참고문헌
- Abdel, N. H., Abd-Ellah, H. N., Moustata, H. M., Information geometry and statistical manifoeld, Chaos, Solitons and Fractal,(2003) 161-172
- Abdel, N. H., Mahmoud, M. A. W. and Abd-Ellah, H. N., Geometrical properties of Pareto distribution, Appl. Math. and Com. (2003) 321-339.
- Amari, S., Differential geometrical methods in statistics, Springer lecture notes in Statistics, (1985).
- Efron, B., Defining the curvature of a statistical problem, Annual. Statisitcs. vol 3. no. 6 (1975) 1109-1242. https://doi.org/10.1214/aos/1176343243
- Kass, R. E. and Vos. P. W., Geometrical foundations of asymptotic inference, John Wiley and Sons, Inc., (1997).
- Kass, R. E. and Vos. P. W., The geometry of saympeoeic inference, August 1989 vol 4, no. 3, Statistical Science.
- Kotz, S. and Nadarajah, S. Information matrices for some bivariate Pareto distribution, Advances on Income Inequality and, 2008
- Murray, M. K. and Rice, J. W., Differential geometry and Statistics, Chapman and Hall, New York, (1993).
- Rao. C. R. Information and the accuracy attainable in the estimation of statistical parameters, Bull. Calcutta Math. Soc. 37, (1945) 81-91.
- Samuel L. Katz. and Saralees Nadarajah., Information matrices for some bivariate Pareto distributions.
- William, W. S. Chen, On computing Gaussian curvature of some well known distributions, Amer. Statist. Soc. : section on Bayesian statist. sci., (1999) 129-134.