论文信息 - Applications of interval arithmetic in non-smooth global optimization

Applications of interval arithmetic in non-smooth global optimization

In this paper, an expansion scheme for general functions is presented, which can be used to achieve better enclosure of function ranges. In the context of interval branch-and-bound methods for non-smooth global optimization, a pruning technique is given via the expansion. An interval pruning test is established. This pruning test offers the possibility to cut away a large part of the currently investigated box by the optimization algorithm, which can be utilized as an accelerating device similar to the monotonicity test frequently used in interval methods for smooth problems. Numerical computation shows that the proposed method is reliable and can find all solutions of global optimization problem.

Peiping Shen | Kecun Zhang | Yanjun Wang

[1] Jean-Jacques Strodiot,et al. Computing a global optimal solution to a design centering problem , 1992, Math. Program..

[2] Reiner Horst,et al. Introduction to Global Optimization (Nonconvex Optimization and Its Applications) , 2002 .

[3] Shen Zuhe,et al. On interval enclosures using slope arithmetic , 1990 .

[4] A. Neumaier,et al. Interval Slopes for Rational Functions and Associated Centered Forms , 1985 .

[5] B. Jaumard,et al. Cord-slope form of Taylor's expansion in univariate global optimization , 1991 .

[6] Jon G. Rokne,et al. New computer methods for global optimization , 1988 .

[7] Eldon Hansen,et al. Global optimization using interval analysis , 1992, Pure and applied mathematics.

[8] R. Horst,et al. Global Optimization: Deterministic Approaches , 1992 .

[9] Lubomir V. Kolev. Use of Interval Slopes for the Irrational Part of Factorable Functions , 1997, Reliab. Comput..

[10] Panos M. Pardalos,et al. Introduction to Global Optimization , 2000, Introduction to Global Optimization.

[11] M. A. Wolfe,et al. An interval algorithm for nondifferentiable global optimization , 1994 .