In this paper,the solution existence for quasilinear hemivariational inequality was analyzed using the variational method and the nonsmooth critical point theory of the locally Lipschitz function.
我们的方法是变分法及局部Lipschitz函数的非光滑临界点理论。
This paper discusses the generalization of the deformation theorem and its application,and some new critical point theorems of locally Lipschitz functions are given based on some improved classical critical point theorems.
证明了一个形变定理,并由此得到局部Lipschitz函数的几个临界点定理,其结果改进了几个经典的临界点结论。
In the present paper,some minimax theorems of locally Lipschitz functions are given by the Ekeland variational principle and tow critical point theorems are improved.
文章由Ekeland变分原理得到局部Lipschitz函数的几个极大极小定理,并改进了已有的两个临界点定理。
This paper is devoted to the development of stabilized finite element methods by empolying local bubble functions for adveetive-diffusive models which has the form σu+a·(?)u-k△u =f.
本文针对形如σu+α·u-kΔu=f对流—扩散型的模型问题,发展耦合局部bubble-函数的有限元方法,我们就α=0和σ=0两种情形证明了方法的与“影响因素”σ和pedlet-数无关稳定性及全局最佳收敛阶。
