Deduction of the Lorentzian shape from maximum-entropy principle

1. C. E. Shannon andW. Weaver:The Mathematical Theory of Communication, Univ. of Illinois Press. (Urbana, III., 1949).

   MATH  Google Scholar 

2. E. T. Jaynes:Phys. Rev.,106, 620 (1957).

   Article  MathSciNet  ADS  MATH  Google Scholar 

3. S. Kullbach:Information Theory and Statistics (New York, N. Y., 1959).

4. A. Katz:Principles of Statistical Mechanics (San Francisco, Calif., 1967).

5. A. Kossakowsky:Bull. Acad. Polon. Sc., Ser. Math. Astr. Phys.,16, 349 (1968).

   Google Scholar 

6. R. S. Ingarden andA. Kossakowsky: preprint no. 104, Institute of Physics,Copernicus University, Torun (Poland).

7. J. G. Powles andB. Carazza:Magnetic Resonance (London, 1970), p. 133.

8. J. G. Powles andB. Carazza:Journ. Phys. A,3, 335 (1970).

   Article  ADS  Google Scholar 

9. B. Carazza Journ. Phys. A,9, 1069 (1976).

   Article  ADS  MATH  Google Scholar 

10. R. Kubo:Fluctuations;Relaxations and Resonance in Magnetic Systems,D. Ter Haar editor (Edinburgh-London, 1962).

11. A. Abragam:The Principles of Nuclear Magnetism, Oxford at the Clarendon Press (London, 1961).

    Google Scholar 

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