论文信息 - The relation between information theory and the differential geometry approach to statistics - 字舞流文

The relation between information theory and the differential geometry approach to statistics

L. L. Campbell | L. Campbell

[1] S. Amari. A foundation of information geometry , 1983 .

[2] C. R. Rao,et al. Entropy differential metric, distance and divergence measures in probability spaces: A unified approach , 1982 .

[3] S. Amari. Differential Geometry of Curved Exponential Families-Curvatures and Information Loss , 1982 .

[4] D. G. Watts,et al. Accounting for Intrinsic Nonlinearity in Nonlinear Regression Parameter Inference Regions , 1982 .

[5] R. Ingarden. Information geometry in functional spaces of classical and quantum finite statistical systems , 1981 .

[6] S. Shahshahani,et al. A New Mathematical Framework for the Study of Linkage and Selection , 1979 .

[7] B. Efron. Defining the Curvature of a Statistical Problem (with Applications to Second Order Efficiency) , 1975 .

[8] R. Gallager. Information Theory and Reliable Communication , 1968 .

[9] H. Theil. Economics and information theory , 1967 .

[10] L. L. Campbell,et al. A Coding Theorem and Rényi's Entropy , 1965, Inf. Control..

[11] S. Kullback. Information Theory and Statistics , 1959 .

[12] K. Matusita. Decision rule, based on the distance, for the classification problem , 1956 .

[13] K. Matusita. Decision Rules, Based on the Distance, for Problems of Fit, Two Samples, and Estimation , 1955 .

[14] A. Bhattacharyya. On a measure of divergence between two statistical populations defined by their probability distributions , 1943 .