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He is mainly interested in the mathematical analysis of nonlinear partial differential equations (PDEs), with a focus on the interplay with applications: the collaboration with experts during the development of the model, the analysis of solutions' behavior with respect to questions which naturally stem from the phenomenon described by the model, and the feed-back of the results. In particular, he has been working on (systems of) degenerate parabolic PDEs  -arising from fluid dynamics, material science, and image processing- in which presence of multiple scales and/or the evolution of interfaces and singularities play an essential role: "thin-film" type equations, Hele-Shaw flows, Cahn-Hilliard type equations, the Kuramoto-Sivashinsky equation, gradient plasticity theories, 1-harmonic flows on manifolds, flux-saturated diffusion equations, and forward-backward parabolic equations. In these frameworks, his contributions mainly concern well-posedness (existence, uniqueness, non-uniqueness phenomena, regularity of solutions) and qualitative behaviour of solutions (asymptotics, scaling laws, evolution of interfaces and singularities).