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ISSN:2164-6376 (print)
ISSN:2164-6414 (online)
Discontinuity, Nonlinearity, and Complexity

Dimitry Volchenkov (editor), Dumitru Baleanu (editor)

Dimitry Volchenkov(editor)

Mathematics & Statistics, Texas Tech University, 1108 Memorial Circle, Lubbock, TX 79409, USA

Email: dr.volchenkov@gmail.com

Dumitru Baleanu (editor)

Cankaya University, Ankara, Turkey; Institute of Space Sciences, Magurele-Bucharest, Romania

Email: dumitru.baleanu@gmail.com

Statistical Mechanics of Fragmentation-advection Processes and Nonlinear Measurements Problem. II.

Discontinuity, Nonlinearity, and Complexity 1(2) (2012) 171--196 | DOI:10.5890/DNC.2012.05.002

Vladimir V. Uchaikin

Department of Theoretical Physics, Ulyanovsk State University, Ulyanovsk, Russia

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Abstract

The continuation of the article [1] contains statement of the adjoint transport theory, derivation and comparatively discussion backward and adjoint equations and their solutions, the theory of statistical fluctuations, the theory of perturbations and the method variational interpolations.

Acknowledgments

I am very indebted to my assistants Uchaikin M.V., Kozhemjakina E.V. and Shulezhko V.V. for preparing the manuscript, to Russian Foundation for Basic Research (grants 10-01-00608, 11-01-00747, 12-01-00660) and to Ministry of Education and Science of the Russian Federation (grant 2.1894.2011) for financial support.

References

  1. [1]  Uchaikin V.V. (2012), Statistical mechanics of fragmentation-advection processes and nonlinear measurements problem. I., Discontinuity, Nonlinearity and Complexity, 1, 1-26.
  2. [2]  Pal L. (1962), Statistical theory of chain reactions in nuclear reactors, Acta Physica Hungaricae, 14, 345-380.
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  15. [15]  Uchaikin V.V. 2012, Stochastic Models in Kinetic Theory of Cosmic Rays, Ulyanovsk, Ulyanovsk State University Press (in Russian).

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