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- Based on the reformulation as a system of nonsmooth equations, a generalized Newton method for solving this system is proposed. 在将原问题转化为一个非光滑方程组的基础上,提出了解此方程组的广义牛顿方法。
- In the last years more attention has been devoted to reformulating the nonlinear complementarity problem as a system of nonsmooth equations by using some NCP function. 近年来多采用NCP函数把非线性互补问题转化为非光滑方程组来求解。
- On the basis of this reformulation, it is proved that the system of nonsmooth equations is strongly semismooth so that the generalized Newton method for solving this system possesses locally quadratic convergence. 在此基础上,证明了非光滑方程是强半光滑的,因而解此方程的广义牛顿法具有局部二次收敛性。
- Based on a new smooth function, we reformulate nonlinear inequalities as a nonsmooth equation. 摘要对于非线性不等式组的求解,采用构造辅助函数将非线性不等式组转化成为一个非线性方程组。
- Nonsmooth Equations Models of Generalized Constrained Minimax Problem and Its Applications 广义约束极大极小问题的非光滑方程组模型及其应用
- STUDY ON NONSMOOTH EQUATIONS METHOD FOR THREE DIMENSIONAL CONTACT PROBLEMS WITH FRICTION 三维摩擦接触问题的非光滑方程组方法研究
- I could never do simultaneous equations. 我从来不会算联立方程式。
- nonsmooth equations 非光滑方程组
- unconstrained optimization,nonlinear programming, filter technique, nonmonotone technique,trust region method, nonsmooth equations, nonsmooth optimization,conic model, convergence. 无约束最优化; 非线性规划; 过滤集技术;非单调技术; 信赖域方法; 非光滑方程组; 非光滑优化; 锥模型; 收敛性.
- Dirac was unwilling to discard his equations. 狄刺克不愿意抛弃他的方程。
- The branch of algebra that deals with quadratic equations. 二次方程式论处理二次方程式的代数学的分支
- That leads to biquadratic equations for solution. 它们又引出待解的双二次方程。
- The absorption isotherms are equilibrium equations. 吸附等温线是平衡方程式。
- We now write two equilibrium equations for joint D. 现在列出节点D的两个平衡方程。
- This paper concerns nonsmooth semidefinite programming problems. 摘要首次考虑了非光滑半定规化问题。
- Some quadratic equations have no real roots. 某些二次方程没有实数根。
- In this paper,the existence of the global attractor for 2D-Navier-Stokes equations with distributed delays in nonsmooth domains is obtained. 研究了含分布时滞的非齐次2D-Navier-Stokes方程在非光滑区域上的全局吸引子存在性问题.
- The equations generated, however, are not linear. 但所形成的方程不是线性的。
- In the equations and logics that lead to reason. 不管是方程式或逻辑学都引导我们去思考。
- Connect the equations with the right items. 用直线连接相应的等量关系和方程。