In this paper, we study the variational problem associated to support vector regression in Banach function spaces. Using the Fenchet-Roclatfellar duality theory, we give an explicit formulation of the dual problem as well as of the related optimality conditions. Moreover, we provide a new computational framework for solving the problem which relies on a tensor-kernel representation. This analysis overcomes the typical difficulties connected to learning in Banach spaces. We finally present a large class of tensor-kernels to which our theory fully applies: power series tensor kernels. This type of kernels describes Banach spaces of analytic functions and includes generalizations of the exponential and polynomial kernels as well as, in the complex case, generalizations of the Szego and Bergman kernels.
Dettaglio pubblicazione
2020, ANALYSIS AND APPLICATIONS, Pages 149-183 (volume: 18)
Generalized support vector regression: Duality and tensor-kernel representation (01a Articolo in rivista)
Salzo S, Suykens Jak
Gruppo di ricerca: Continuous Optimization
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