论文信息 - General solutions of the heat equation in finite regions

General solutions of the heat equation in finite regions

Abstract Using a finite integral transform an analytical solution is found for a large class of heat transfer problems. This solution is obtained in form of infinite series and contains quasi-steady and transient terms. It is shown that the Olcer's conductive heat transfer solution [2,3] is a special case of the general solution obtained. The latter can also be applied when studying heat transfer in laminar and turbulent flows of Newtonian and non-Newtonian fluids in pipes and ducts, temperature development in the entrance region of MHD channels and elsewhere.

M. D. Mikhailov | M. Mikhailov

[1] I. Michiyoshi,et al. Heat transfer by hartmann's flow in thermal entrance region , 1964 .

[2] N. Y. Ölçer,et al. On the theory of conductive heat transfer in finite regions , 1964 .

[3] A. Hatton,et al. HEAT TRANSFER IN THE THERMAL ENTRY LENGTH WITH LAMINAR FLOW IN AN ANNULUS , 1962 .

[4] M. Mikhailov. allgemeine Lösung der eindimensionalen Wärmeübertragungsgleichung mit Hilfe der Eigenwerte , 1970 .

[5] Lothar Collatz,et al. Eigenwertaufgaben mit technischen Anwendungen , 1949 .

[6] N. Y. Ölçer,et al. On the theory of conductive heat transfer in finite regions with boundary conditions of the second kind , 1965 .

[7] J. Šesták,et al. Laminar heat transfer to a steady couette flow between parallel plates , 1969 .

[8] General solutions to a class of heat flow problems in a finite circular cylinder , 1967 .

[9] I. D. Federico,et al. Heat transfer in laminar flow of non-Newtonian heat-generating fluids , 1964 .