On the kinetic p-Laplace equation with nonlocal diffusion
Abstract
We study two nonlocal versions of the kinetic p-Laplace equation: a Gagliardo-type model defined through differences and a Bessel-type model defined via Fourier multiplication. Using critical kinetic trajectories, we derive representation formulas adapted to the kinetic transport-diffusion geometry and establish homogeneous and scale-invariant kinetic Gagliardo-Nirenberg inequalities for nonlocal diffusion, which yield gain-of-integrability estimates for weak solutions to the kinetic p-Laplace equations with nonlocal diffusion.
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