Solution of nonstationary heat and mass conductivity problems by using the imaginary-frequency characteristics
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A method for the approximate solution of the internal problem of nonstationary heat and mass conductivity is elucidated which is based on a rational fraction mode of approximating transcendental functions. Computational formulas are presented for one-dimensional plates, cylinders, and spheres.
KeywordsStatistical Physic Approximate Solution Fraction Mode Rational Fraction Transcendental Function
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- 1.A. G. Temkin, Inverse Heat Conduction Methods [in Russian], Énergiya, Moscow (1973).Google Scholar
- 2.A. G. Shashkov, Systems-Structure Analysis of Heat Transfer Processes and Its Application [in Russian], Énergoatomizdat, Moscow (1983).Google Scholar
- 3.A. I. Orurk, New Methods of Synthesis of Linear and Certain Nonlinear Dynamical Systems [in Russian], Nauka, Moscow-Leningrad (1965).Google Scholar
- 4.A. V. Lykov, Theory of Heat Conductivity [in Russian], Vysshaya Shkola, Moscow (1967).Google Scholar
- 5.A. V. Sudakov and A. S. Trofimov, Stresses Under Temperature Fluctuations [in Russian], Atomizdat, Moscow (1980).Google Scholar
- 6.A. V. Sudakov and A. S. Trofimov, “Analysis of thermoelastic stresses in a plate,” Inzh.-Fiz. Zh.,17, No. 2, 350–353 (1969).Google Scholar