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Article

An interval method for global nonlinear analysis

Lubomir V. KolevFaculty of Automatica, Technical University of Sofia, Sofia, Bulgaria
2000en
ABI

Abstract

In this paper, the problem of finding the set of all real solutions to a system of n nonlinear equations contained in a given n-dimensional box [the global nonlinear analysis (GNA) problem] is considered. A new iterative interval method for solving the GNA problem is suggested. It is based on the following techniques: (1) transformation of the original system into an augmented system of n'=n+m equations of n' variables by introducing m auxiliary variables, the augmented system being of the so-called semiseparable form; (2) enclosure of the nonlinear augmented system at each iteration by a specific linear interval system of size n'/spl times/n'; (3) elimination of the auxiliary variables; and (4) solution of the resulting reduced size n/spl times/n linear system, using the so-called constraint propagation approach. The method suggested shows a significant improvement over previous techniques for the numerical examples solved.

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