Title :
Approximate learning curves for Gaussian processes
Author_Institution :
Dept. of Math., King´´s Coll., London, UK
Abstract :
I consider the problem of calculating learning curves (i.e., average generalization performance) of Gaussian processes used for regression. A simple expression for the generalization error in terms of the eigenvalue decomposition of the covariance function is derived, and used as the starting point for several approximation schemes. I identify where these become exact, and compare with existing bounds on learning curves; the new approximations, which can be used for any input space dimension, generally get substantially closer to the truth
Keywords :
Gaussian processes; Gaussian processes; approximate learning curves; approximation schemes; average generalization performance; covariance function; eigenvalue decomposition; generalization error; neural nets; regression;
Conference_Titel :
Artificial Neural Networks, 1999. ICANN 99. Ninth International Conference on (Conf. Publ. No. 470)
Conference_Location :
Edinburgh
Print_ISBN :
0-85296-721-7
DOI :
10.1049/cp:19991148
