Some Results Related to MEMS-Type Equations

發(fā)布者:文明辦發(fā)布時(shí)間:2024-06-17瀏覽次數(shù):75


主講人:張艷艷 華東師范大學(xué)副教授


時(shí)間:2024年6月18日15:00


地點(diǎn):三號(hào)樓332室


舉辦單位:數(shù)理學(xué)院


主講人介紹:張艷艷,現(xiàn)任華東師范大學(xué)數(shù)學(xué)科學(xué)學(xué)院副教授。2005年在河南大學(xué)取得理學(xué)學(xué)士學(xué)位,2010年在復(fù)旦大學(xué)獲得博士學(xué)位,后在華東師范大學(xué)任職至今。主要研究領(lǐng)域是偏微分方程的理論研究及其應(yīng)用。曾榮獲2012年華東師范大學(xué)第九屆青年教師教學(xué)比賽二等獎(jiǎng)。


內(nèi)容介紹:We will discuss some results related to several classes of semilinear elliptic equations and evolution equations derived from fields such as Micro-Electro-Mechanical Systems (MEMS). In the first part of this talk, we will examine the behaviors of rupture solutions for a class of elliptic MEMS equations in . We will first analyze the classification of all possible singularities at the rupture point for rupture solutions . In particular, we show that sometimes admits only the isotropic singularity at , and otherwise may admit an anisotropic singularity at . Secondly, global solutions in (their existence and their behavior near as well as near ) are also studied. In the second part, we will discuss the asymptotic behaviors of global solutions of two types of MEMS equations (nonlocal second-order MEMS equations and fourth-order MEMS equations with Dirichlet boundary conditions), for which the comparison principle is not available. This is a joint work with Y.J. Guo, F. Zhou, Qing Li, Yufei Wei, and Wenlong Wu.