Convergence of a finite-volume scheme for aggregation-diffusion equations with saturation

Abstract

In [Bailo, Carrillo, Hu. SIAM J. Appl. Math. 2023] the authors introduce a finite-volume method for aggregation-diffusion equations with non-linear mobility. In this paper we prove convergence of this method using an Aubin--Simons compactness theorem due to Gallou\"et and Latch\'e. We use suitable discrete H1 and W-1,1 discrete norms. We provide two convergence results. A first result shows convergence with general entropies (U) (including singular and degenerate) if the initial datum does not have free boundaries, the mobility is Lipschitz, and the confinement (V) and aggregation (K) potentials are W2,∞0. A second result shows convergence when the initial datum has free boundaries, mobility is just continuous, and V and K are W1,∞, but under the assumption that the entropy U is C1 and strictly convex.