Title :
Generalization Performance of Radial Basis Function Networks
Author :
Yunwen Lei ; Lixin Ding ; Wensheng Zhang
Author_Institution :
Sch. of Comput., Wuhan Univ., Wuhan, China
Abstract :
This paper studies the generalization performance of radial basis function (RBF) networks using local Rademacher complexities. We propose a general result on controlling local Rademacher complexities with the L1 -metric capacity. We then apply this result to estimate the RBF networks´ complexities, based on which a novel estimation error bound is obtained. An effective approximation error bound is also derived by carefully investigating the Hölder continuity of the lp loss function´s derivative. Furthermore, it is demonstrated that the RBF network minimizing an appropriately constructed structural risk admits a significantly better learning rate when compared with the existing results. An empirical study is also performed to justify the application of our structural risk in model selection.
Keywords :
approximation theory; generalisation (artificial intelligence); radial basis function networks; Hölder continuity; L1 -metric capacity; RBF network complexity estimation; RBF networks; approximation error bound; estimation error bound; generalization performance; lp loss function; local Rademacher complexities; model selection; radial basis function networks; structural risk; Approximation error; Complexity theory; Estimation error; Kernel; Radial basis function networks; Learning theory; local Rademacher complexity; radial basis function (RBF) networks; structural risk minimization (SRM); structural risk minimization (SRM).;
Journal_Title :
Neural Networks and Learning Systems, IEEE Transactions on
DOI :
10.1109/TNNLS.2014.2320280
