报告题目:Boundary value problems in plasma dynamics
报 告 人:Diego Alonso-Oran(Ramón y Cajal Researcher @ULL Universidad de La Laguna)
报告时间:2026年6月2日(星期二)13:30 – 15:00;2026年6月3日(星期三)9:00 – 10:30 和 13:30 – 15:00
报告地点:6776永利集团114(小报告厅)
校内联系人:廖娴 教授 联系方式:84708351-8510
Abstract: Steady configurations in plasma dynamics are often described by the magneto-hydrostatic equations, which couple the magnetic field, the current density, and the plasma pressure. A classical question is whether such equilibria can be reconstructed from partial boundary data prescribed on suitable inflow and outflow parts of the boundary. This leads to a delicate class of mixed elliptic-transport problems in which the geometry of magnetic field lines plays a central role.
In this mini-course, I will discuss recent analytical progress on this problem, moving from the two-dimensional theory to the genuinely three-dimensional setting. In two dimensions, I will explain how the boundary value problem can be reformulated as a nonlinear fixed-point problem combining transport of the current with a nonlocal reconstruction of the magnetic field. I will then discuss the three-dimensional extension, where the divergence-free character of the current and genuinely three-dimensional transport effects require new tools, including pseudo-differential operators of limited regularity. Time permitting I will also comment on some ongoing work for the steady MHD equations.
