Propagation of chaos for some 2 dimensional fractional Keller Segel equations in diffusion dominated and fair competition cases

Abstract

In this work we deal with the local in time propagation of chaos without cut-off for some two dimensional fractional Keller Segel equations. More precisely the diffusion considered here is given by the fractional Laplacian operator -(-)a2 with a ∈ (1,2) and the singularity of the interaction is of order |x|1-α with α∈ ]1,a]. In the case α∈ (1,a) we give a complete propagation of chaos result, proving the -l.s.c property of the fractional Fisher information, already known for the classical Fisher information, using a result of Mischler and Hauray. In the fair competition case a=α, we only prove a convergence/consistency result in a sub-critical mass regime, similarly as the result obtained for the classical Keller-Segel equation.