We prove the global existence of segregated weak solutions of a one-dimensional degenerate cross-diffusion system with independent drifts, which is endowed with a Wasserstein gradient flow structure. We argue by a Lagrangian formulation written in terms of the (pseudo-) inverse for the cumulative mass function of the sum of the species, which we solve by a Minimising Movement Scheme in the setting of L² BV₋₎₂. This Lagrangian problem gives rise to a parabolic PDE similar to a p-Laplace equation, with typical range p (-, 1). We employ monotonicity methods à la Minty--Browder to obtain strong convergence and pass to the limit τ 0 in the time-step of the discrete scheme. Our contribution simultaneously treats all porous medium degeneracies, the log-entropy, and fast diffusions of index α (13, 1).
Santambrogio et al. (Mon,) studied this question.
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