Abstract
A method for determining the relaxation time of a heat flux is suggested for some nonlinear boundary-value problems of heat transfer. Modern representations of the applied theory of dynamical systems are employed.
Similar content being viewed by others
References
E. I. Levanov and E. N. Sotskii, Inzh.-Fiz. Zh.,50, No. 6, 1017–1024 (1986).
A. N. Sharkovskii, Yu. L. Maistrenko, and E. Yu. Romanenko, Difference Equations and Their Applications [in Russian], Kiev (1986).
A. B. Vasil'eva and V. F. Butuzov, Asymptotic Methods in the Theory of Singular Disturbances [in Russian], Moscow (1990).
G. M. Zaslavskii, Stochasticity of Dynamical Systems [in Russian], Moscow (1984).
M. Lax, Fluctuations and Coherent Phenomena [Russian translation], Moscow (1974).
A. S. Monin and A. M. Yaglom, Statistical Hydromechanics. The Mechanism of Turbulence [in Russian], Moscow, Pt. 1 (1965); Pt. 2 (1967).
H. Haken, Quantum-Field Theory of a Solid [Russian translation], Moscow (1980).
R. L. Dobrushin, in: Papers of the Winter School on Probability Theory and Mathermatical Statistics [in Russian], Kiev (1964).
A. V. Andreev, V. I. Emel'yanov, and Yu. A. Il'inskii, Cooperative Phenomena in Optics: Superradiation. Bistability. Phase Transitions [in Russian], Moscow (1988).
Additional information
S. V. Starodubtsev Physicotechnical Institute, Tashkent. Translated from Inzhenerno-Fizicheskii Zhurnal, Vol. 67, Nos. 3–4, pp. 324–332, September–October, 1994.
Rights and permissions
About this article
Cite this article
Krasnyuk, I.B., Riskiev, T.T. Determination of the relaxation time of a heat flux. J Eng Phys Thermophys 67, 975–984 (1994). https://doi.org/10.1007/BF00853030
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF00853030