52

A Smoothing Method For Mathematical Programs With Equilibrium Constraints
– Francisco Facchinei, Houyuan Jiang, Liqun Qi
 1996

59

Convergence properties of a regularization scheme for mathematical programs with complementarity constraints
– S Scholtes

38

A globally convergent sequential quadratic programming algorithm for mathematical programs with linear complementarity constraints
– M Fukushima, Z Q Luo, J S Pang
 1998

97

Mathematical programs with complementarity constraints: Stationarity, optimality, and sensitivity
– H Scheel, S Scholtes

174

Mathematical Programs with Equilibrium Constraints
– Z Q Luo, J S Pang, D Ralph
 1996

27

The nonlinear bilevel programming problem: Formulations, regularity and optimality conditions
– Y Chen, M Florian
 1995

23

Convergence of a penalty method for mathematical programs with complementarity constraints
– X Hu, D Ralph
 2004

27

Convergence of a smoothing continuation method for mathematical programs with complementarity constraints
– M Fukushima, J S Pang
 1999

21

An implementable activeset algorithm for computing a Bstationary point of a mathematical program with linear complementarity constraints
– Masao Fukushima, Paul Tseng

54

Local convergence of SQP methods for Mathematical Programs with Equilibrium Constraints
– Roger Fletcher, Sven Leyffer, Danny Ralph, Stefan Scholtes
 2002

15

Sequential quadratic programming for mathematical programs with linear complementarity constraints
– D Ralph
 1996

34

Smooth SQP Methods for Mathematical Programs with Nonlinear Complementarity Constraints
– Houyuan Jiang, Daniel Ralph
 1997

17

Some Feasibility Issues in Mathematical Programs with Equilibrium Constraints
– Masao Fukushima, JongShi Pang

40

On The Accurate Identification Of Active Constraints
– Francisco Facchinei, Andreas Fischer, Christian Kanzow, F. Facchinei, A. Fischer, C. Kanzow
 1996

22

2001. How stringent is the linear independence assumption for mathematical programs with stationarity constraints
– S, M StÃ¶hr

105

Nonsmooth Approach to Optimization Problems with Equilibrium Constraints: Theory, Applications and Numerical Results
– J Outrata, M Kocvara, J Zowe
 1998

36

Exact penalization of mathematical programs with equilibrium constraints
– S Scholtes, M Stohr
 1999

6

A sequential smooth penalization approach to mathematical programs with complementarity constraints, Numerical Functional Analysis and Optimization
– X X Huang, X Q Yang, D L Zhu

15

Smoothing method for mathematical programs with symmetric cone complementarity constraints
– T Yan, M Fukushima
 2009
