Uniqueness for the Homogeneous Landau-Coulomb Equation in L3/2
Abstract
We prove the uniqueness of H-solutions to the homogeneous Landau-Coulomb equation satisfying v k0 f ∈ C([0, T]; L3/2(R3)) and v -3/2 ∇v (( v k0 f)3/4) ∈ L2((0, T) × R3) for any k0 ≥ 5. In particular, this shows that the solutions constructed in~GGL25 are unique. The present work thus completes the global well-posedness theory in the critical space L3/2(R3). Our proof is part of a broader effort to use the M-operator technique developed in~AGS2025, AMSY2020 to establish the uniqueness of rough solutions to nonlinear kinetic equations. When applied to the space-homogeneous case, the M-operator can be taken simply as a Bessel potential operator.
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