| [1] |
L. T. Fernholz, von Mises calculus for statistical functionals,
vol. 19 of Lecture Notes in Statistics, Springer-Verlag, New York, 1983. [ bib ] |
| [2] |
P. Levy, L'addition des variable aleatoires defines sur une
circonference., Bull. Soc. Math. France, 67 (1939), pp. 1-41. [ bib ] |
| [3] |
B. Lindsay, Ray, S., S. Chen, K. Yang, and M. Markatou, Quadratic
distances on probabilities: multivariate construction using tuneable
diffusion kernels, tech. rep., Under Preparation, 2005. [ bib ] |
| [4] |
Z. J. Liu and C. R. Rao, Asymptotic distribution of statistics based
on quadratic entropy and bootstrapping, Journal of Statistical Planning and
Inference, 43 (1995), pp. 1-18. [ bib ] |
| [5] |
K. V. Mardia and P. E. Jupp, Directional statistics, Wiley Series
in Probability and Statistics, John Wiley & Sons Ltd., Chichester, 2000. [ bib ] |
| [6] |
D. Ormoneit and T. Hastie, Optimal kernel shapes for local linear
regression., in NIPS, 1999, pp. 540-546. [ bib ] |
| [7] |
C. R. Rao, Convexity properties of entropy functions and analysis of
diversity, in Inequalities in Statistics and Probability, 1984, pp. 68-77. [ bib ] |
| [8] |
C. R. Rao and T. K. Nayak, Cross entropy, dissimilarity measures,
and characterizations of quadratic entropy, IEEE Transactions on Information
Theory, 31 (1985), pp. 589-593. [ bib ] |
| [9] |
S. Ray, Distance-based Model-Selection with application to the
Analysis of Gene Expression Data, PhD thesis, Pennsylvania State University,
2003. [ bib ] |
| [10] |
S. Ray and B. G. Lindsay, On using quadratic risk to select models
in high dimensions, tech. rep., Under Preparation, 2005. [ bib ] |
| [11] |
R. J. Serfling, Approximation theorems of mathematical statistics,
John Wiley & Sons, 1980. [ bib ] |
| [12] |
G. R. Shorack and J. A. Wellner, Empirical processes with
applications to statistics, John Wiley & Sons, 1986. [ bib ] |
| [13] |
V. Tresp and A. Schwaighofer, Scalable kernel systems, in ICANN
'01: Proceedings of the International Conference on Artificial Neural
Networks, London, UK, 2001, Springer-Verlag, pp. 285-291. [ bib ] |
| [14] |
G. Wahba, Adaptive tuning, 4-D Var and representers in RKHS,
in State of the art in probability and statistics (Leiden, 1999), vol. 36 of
IMS Lecture Notes Monogr. Ser., Inst. Math. Statist., Beachwood, OH, 2001,
pp. 582-592. [ bib ] |
| [15] |
K. Yosida, Functional Analysis, Springer-Verlag, 1980. [ bib ] |
This file has been generated by bibtex2html 1.77