Abstract
The problem of solving a nonlinear system of equations subject to simple bounds is addressed and a new globally convergent method is developed and analyzed. The globalization process employs a trust-region strategy and possibly bends the trust-region solution by a new interior point modification of the projection onto the feasible set. The steps used are obtained by a combination of the chopped Cauchy step and the possibly modified trust-region solution. Thus, strictly feasible iterates are formed. The proposed method is shown to be globally and fast locally convergent. The practical viability of our approach is shown by a concrete implementation and numerical experience on well-known problems. The obtained results indicate that the method works well in practice.
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