Solution of heat-conduction problem with variable heat-exchange coefficient
Article
Received:
- 45 Downloads
- 2 Citations
Abstract
Exact solution is obtained in the form of an infinite series of the heat-conduction equation with boundary condition of the third kind and time-variable heat-exchange coefficient.
Keywords
Boundary Condition Statistical Physic Exact Solution Infinite Series
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.
Preview
Unable to display preview. Download preview PDF.
Literature cited
- 1.K.A.Kiselev and A.I. Azarev, Zh.Tekh.Fiz.,30, No.6 (1960).Google Scholar
- 2.M.A.Kaganov and Yu.L.Rozenshtok, Zh.Prikl.Mekh.i Tekh.Fiz., No.3 (1962).Google Scholar
- 3.I.M.Prikhod'ko, Izv. Vuzov, Aviatsionnaya Tekhnika, No.3 (1963).Google Scholar
- 4.Yu.L.Rozenshtok, Inzh.-Fiz. Zh., No.3 (1963).Google Scholar
- 5.V.V.Ivanov and V.V.Salomatov, Inzh.-Fiz. Zh.,9. No. 1 (1965).Google Scholar
- 6.Yu.V.Vidin, Inzh.-Fiz. Zh.,11, No.2 (1966).Google Scholar
- 7.Yu.V.Vidin, Izv. Akad. Nauk SSSR, Énergetika i Transport, No.3 (1967).Google Scholar
- 8.Yu.V.Vidin, Izv. Akad. Nauk SSSR, Énergetika i Transport, No.4 (1967).Google Scholar
- 9.V.V.Salomatov and É.I.Goncharov, Izv.Akad.Nauk SSSR, Énergetika i Transport, No.4 (1967).Google Scholar
- 10.V.V.Salomatov and É.I.Goncharov, Izv.Akad.Nauk SSSR, Énergetika i Transport, No.6 (1968).Google Scholar
- 11.I.N.Brikker, Avt.i Telemekh., No.8 (1966).Google Scholar
- 12.A.V.Lykov, Theory of Heat Conduction [in Russian], Vysshaya Shkola, Moscow (1967).Google Scholar
Copyright information
© Consultants Bureau 1972