In this paper, we provide an application-oriented characterization of a class of distance functions monotonically related to the Euclidean distance in terms of some general properties of distance functions between real-valued vectors. Our analysis hinges upon two fundamental properties of distance functions that we call "value-sensitivity" and "order- sensitivity". We show how these two general properties, combined with natural monotonicity considerations, lead to characterization results that single out several versions of Euclidean distance from the wide class of separable distance functions. We then discuss and motivate our results in two different and apparently unrelated application areas-mobility measurement and spatial voting theory-and propose our characterization as a test for deciding whether Euclidean distance (or some suitable variant) should be used in your favourite application context.

What's so special about Euclidean distance? A characterization with applications to mobility and spatial voting / M. D'Agostino, V. Dardanoni. - In: SOCIAL CHOICE AND WELFARE. - ISSN 0176-1714. - 33:2(2009 Aug), pp. 211-233. [10.1007/s00355-008-0353-5]

What's so special about Euclidean distance? A characterization with applications to mobility and spatial voting

M. D'Agostino;
2009

Abstract

In this paper, we provide an application-oriented characterization of a class of distance functions monotonically related to the Euclidean distance in terms of some general properties of distance functions between real-valued vectors. Our analysis hinges upon two fundamental properties of distance functions that we call "value-sensitivity" and "order- sensitivity". We show how these two general properties, combined with natural monotonicity considerations, lead to characterization results that single out several versions of Euclidean distance from the wide class of separable distance functions. We then discuss and motivate our results in two different and apparently unrelated application areas-mobility measurement and spatial voting theory-and propose our characterization as a test for deciding whether Euclidean distance (or some suitable variant) should be used in your favourite application context.
social sciences (miscellaneous); economics and econometrics
Settore M-FIL/02 - Logica e Filosofia della Scienza
Settore SECS-P/01 - Economia Politica
Settore SECS-P/03 - Scienza delle Finanze
ago-2009
19-dic-2008
Article (author)
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2434/550453
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