Control of multiscale systems wish constraints 1. Basic principles of concept of evolution of systems with varying constraints

S. Adamenko, V. Bolotov, V. Novikov

Анотація


Physical fundamentals of the self-organizing theory for the system with varying constraints are considered. A variation principle, specifically the principle of dynamic harmonization as a generalization of the Gauss-Hertz principle for the systems with varying internal structure is formulated. In compliance with this principle the system evolves through dynamics of the processes leading to harmonization of the internal multiscale structure
of the system and its connections with external actions as a result of minimizing the dynamic harmonization function. Main principles of the ‘shell’ model of self-organization under the action of the dominating entropic disturbance are formulated.

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S. V. Adamenko, The conception of the artificially initiated collapse of matter and main results of the first stage of its experimental realization. Preprint, Kyiv, Akademperiodika, pp. 36, (2004).

S. V. Adamenko, Self-organizing nucleosynthesis in superdense plasma, p 19-53 In: S.V. Adamenko, F. Selleri, A. van der Merwe. Controlled Nucleosynthesis. Breakthroughs in Experiment and Theory. Springer, Berlin, 2007

I. Prigogine, Introduction to thermodynamics of irreversible processes, Springfield, Illinois, 1955

L. B. Okun, The notion of mass, UFN, vol.158, issue. 3, 1989, pp. 511–530.

Smirnov B. M, Macroscopic fractal structures, UFN, vol 161, No 6, pp. 171–200; B.M. Smirnov, Physics of fractal clusters, Nauka Paulishers, M., 1991

B. Mandelbrot, The fractal geometry of Nature, Freeman, New York, 1982

L. P. Kedrin, Statistical physics of plasma, Atomizdat Publishers, 1974

Ya. Frenkel, Kinematic theory of liquids. M.-L.: Publishers of the USSR Academy of Sciences, 1945

E. Verlinde, On the origin of gravity and the laws of Newton, JHEP04 (2011) 029

A. A. Vlasov, Theory of many particles, Nauka Publishers, 1950

A. A. Vlasov, Statistical distribution functions, Nauka Publishers, 1966

A. A. Vlasov, Non-local statistical mechanics, Nauka Publishers, 1978

A. B. Kac, V. M. Kontorovich, S. S. Moiseev and V. E. Novikov, Accurate power solutions of kinetic equations for particles, ZhETF, vol. 71, p. 180–192, (1976).

V. I. Karas, S. S. Moiseev, V. E. Novikov. Accurate power solutions of kinetic equations for particles in solid plasma , ZhETF, vol. 71, 1976, p. 744

S. V. Adamenko, N. N. Bogolubov et all, Self-organization in spatially homogeneous systems of particles—the formation of locally non-equilibrium structures in the phase space. International Journal of modern physics B, vol. 31, 2007

S. V. Adamenko, V. I. Vysotskii, Mechanism of synthetics of superheavy nuclei via the process of controlled electron-nuclear collapse. Foundations of Physics Letters, v.17, 3, 2004.

S. V. Adamenko, V. I. Vysotskii, Neutronization and protonization of nuclei: two possible ways of the evolution of astrophysical objects and the laboratory electron-nucleus collapse. Foundations of Physics Letters, v.19, No, 1, 2006.

Tsallis C., Physica A, Nonextensive thermostatics: brief review and comments // V.221, 1995, pp. 277-290

V. E. Novikov, S. S. Moiseev, V. P. Seminozhenko, On a possibility of inducing acoustic plasma oscillations in non-equilibrium semiconductors, Physics and Technology of Semiconductors, 14, issue 2, pp. 402–403, 1980.

V. L. Ginzburg, Problems of high-temperature superconductivity (Overview) pp. 11-56, in the book ’Problems of high-temperature superconduc- tivity’, edited by V.L. Ginzburg and D.A. Kirzhnitsa, Nauka Publishers, 1977

V. N. Bolotov, V. E. Novikov, Description of chaotic dynamic systems by the regularization methods, Proceedings of the 7th International Crimean Microwave Conference, KRYMIKO-97, September 15–18 1997, vol. 1, p. 264

V. N. Bolotov. The Cantor Distribution and Fractal Transition Scatter- ing // Technical Physics. Vol. 47, N 2, 2002, p. 148–155

M. Ernst, Kinetics of cluster formation under irreversible aggregation, p. 398–429, see in the book ’Fractals in Physics, M. Mir Publishers, 1988

K. Gauss, On one new general principle of mechanics (Uber ein neues allgemeines Grundgesetz der Mechanik); in the book ‘Variation principles’ edited by L. S. Polak.

P. Dirak, Generalized Hamiltonian Dynamics; see in the book. ‘Variation principles’ edited by L. S. Polak.

N. A. Kozyrev, On the possibility of experimental investigation of the properties of time. In: Time in Science and Philosophy. Prague, pp. 111–132


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