English

Linear transport equations for vector fields with subexponentially integrable divergence

Analysis of PDEs 2015-04-17 v2

Abstract

We face the well-posedness of linear transport Cauchy problems {ut+bu+cu=f(0,T)×Rnu(0,)=u0LRn\begin{cases}\dfrac{\partial u}{\partial t} + b\cdot\nabla u + c\,u = f&(0,T)\times{\mathbb R}^n\\u(0,\cdot)=u_0\in L^\infty&{\mathbb R}^n\end{cases} under borderline integrability assumptions on the divergence of the velocity field bb. For Wloc1,1W^{1,1}_{loc} vector fields bb satisfying b(x,t)1+xL1(0,T;L1)+L1(0,T;L)\frac{|b(x,t)|}{1+|x|}\in L^1(0,T; L^1)+L^1(0,T; L^\infty) and divbL1(0,T;L)+L1(0,T;Exp(LlogL)),\operatorname{div} b\in L^1(0,T;L^\infty) + L^1\left(0,T; \operatorname{Exp}\left(\frac{L}{\log L}\right)\right), we prove existence and uniqueness of weak solutions. Moreover, optimality is shown in the following way: for every γ>1\gamma>1, we construct an example of a bounded autonomous velocity field bb with divbExp(LlogγL),\operatorname{div} b\in \operatorname{Exp}\left(\frac{L}{\log^\gamma L}\right) , for which the associate Cauchy problem for the transport equation admits infinitely many solutions. Stability questions and further extensions to the BVBV setting are also addressed.

Keywords

Cite

@article{arxiv.1502.05303,
  title  = {Linear transport equations for vector fields with subexponentially integrable divergence},
  author = {Albert Clop and Renjin Jiang and Joan Mateu and Joan Orobitg},
  journal= {arXiv preprint arXiv:1502.05303},
  year   = {2015}
}
R2 v1 2026-06-22T08:32:31.453Z