Daniela Tonon scite author profile

Abstract. We analyze a (possibly degenerate) second order mean field games system of partial differential equations. The distinguishing features of the model considered are (1) that it is not uniformly parabolic, including the first order case as a possibility, and (2) the coupling is a local operator on the density. As a result we look for weak, not smooth, solutions. Our main result is the existence and uniqueness of suitably defined weak solutions, which are characterized as minimizers of two optimal control problems. We also show that such solutions are stable with respect to the data, so that in particular the degenerate case can be approximated by a uniformly parabolic (viscous) perturbation.

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Regularity of the Boltzmann equation in convex domains

Guo

et al. 2016

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Abstract.A basic question about regularity of Boltzmann solutions in the presence of physical boundary conditions has been open due to characteristic nature of the boundary as well as the non-local mixing of the collision operator. Consider the Boltzmann equation in a strictly convex domain with the specular, bounce-back and diffuse boundary condition. With the aid of a distance function toward the grazing set, we construct weighted classical C 1 solutions away from the grazing set for all boundary conditions. For the diffuse boundary condition, we construct W 1,p solutions for 1 < p < 2 and weighted W 1,p solutions for 2 ≤ p ≤ ∞ as well. On the other hand, we show second derivatives do not exist up to the boundary in general by constructing counterexamples for all boundary conditions.

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Daniela Tonon

Second order mean field games with degenerate diffusion and local coupling

Regularity of the Boltzmann equation in convex domains

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