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[size=0.8]Volume 45 [size=0.8] [size=0.8](2021)
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Chapter 1 - Revisiting the connection between Fisher information and entropy's rate of change[size=0.8]A.R. Plastino, Angelo Plastino, F. Pennini
[size=0.8]Chapter 2 - Pythagoras theorem in information geometry and applications to generalized linear models[size=0.8]Shinto Eguchi
Pages 15-42
Chapter 3 - Rao distances and conformal mapping[size=0.8]Arni S.R. Srinivasa Rao, Steven G. Krantz
Pages 43-56
Chapter 4 - Cramer-Rao inequality for testing the suitability of divergent partition functions[size=0.8]Angelo Plastino, Mario Carlos Rocca, Diana Monteoliva
Pages 57-78
Chapter 5 - Information geometry and classical Cramér–Rao-type inequalities[size=0.8]Kumar Vijay Mishra, M. Ashok Kumar
Pages 79-114
Chapter 6 - Principle of minimum loss of Fisher information, arising from the Cramer-Rao inequality: Its role in evolution of bio-physical laws, complex systems and universes[size=0.8]B. Roy Frieden
Pages 117-148
Chapter 7 - Quantum metrology and quantum correlations[size=0.8]Diego G. Bussandri, Pedro W. Lamberti
Pages 149-160
Chapter 8 - Information, economics, and the Cramér-Rao bound[size=0.8]Raymond J. Hawkins, B. Roy Frieden
Pages 161-177
Chapter 9 - Zipf's law results from the scaling invariance of the Cramer–Rao inequality[size=0.8]Alberto Hernando, Angelo Plastino
Pages 179-183
Chapter 10 - λ-Deformed probability families with subtractive and divisive normalizations[size=0.8]Jun Zhang, Ting-Kam Leonard Wong
Pages 187-215
Chapter 11 - Some remarks on Fisher information, the Cramer–Rao inequality, and their applications to physics[size=0.8]H.G. Miller, Angelo Plastino, A.R. Plastino
Pages 217-228-
Handbook of Statistics Volume45.pdf
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