Contents Online
Communications in Mathematical Sciences
Volume 19 (2021)
Number 6
The singularities for a periodic transport equation
Pages: 1751 – 1760
(Fast Communication)
DOI: https://dx.doi.org/10.4310/CMS.2021.v19.n6.a13
Authors
Abstract
In this paper, we consider a 1D periodic transport equation with nonlocal flux and fractional dissipation\[u_t - (Hu)_x u_x + \kappa \Lambda^\alpha u=0, \quad (t,x) \in R^{+} \times S ,\]where $\kappa \geq 0, 0 \lt \alpha \leq 1$ and $S =[-\pi,\pi]$. We first establish the local-in-time well-posedness for this transport equation in $H^3 (S)$. In the case of $\kappa=0$, we deduce that the solution, starting from the smooth and odd initial data, will develop into a singularity in finite time. By adding a weak dissipation term $\kappa \Lambda^\alpha u$, we also prove that the finite-time blowup would occur.
Keywords
singularity, nonlocal flux, fractional dissipation, odd initial data
2010 Mathematics Subject Classification
35A01, 35Q35, 76B03, 76B15
This project was supported by the National Natural Science Foundation of China (No. 11571057).
Received 11 January 2021
Accepted 1 May 2021
Published 2 August 2021