Propagation of chaos for the Keller-Segel equation over bounded domains

@article{Fetecau2018PropagationOC,
  title={Propagation of chaos for the Keller-Segel equation over bounded domains},
  author={R. Fetecau and Hui Huang and W. Sun},
  journal={Journal of Differential Equations},
  year={2018},
  volume={266},
  pages={2142-2174}
}
Abstract In this paper we rigorously justify the propagation of chaos for the parabolic–elliptic Keller–Segel equation over bounded convex domains. The boundary condition under consideration is the no-flux condition. As intermediate steps, we establish the well-posedness of the associated stochastic equation as well as the well-posedness of the Keller–Segel equation for bounded weak solutions. 
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