Applies l²-decoupling to derive Strichartz and space-time bilinear estimates that imply unconditional uniqueness for the Boltzmann equation on R^d and T^d under Maxwellian/soft potentials with angular cutoff.
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A grand canonical mixture model generalizes the nonideal Rayleigh gas to infinite perturbed tagged particles, studies correlation function convergence, and proves a law of large numbers with improved adaptive time cutting.
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$l^{2}$-decoupling and the unconditional uniqueness for the Boltzmann equation
Applies l²-decoupling to derive Strichartz and space-time bilinear estimates that imply unconditional uniqueness for the Boltzmann equation on R^d and T^d under Maxwellian/soft potentials with angular cutoff.
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About a nonideal Rayleigh gas mixture model
A grand canonical mixture model generalizes the nonideal Rayleigh gas to infinite perturbed tagged particles, studies correlation function convergence, and proves a law of large numbers with improved adaptive time cutting.