http://chineseinput.net/에서 pinyin(병음)방식으로 중국어를 변환할 수 있습니다.
변환된 중국어를 복사하여 사용하시면 됩니다.
송영준 대한기계학회 1981 大韓機械學會誌 Vol.21 No.4
본고의 목적은 제한조건이 있는 최소화(constrained minimization) 문제를 해석하는데 있어서 효과적인 방법으로 받아 들여지고있는 Penalty method 에 대한 간단한 개념과 이러한 류의 문제를 해석하는데 이미 사용되어 온 Lagrange multiplier method 와의 연관성, 그리고 이의 유한요소법에의 적용시 고려사항 등에 대하여 간략하게 소개하는데 있다.
有限要素法 에 의한 線型彈性體 의 特定摩擦接觸問題 에 대한 數値解析
송영준 대한기계학회 1983 대한기계학회논문집 Vol.7 No.1
The purpose of the study is to find development of contact area, contact pressure and friction forces occurring at joints or connection areas inbetween structural members or mechanical parts. The problem has a pair of difficulties intrinsically; a constraint of displacement due to contact, and presence of work term by nonconservative friction force in the variational principle of the problem. Because of these difficulties, the variational principle remains in the form of inequality. It is resolved by penalty method and perturbation method making the inequality to an equality which is proper for computational purposes. A contact problem without friction is solved to find contact area and contact pressure, which are to be used as data for the analysis of the friction problem using perturbed variational principle. For numerical experiments, a Hertz problem, a rigid punch problem, and the latter one with friction effects are solved using $Q_2$-finite elements.