Complete solution of a constrained tropical optimization problem with application to location analysis
classification
🧮 math.OC
cs.SYeess.SY
keywords
problemlocationanalysiscompleteconstraintsformmultidimensionaloptimization
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We present a multidimensional optimization problem that is formulated and solved in the tropical mathematics setting. The problem consists of minimizing a nonlinear objective function defined on vectors over an idempotent semifield by means of a conjugate transposition operator, subject to constraints in the form of linear vector inequalities. A complete direct solution to the problem under fairly general assumptions is given in a compact vector form suitable for both further analysis and practical implementation. We apply the result to solve a multidimensional minimax single facility location problem with Chebyshev distance and with inequality constraints imposed on the feasible location area.
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