Global well-posedness and long-time asymptotics of a general nonlinear non-local Burgers Equation
Abstract
This paper is concerned with the study of a nonlinear non-local equation that has a commutator structure. The equation reads ∂t u-F(u) (-)s/2 u+(-)s/2 (uF(u))=0, x∈ Td, with s ∈ (0, 1]. We are interested in solutions stemming from periodic positive bounded initial data. The given function F ∈ C∞ (R+) must satisfy F' > 0 a.e. on (0, +∞). For instance, all the functions F (u) = un with n ∈ N * are admissible non-linearities. We construct global classical solutions starting from smooth positive data, and global weak solutions starting from positive data in L∞. We show that any weak solution is instantaneously regularized into C∞. We also describe the long-time asymptotics of all solutions. Our methods follow several recent advances in the regularity theory of parabolic integro-differential equations.
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