. The standard SVR formulation for real-valued function approximation on multidimensional spaces is based on the ε-insensitive loss function, where errors are considered not correlated. Due to this, local information in the feature space which can be useful to improve the prediction model is disregarded. In this paper we address this problem by defining a generalized quadratic loss where the co-occurrence of errors is weighted according to a kernel similarity measure in the feature space. We show that the resulting dual problem can be expressed as a hard margin SVR in a different feature space when the co-occurrence error matrix is invertible. We compare our approach against a standard SVR on two regression tasks. Experimental results seem to show an improvement in the performance.
Support Vector Regression with a Generalized Quadratic Loss
SPERDUTI, ALESSANDRO
2004
Abstract
. The standard SVR formulation for real-valued function approximation on multidimensional spaces is based on the ε-insensitive loss function, where errors are considered not correlated. Due to this, local information in the feature space which can be useful to improve the prediction model is disregarded. In this paper we address this problem by defining a generalized quadratic loss where the co-occurrence of errors is weighted according to a kernel similarity measure in the feature space. We show that the resulting dual problem can be expressed as a hard margin SVR in a different feature space when the co-occurrence error matrix is invertible. We compare our approach against a standard SVR on two regression tasks. Experimental results seem to show an improvement in the performance.Pubblicazioni consigliate
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