The nonlocal-interaction equation near attracting manifolds
Abstract
We study the approximation of the nonlocal-interaction equation restricted to a compact manifold M embedded in Rd, and more generally compact sets with positive reach (i.e. prox-regular sets). We show that the equation on M can be approximated by the classical nonlocal-interaction equation on Rd by adding an external potential which strongly attracts to M. The proof relies on the Sandier--Serfaty approach to the -convergence of gradient flows. As a by-product, we recover well-posedness for the nonlocal-interaction equation on M. Uniqueness, on the other hand, is established using a stability argument. We also provide an another approximation to the interaction equation on M, based on iterating approximately solving an interaction equation on Rd and projecting to M. We show convergence of this scheme, together with an estimate on the rate of convergence. Finally, we conduct numerical experiments, for both the attractive-potential-based and the projection-based approaches, that highlight the effects of the geometry on the dynamics.
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