A destination optimality in asymmetric distance Fermat-Weber problems (Q689258)
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scientific article; zbMATH DE number 445045
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | A destination optimality in asymmetric distance Fermat-Weber problems |
scientific article; zbMATH DE number 445045 |
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A destination optimality in asymmetric distance Fermat-Weber problems (English)
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20 December 1993
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This paper introduces skewed norms, i.e. norms perturbed by a linear function, which are useful for modelling asymmetric distance measures. The Fermat-Weber problem with mixed skewed norms is then considered. Using subdifferential calculus we derive exact conditions for a destination point to be optimal, thereby correcting and completing some recent work on asymmetric distance location problems. Finally the classical dominance theorem is generalized to Fermat-Weber problems with a fixed skewed norm.
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skewed norms
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asymmetric distance measures
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Fermat-Weber problem
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subdifferential calculus
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