[1. Basseville, M. Divergence Measures for Statistical Data Processing. Publications Internes de l’IRISA, November 2010.]Search in Google Scholar
[2. Bregman, L. M. The Relaxation Method of Finding the Common Point of Convex Sets and Its Application to the Solution of Problems in Convex Programming. - USSR Computational Mathematics and Mathematical Physics, Vol. 7, 1967, No 3, 200-217.10.1016/0041-5553(67)90040-7]Search in Google Scholar
[3. Cover, T. M., A. J. Thomas. Elements of Information Theory. Wiley India Pvt. Ltd. New Delhi, 2009.]Search in Google Scholar
[4. Csiszar, I. Eine Informations Theoretische Ungleichung und ihre Anwendung auf den Beweis der Ergodizitat von marko_schen ketten. Magyar. - Tud. Akad. Mat. Kutato Int. Kozl, Vol. 8, 1963, 85-108.]Search in Google Scholar
[5. Csiszar, I. On Topological Properties of f-Divergences. - Studia Math. Hungarica, Vol. 2, 1967, 329-339.]Search in Google Scholar
[6. Dragomir, S. S. Some Inequalities for the Csiszar’s ∅-Divergence. Inequalities for the Csizar’s f-Divergence in Information Theory, 2000. http://rgmia.vu.edu.au/monographs/ciszar.htm]Search in Google Scholar
[7. Dragomir, S. S. Upper and Lower Bounds for Csiszar’s f-Divergence in Terms of the Kullback-Leibder Distance and Applications. Inequalities for the Csiszar’s f-divergence in Information Theory, 2000. http://rgmia.vu.edu.au/monographs/ciszar.htm]Search in Google Scholar
[8. Dragomir, S. S. Upper and Lower Bounds for Csiszar’s f-Divergence in Terms of the Hellinger Discrimination and Applications. Inequalities for the Csiszar’s f-Divergence in Information Theory, 2000. http://rgmia.vu.edu.au/monographs/csiszar.htm]Search in Google Scholar
[9. Dragomir, S. S. Other Inequalities for the Csiszar’s Divergence and Applications. Inequalities for the Csizar’s f-Divergence in Information Theory, 2000. http://rgmia.vu.edu.au/monographs/ciszar.htm]Search in Google Scholar
[10. Esteban, M. D., D. Morale s. A Summary on Entropy Statistic. - Kybernetika, Vol. 31, 1995, No 4, 337-346.]Search in Google Scholar
[11. Hellinger, E. Neue Berunduring der Theorie der Quadratischen Formen von Un endlichen Vieden Veran derliehen. - J. Reine Aug. Math., Vol. 136, 1909, 210-271.10.1515/crll.1909.136.210]Search in Google Scholar
[12. Kullback, S., R. A. Leible r. On Information and Sufficiency. - Ann. Math. Statist., Vol. 22, 1951, 79-86.10.1214/aoms/1177729694]Search in Google Scholar
[13.Maji, P. f-Information Measures for Efficient Selection of Discriminative Genes From Microarray Data. - IEEE Transactions on Biomedical Engineering, Vol. 56, 2009, No 4, 1063-1069.10.1109/TBME.2008.200450219272938]Search in Google Scholar
[14. Pearson, K. On the Criterion that a Given System of Deviations From the Probable in the Case of Correlated System of Variables is Such that it Can Be Reasonable Supposed to Have Arisen from Random Sampling. - Phil. Mag., Vol. 50, 1900, 157-172.10.1080/14786440009463897]Search in Google Scholar
[15. Renyi, A. On Measures of Entropy and Information. - In: Proc. of 4th Berkeley Symp. Math. Stat. Probab., Vol. 1, 1961, 547-561.]Search in Google Scholar
[16. Salicru, M. Measures of Information Associated with Csiszar’s Divergences. - Kybernetika, Vol. 50, 1994, No 5, 563-573.]Search in Google Scholar
[17. Shannon, C. E. The Mathematical Theory of Communications. - Bell Syst. Tech. Journal, Vol. 27, 1948, 423-467.10.1002/j.1538-7305.1948.tb01338.x]Search in Google Scholar
[18. Taneja, I. J. Generalized Information Maeasures and their Applications. - On-Line Book, 2001. http://www.mtm.ufsc.br/∼taneja/book/book.html]Search in Google Scholar
[19. Taneja, I. J. Generalized Arithmetic and Geometric Mean Divergence Measure and Their Statistical Aspects. Available at: arXiv:math/0501297v1[math.ST] 19 Jan 2005.]Search in Google Scholar
[20. Taneja, I. J. On Mean Divergence Measure. Available at: arXiv:math/0501298v2[math.ST] 13 June 2005.]Search in Google Scholar
[21.Wang,Y. Generelized Information Theory: A Review and Outlook. - Information Technology Journal, Vol. 10, 2011, No 3, 461-469.10.3923/itj.2011.461.469]Search in Google Scholar