English

The aggregation-diffusion equation with energy critical exponent

Analysis of PDEs 2023-02-21 v1

Abstract

We consider a Keller-Segel model with non-linear porous medium type diffusion and nonlocal attractive power law interaction, focusing on potentials that are less singular than Newtonian interaction. Here, the nonlinear diffusion is chosen to be m=2dd+2sm=\frac{2d}{d+2s} in such a way that the associated free energy is conformal invariant and there is a family of stationary solutions U(x)=c(λλ2+xx02)d+2s2U(x)=c\left(\frac{\lambda}{\lambda^2+|x-x_0|^2}\right)^{\frac{d+2s}{2}} for any constant cc and some λ>0,x0Rd.\lambda>0, x_0 \in \R^d. We analyze under which conditions on the initial data the regime that attractive forces are stronger than diffusion occurs and classify the global existence and finite time blow-up of dynamical solutions by virtue of stationary solutions. Precisely, solutions exist globally in time if the LmL^m norm of the initial data u0Lm(Rd)\|u_0\|_{L^m(\R^d)} is less than the LmL^m norm of stationary solutions U(x)Lm(Rd)\|U(x)\|_{L^m(\R^d)}. Whereas there are blowing-up solutions for u0Lm(Rd)>U(x)Lm(Rd)\|u_0\|_{L^m(\R^d)}>\|U(x)\|_{L^m(\R^d)}.

Keywords

Cite

@article{arxiv.2302.09490,
  title  = {The aggregation-diffusion equation with energy critical exponent},
  author = {Shen Bian},
  journal= {arXiv preprint arXiv:2302.09490},
  year   = {2023}
}
R2 v1 2026-06-28T08:43:42.550Z