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William Andrew Publishing

Information Geometry

Medium: Buch
ISBN: 978-0-323-85567-9
Verlag: William Andrew Publishing
Erscheinungstermin: 28.09.2021
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The subject of information geometry blends several areas of statistics, computer science, physics, and mathematics. The subject evolved from the groundbreaking article published by legendary statistician C.R. Rao in 1945. His works led to the creation of Cramer-Rao bounds, Rao distance, and Rao-Blackawellization. Fisher-Rao metrics and Rao distances play a very important role in geodesics, econometric analysis to modern-day business analytics. The chapters of the book are written by experts in the field who have been promoting the field of information geometry and its applications.

Produkteigenschaften

  • Artikelnummer: 9780323855679
  • Medium: Buch
  • ISBN: 978-0-323-85567-9
  • Verlag: William Andrew Publishing
  • Erscheinungstermin: 28.09.2021
  • Sprache(n): Englisch
  • Auflage: Erscheinungsjahr 2021
  • Produktform: Gebunden
  • Gewicht: 1000 g
  • Seiten: 248
  • Format (B x H): 152 x 229 mm
  • Ausgabetyp: Kein, Unbekannt

Themen

Autoren/Hrsg.

Weitere Mitwirkende

Plastino, Angelo

Angelo Plastino, PhD is Emeritus Professor of Physics, La Plata National University, Honorary Professor, University of Buenos Aires, Doctor Honoris Causa, University of Pretoria, Member of the Brazilian Academy of Sciences, Member of the Mexican Academy of Sciences, received the Scopus Elsevier Award to the most cited Argentine physicist in the period 1998-2008 and is the author of 680 refereed papers published in scientific journals (up to December 2020).

Section I Foundations of information geometry 1. Revisiting the connection between Fisher information and entropy's rate of change A.R. Plastino, A. Plastino, and F. Pennini 2. Pythagoras theorem in information geometry and applications to generalized linear models Shinto Eguchi 3. Rao distances and conformal mapping Arni S.R. Srinivasa Rao and Steven G. Krantz 4. Cramer-Rao inequality for testing the suitability of divergent partition functions Angelo Plastino, Mario Carlos Rocca, and Diana Monteoliva 5. Information geometry and classical CramKumar Vijay Mishra and M. Ashok Kumar Section II Theoretical applications and physics 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 B. Roy Frieden 7. Quantum metrology and quantum correlations Diego G. Bussandri and Pedro W. Lamberti 8. Information, economics, and the Cramer-Rao bound Raymond J. Hawkins and B. Roy Frieden 9. Zipf's law results from the scaling invariance of the Cramer-Rao inequality Alberto Hernando and Angelo Plastino Section III Advanced statistical theory 10. ?-Deformed probability families with subtractive and divisive normalizations Jun Zhang and Ting-Kam Leonard Wong 11. Some remarks on Fisher information, the Cramer-Rao inequality, and their applications to physics H.G. Miller, A. Plastino, and A.R. Plastino