Departamento de Economía y Empresa - Universitat Pompeu Fabra

Título:: A data-dependent skeleton estimate and a scale-sensitive dimension for classification
Autores:: Marta Horvath y Gábor Lugosi
Fecha:: Diciembre 1996
Resumen:: The classical binary classification problem is investigated when it is known in advance that the posterior probability function (or regression function) belongs to some class of functions. We introduce and analyze a method which effectively exploits this knowledge. The method is based on minimizing the empirical risk over a carefully selected ``skeleton'' of the class of regression functions. The skeleton is a covering of the class based on a data--dependent metric, especially fitted for classification. A new scale--sensitive dimension is introduced which is more useful for the studied classification problem than other, previously defined, dimension measures. This fact is demonstrated by performance bounds for the skeleton estimate in terms of the new dimension.
Palabras clave:: Estimation, hypothesis testing, statistical decision theory: operations research
Códigos JEL:: C12, C13, C44
Área de investigación:: Estadística, Econometría y Métodos Cuantitativos
Publicado en:: Discrete Applied Mathematics, 86, (1998), pp. 37-61

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