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Global $L_p$ estimates for kinetic Kolmogorov-Fokker-Planck equations in nondivergence form

We study the degenerate Kolmogorov equations (also known as kinetic Fokker-Planck equations) in nondivergence form. The leading coefficients $a^{ij}$ are merely measurable in $t$ and satisfy the vanishing mean oscillation (VMO) condition in $x, v$ with respect to some quasi-metric. We also assume boundedness and uniform nondegeneracy of $a^{ij}$ with respect to $v$. We prove global a priori estimates in weighted mixed-norm Lebesgue spaces and solvability results. We also show an application of the main result to the Landau equation. Our proof does not rely on any kernel estimates.

preprint2022arXivOpen access
Hongjie DongTimur Yastrzhembskiy
math.AP
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Hongjie DongTimur Yastrzhembskiy

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