Title :
Out-of-Sample Extrapolation of Learned Manifolds
Author :
Chin, Tat-Jun ; Suter, David
Author_Institution :
Inst. for Infocomm Res., Singapore
Abstract :
We investigate the problem of extrapolating the embedding of a manifold learned from finite samples to novel out-of-sample data. We concentrate on the manifold learning method called Maximum Variance Unfolding (MVU) for which the extrapolation problem is still largely unsolved. Taking the perspective of MVU learning being equivalent to Kernel PCA, our problem reduces to extending a kernel matrix generated from an unknown kernel function to novel points. Leveraging on previous developments, we propose a novel solution which involves approximating the kernel eigenfunction using Gaussian basis functions. We also show how the width of the Gaussian can be tuned to achieve extrapolation. Experimental results which demonstrate the effectiveness of the proposed approach are also included.
Keywords :
Gaussian processes; approximation theory; computational geometry; eigenvalues and eigenfunctions; extrapolation; learning (artificial intelligence); matrix algebra; principal component analysis; Gaussian basis function; finite sample; kernel eigenfunction approximation; kernel function; kernel matrix; kernel principal component analysis; manifold learning method; maximum variance unfolding; out-of-sample data extrapolation; Maximum Variance Unfolding; manifold learning; out-of-sample extrapolation; Algorithms; Artificial Intelligence; Image Enhancement; Image Interpretation, Computer-Assisted; Pattern Recognition, Automated; Reproducibility of Results; Sensitivity and Specificity;
Journal_Title :
Pattern Analysis and Machine Intelligence, IEEE Transactions on
DOI :
10.1109/TPAMI.2007.70813
