Title :
Applying Infeasible Interior Point Method to SQP for Constrained Nonlinear Programming
Author :
Bashir, Hassan A. ; Liang, Ximing ; Li, Shanchun
Author_Institution :
Sch. of Inf. Sci. & Eng., Central South Univ., Changsha
Abstract :
Active set (AS) method suffers deteriorating performance and premature convergence when it is faced with a nonlinear programming problem (NLP) consisting of several inequality constraints. Thus, we propose an SQP/IPM algorithm that uses infeasible interior point method (IIPM) for solving quadratic programming (QP) subproblems. In this approach inequality constraints can be solved directly, alleviating the burden for choosing a feasible starting point necessary for efficient convergence to optimal active set. At every iteration k, we evaluate step length adaptively via a simple line search or a quadratic search algorithm depending on the QP subproblem. Benchmark NLPs are used for performance assessment and our SQP/IPM algorithm proves to be efficient and promising.
Keywords :
iterative methods; quadratic programming; search problems; constrained benchmark nonlinear programming; inequality constraint; infeasible interior point method; iterative method; optimal active set method; premature convergence; quadratic search algorithm; sequential quadratic programming; simple line search; Algorithm design and analysis; Computer science; Convergence; History; Information science; Iterative algorithms; Lagrangian functions; Quadratic programming; Software algorithms; Software engineering; active set strategy; infeasible interior point; line search; quadratic search; sequential quadratic programming;
Conference_Titel :
Computer Science and Software Engineering, 2008 International Conference on
Conference_Location :
Wuhan, Hubei
Print_ISBN :
978-0-7695-3336-0
DOI :
10.1109/CSSE.2008.554
