PSwarm: a hybrid solver for linearly constrained global derivative-free optimization

PSwarm was developed originally for the global optimization of functions without derivatives and where the variables are within upper and lower bounds. The underlying algorithm used is a pattern search method, or more specifically, a coordinate search method, which guarantees convergence to stationary points from arbitrary starting points. In the (optional) search step of coordinate search, the algorithm incorporates a particle swarm scheme for dissemination of points in the feasible region, equipping the overall method with the capability of finding a global minimizer. Our extensive numerical experiments showed that the resulting algorithm is highly competitive with other global optimization methods based only on function values. PSwarm is extended in this paper to handle general linear constraints. The poll step now incorporates positive generators for the tangent cone of the approximated active constraints, including a provision for the degenerate case. The search step has also been adapted accordingly. In particular, the initial population for particle swarm used in the search step is computed by first inscribing an ellipsoid of maximum volume to the feasible set. We have again compared PSwarm with other solvers (including some designed for global optimization) and the results confirm its competitiveness in terms of efficiency and robustness.

[1]  Shao-Jian Qu,et al.  A deterministic global optimization algorithm , 2007, Appl. Math. Comput..

[2]  Riccardo Poli,et al.  Particle swarm optimization , 1995, Swarm Intelligence.

[3]  Russell C. Eberhart,et al.  A new optimizer using particle swarm theory , 1995, MHS'95. Proceedings of the Sixth International Symposium on Micro Machine and Human Science.

[4]  Stefan M. Wild,et al.  Benchmarking Derivative-Free Optimization Algorithms , 2009, SIAM J. Optim..

[5]  P. Pardalos,et al.  Handbook of global optimization , 1995 .

[6]  Jorge J. Moré,et al.  Digital Object Identifier (DOI) 10.1007/s101070100263 , 2001 .

[7]  Ed Anderson,et al.  LAPACK Users' Guide , 1995 .

[8]  Andries Petrus Engelbrecht,et al.  A study of particle swarm optimization particle trajectories , 2006, Inf. Sci..

[9]  P. Rubin Generating random points in a polytope , 1984 .

[10]  Tamara G. Kolda,et al.  Stationarity Results for Generating Set Search for Linearly Constrained Optimization , 2006, SIAM J. Optim..

[11]  A. I. F. Vaz,et al.  Modeling nearby FGK Population I stars: A new form of estimating stellar parameters using an optimization approach , 2011 .

[12]  Albert A. Groenwold,et al.  A Study of Global Optimization Using Particle Swarms , 2005, J. Glob. Optim..

[13]  Xin Yao,et al.  Stochastic ranking for constrained evolutionary optimization , 2000, IEEE Trans. Evol. Comput..

[14]  Donald R. Jones,et al.  Direct Global Optimization Algorithm , 2009, Encyclopedia of Optimization.

[15]  Robert Michael Lewis,et al.  Pattern Search Methods for Linearly Constrained Minimization , 1999, SIAM J. Optim..

[16]  Lester Ingber,et al.  Adaptive simulated annealing (ASA): Lessons learned , 2000, ArXiv.

[17]  John E. Dennis,et al.  Pattern search in the presence of degenerate linear constraints , 2008, Optim. Methods Softw..

[18]  Yin Zhang,et al.  On Numerical Solution of the Maximum Volume Ellipsoid Problem , 2003, SIAM J. Optim..

[19]  Aimo A. Törn,et al.  Global Optimization , 1999, Science.

[20]  János D. Pintér,et al.  Global Optimization: Software, Test Problems, and Applications , 2002 .

[21]  Luís N. Vicente,et al.  A particle swarm pattern search method for bound constrained global optimization , 2007, J. Glob. Optim..

[22]  Zbigniew Michalewicz,et al.  Genetic Algorithms + Data Structures = Evolution Programs , 1996, Springer Berlin Heidelberg.

[23]  Nicholas I. M. Gould,et al.  CUTEr and SifDec: A constrained and unconstrained testing environment, revisited , 2003, TOMS.

[24]  Brian W. Kernighan,et al.  AMPL: A Modeling Language for Mathematical Programming , 1993 .

[25]  Tamara G. Kolda,et al.  Optimization by Direct Search: New Perspectives on Some Classical and Modern Methods , 2003, SIAM Rev..

[26]  Paul Tseng,et al.  Objective-derivative-free methods for constrained optimization , 2002, Math. Program..

[27]  I M GouldNicholas,et al.  CUTEr and SifDec , 2003 .

[28]  Berç Rustem,et al.  Linearly Constrained Global Optimization and Stochastic Differential Equations , 2006, J. Glob. Optim..

[29]  C. D. Perttunen,et al.  Lipschitzian optimization without the Lipschitz constant , 1993 .

[30]  J. Demmel,et al.  Sun Microsystems , 1996 .

[31]  John L. Nazareth,et al.  Introduction to derivative-free optimization , 2010, Math. Comput..

[32]  Zbigniew Michalewicz,et al.  Evolutionary Computation Techniques for Nonlinear Programming Problems , 1994 .