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Convexity and duality properties of a quadratic intraregional location model
This paper has two main purposes. The first one is to analyse the convexity and duality properties of a quadratic intraregional location model that has been developed for long-term indicative planning in the Stockholm region. The second one is to review the results of Koopmans and Beckmann (1957) ab...
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| Published in: | Regional science and urban economics 1978-02, Vol.8 (1), p.5-19 |
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| Language: | English |
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| cites | cdi_FETCH-LOGICAL-c428t-203e19014d4f39aad29890f7473b635f3a71b03bd0ff37f897b6ed132c44f8293 |
| container_end_page | 19 |
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| container_title | Regional science and urban economics |
| container_volume | 8 |
| creator | Snickars, Folke |
| description | This paper has two main purposes. The first one is to analyse the convexity and duality properties of a quadratic intraregional location model that has been developed for long-term indicative planning in the Stockholm region. The second one is to review the results of Koopmans and Beckmann (1957) about the inadequacy of a linear price system in sustaining an optimal assignment of plants to locations when the costs of transporting intermediary commodities are taken into consideration. At the outset a model is formulated which is a transposition of a continuous Koopmans-Beckmann model into the urban scene. It is shown that this quadratic programming model is non-convex in all practical cases of interest, due to the simple fact that transportation costs increase with distance. A modification of the model is proposed in which the centralising transportation cost criterion is traded of against a decentralising so called congestion cost which penalizes over-exploitation of urban space. It is shown that the modified model tends to be convex. In the light of these results Kuhn- Tucker theory is used to derive a set of conditions that will ensure that the optimal solution is stable relative to all potential moves by individual decision-makers. This result forms the basis for the conclusion that the failure of the price system in the Koopmans-Beckmann model is rather due to properties of the quadratic criterion function than the integral restrictions on the variables. |
| doi_str_mv | 10.1016/0166-0462(78)90009-1 |
| format | article |
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The first one is to analyse the convexity and duality properties of a quadratic intraregional location model that has been developed for long-term indicative planning in the Stockholm region. The second one is to review the results of Koopmans and Beckmann (1957) about the inadequacy of a linear price system in sustaining an optimal assignment of plants to locations when the costs of transporting intermediary commodities are taken into consideration. At the outset a model is formulated which is a transposition of a continuous Koopmans-Beckmann model into the urban scene. It is shown that this quadratic programming model is non-convex in all practical cases of interest, due to the simple fact that transportation costs increase with distance. A modification of the model is proposed in which the centralising transportation cost criterion is traded of against a decentralising so called congestion cost which penalizes over-exploitation of urban space. 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| ispartof | Regional science and urban economics, 1978-02, Vol.8 (1), p.5-19 |
| issn | 0166-0462 1879-2308 |
| language | eng |
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| source | ScienceDirect: Economics, Econometrics & Finance Backfile |
| title | Convexity and duality properties of a quadratic intraregional location model |
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