1. Amari, S. (2005). Integration of stochastic evidences in population coding – theory of α-mixture. In Proceedings of the Second International Symposium on Information Geometry and its Applications, (pp. 15–21). University of Tokyo, 12–16 December 2005.

2. Amari, S., Nagaoka, H. (1982). Differential geometry of smooth families of probability distributions. Technical Report METR 82-7, Department of Mathematical Engineering and Instrumentation Physics, University of Tokyo.

3. Amari, S., Nagaoka, H. (2000). Methods of Information Geometry. Translations of Mathematical Monographs, Vol. 191. Providence, Rhode Island: American Mathematical Society and Oxford University Press.

4. Bernardo J.M. (1979). Expected information as expected utility. Annals of Statistics 7, 686–690

5. Bregman L.M. (1967). 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 7, 200–217