of all solutions. Our methods follow several recent advances in the regularity theory of parabolic integro-differential equations.