From sample similarity to ensemble similarity: probabilistic distance measures in reproducing kernel Hilbert space
| Title | From sample similarity to ensemble similarity: probabilistic distance measures in reproducing kernel Hilbert space |
| Publication Type | Journal Articles |
| Year of Publication | 2006 |
| Authors | Zhou SK, Chellappa R |
| Journal | Pattern Analysis and Machine Intelligence, IEEE Transactions on |
| Volume | 28 |
| Issue | 6 |
| Pagination | 917 - 929 |
| Date Published | 2006/06// |
| ISBN Number | 0162-8828 |
| Keywords | Automated;Sample Size;Signal Processing, Bhattacharyya distance;Chernoff distance;Gram matrix;Kullback-Leibler divergence;data representations;ensemble similarity characterization;nonlinear mapping;probabilistic distance measures;reproducing kernel Hilbert space;sample similarity characterizatio, Computer-Assisted;, Statistical;Pattern Recognition |
| Abstract | This paper addresses the problem of characterizing ensemble similarity from sample similarity in a principled manner. Using a reproducing kernel as a characterization of sample similarity, we suggest a probabilistic distance measure in the reproducing kernel Hilbert space (RKHS) as the ensemble similarity. Assuming normality in the RKHS, we derive analytic expressions for probabilistic distance measures that are commonly used in many applications, such as Chernoff distance (or the Bhattacharyya distance as its special case), Kullback-Leibler divergence, etc. Since the reproducing kernel implicitly embeds a nonlinear mapping, our approach presents a new way to study these distances whose feasibility and efficiency is demonstrated using experiments with synthetic and real examples. Further, we extend the ensemble similarity to the reproducing kernel for ensemble and study the ensemble similarity for more general data representations. |
| DOI | 10.1109/TPAMI.2006.120 |