A new computational test is proposed for nonexistence of a solution to a system of nonlinear equations in a convex polyhedral region X. The basic idea proposed here is to formulate a linear programming problem whose feasible region contains all solutions in X. Therefore, if the feasible region is empty (which can be easily checked by Phase I of the simplex method), then the system of nonlinear equations has no solution in X. The linear programming problem is formulated by surrounding the component nonlinear functions by rectangles using interval extensions. This test is much more powerful than the conventional test if the system of nonlinear equations consists of many linear terms and a relatively small number of nonlinear terms. By introducing the proposed test to interval analysis, all solutions of nonlinear equations can be found very efficiently.
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