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Approximate solutions of nonstationary junction heat-exchange problems for laminar fluid flow in channels

Abstract

Through the combined use of the double-integral Laplace-Carson transform and the Bubnov-Galerkin orthogonal method, a solution is obtained of a junction heat-exchange problem for rectilinear fluid flow.

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Literature cited

  1. A. V. Lykov and T. L. Perel'man, Heat and Mass Exchange with a Surrounding Gaseous Medium [in Russian], Minsk (1965), pp. 3–24.

  2. P. V. Tsoi, Computational Methods in Heat and Mass Transfer Problems [in Russian], Moscow (1971).

  3. P. V. Tsoi, Computational Methods in Heat and Mass Transfer Problems [in Russian], 2nd ed., Moscow (1984).

  4. V. A. Ditkin and A. P. Prudnikov, Operational Calculus in Two Variables and Its Applications [in Russian], Moscow (1958).

  5. V. A. Ditkin and A. P. Prudnikov, Operational Calculus [in Russian], Moscow (1975).

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Translated from Inzhenerno-Fizicheskii Zhurnal, Vol. 51, No. 5, pp. 795–801, November, 1986.

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Kudinov, V.A. Approximate solutions of nonstationary junction heat-exchange problems for laminar fluid flow in channels. Journal of Engineering Physics 51, 1326–1331 (1986). https://doi.org/10.1007/BF00870690

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  • DOI: https://doi.org/10.1007/BF00870690

Keywords

  • Statistical Physic
  • Fluid Flow
  • Approximate Solution
  • Orthogonal Method
  • Laminar Fluid Flow