课程题目:k-QUASIMONOTONICITY AND UNIQUENESS FOR VARIATIONAL PROBLEMS IN NONTRIVIAL DOMAINS UNDER AFFINE BOUNDARY CONDITIONS (1-10)
报告人:Zhang Kewei 教授
所在单位:University of Nottingham (UK)
报告时间:2026年5月19日 10:00-12:30; 14:00-17:30 (lesson 1-6)
2026年5月20日 9:00-12:30 (lesson 7-10)
报告地点:正新楼105室
校内联系人:魏元鸿 [email protected]
课程摘要:
We establish a uniqueness result for smooth solutions of nonlinear variational problems with affine boundary conditions motivated from nonlinear elasticity in certain non-starshaped or topologically non-trivial k-starshaped domains under the strictly regular k-quasimonotonicity conditions for the integrands. Examples of non-trivial domains we consider include non-starshaped cylindrical domains which are 1-starshaped and some tubular neighbourhoods of k-dimensional domains in Rn with n > k ≥ 2. We present several examples of strictly regularly 1 and 2-quasimonotone functions defined in the matrix space M3×3 and k-quasimonotone functions defined in more general MN×n which are polyconvex but their gradients are not quasimonotone. These models can either be coercive or non-coercive. The notion of strict regular k-quasimonotonicity fills the gaps between quasiconvexity where k = 0 and uniqueness results hold on starshaped domains, and gradient quasimonotone mappings where k = n and uniqueness is independent of geometry or topology of domain.
报告人简介:
张克威,英国诺丁汉大学教授。研究兴趣包括变分法,偏微分方程组,弹性力学,材料微结构等。近年研究兴趣包括几何奇点提取,函数逼近,图像处理,光滑优化等。
