Publication 19-CNA-016
Nonlocal-interaction equation on graphs: gradient flow structure and continuum limit
Antonio Esposito
Department Mathematik
Friedrich-Alexander-Universität Erlangen-Nürnberg
Cauerstrasse 11, 91058 Erlangen, Germany
antonio.esposito@fau.de
Francesco S. Patacchini
Department of Mathematical Sciences
Carnegie Mellon University
Pittsburgh, PA 15203, USA
fpatacch@math.cmu.edu
Andre Schlichting
Institute of Applied Mathematics
University of Bonn
Endenicher Allee 60,
D-53115 Bonn, Germany
schlichting@iam.uni-bonn.de
Dejan Slepčev
Department of Mathematical Sciences
Carnegie Mellon University
Pittsburgh, PA 15213
slepcev@andrew.cmu.edu
Abstract: We consider dynamics driven by interaction energies on graphs. We introduce graph analogues of the continuum nonlocal-interaction equation and interpret them as gradient flows with respect to a graph Wasserstein distance. The particular Wasserstein distance we consider arises from the graph analogue of the Benamou-Brenier formulation where the graph continuity equation uses an upwind interpolation to define the density along the edges. While this approach has both theoretical and computational advantages, the resulting distance is only a quasi-metric. We investigate this quasi-metric both on graphs and on more general structures where the set of "vertices" is an arbitrary positive measure.
We call the resulting gradient flow of the nonlocal-interaction energy the nonlocal nonlocal-interaction equation (NL
2IE). We develop the existence theory for the solutions of the NL
2IE as curves of maximal slope with respect to the upwind Wasserstein quasi-metric. Furthermore, we show that the solutions of the NL
2IE on graphs converge as the empirical measures of the set of vertices converge weakly, which establishes a valuable discrete-to-continuum convergence result.
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