报告题目:On the low-regularity ill-posedness of non-strictly hyperbolic systems
报告人:尹思露
报告时间:2026年4月21日,10:00 – 11:00
报告地点:正新楼209报告厅
校内联系人:段犇 [email protected]
报告摘要:In this talk, we investigate the ill-posedness of several non-strictly hyperbolic systems characterized by multiple propagation speeds, encompassing elastodynamic waves, the compressible ideal MHD system, and Euler equations. For scalar quasilinear wave equation, Smith-Tataru established local well-posedness in 
, where the regularity threshold is defined as 
for 
and 
for 
. Here, we construct explicit counterexamples to demonstrate the failure of local existence for low-regularity solutions to the aforementioned physical systems at the critical borderline regularity. Our proof is based on a coalition of a carefully designed algebraic approach with Christodoulou’s geometric approach. We give a detailed description of solution dynamics up to the earliest singular event, when a shock forms. This talk is based on joint works with Xinliang An (NUS) and Haoyang Chen (NKU).
报告人简介:尹思露,杭州师范大学副教授,2016年博士毕业于复旦大学,师从周忆教授。主要研究双曲型方程组解的适定性和奇性理论,相关研究成果发表于Memoirs of the AMS、Amer. J. Math.、Comm. Math. Phys.、SIAM J. Math. Anal.等杂志(含接受发表),荣获2025年浙江省数学会科研成果二等奖。
