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Optimized packing unequal spheres into a multiconnected domain: mixed-integer non-linear programming approach

Yu. G. Stoyan, Georgiy Yaskov

2020International Journal of Computer Mathematics Computer Systems Theory10 citationsDOI

Abstract

The problem of packing unequal spheres into a multiconnected domain (container) is considered. Given a set of spheres, the objective is to maximize the packing factor. The problem is considered as a knapsack problem and modelled as a mixed-integer non-linear programming. Characteristics of the model are indicated. We propose a new solution method based on a combination of a branch-and-bound approach and the known local optimization method. The search procedure is represented by a tree which allows handling all possible subsets of spheres. We develop a set of truncation rules to reduce the number of variants under test. The local optimization algorithm proceeds from the assumption of spheres radii being variable. A number of numerical examples are given.

Topics & Concepts

Knapsack problemPacking problemsMathematical optimizationContainer (type theory)SPHERESMathematicsLinear programmingDomain (mathematical analysis)Integer programmingSet (abstract data type)Tree (set theory)Branch and boundTruncation (statistics)Set packingComputer scienceCombinatoricsMathematical analysisEngineeringMechanical engineeringProgramming languageAerospace engineeringStatisticsOptimization and Packing ProblemsAdvanced Manufacturing and Logistics OptimizationVehicle Routing Optimization Methods
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