SPECTRAL METHODS FOR TRANSIENT HEAT CONDUCTION PROBLEMS IN SIMPLE GEOMETRIES.
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, Conference
McMurray, JT; Shaughnessy, EJ
Published in: ASME Pap
January 1, 1979
Solutions to the unsteady heat conduction problem are obtained using a numerical procedure based on a Chebyshev series representation for the spatial dependence of the temperature field. This series contains time dependent coefficients which are selected so that the spectral series represents a good approximation to the evolving temperature field. The fundamental equations describing the spectral coefficients are derived using the Chebyshev-Tau matrix method. These equations are stepped forward in time using the Crank-Nicolson time differencing scheme. The technique is illustrated by applying it to several classical problems of unsteady conduction in simple geometries.
Duke Scholars
Published In
ASME Pap
ISSN
0402-1215
Publication Date
January 1, 1979
Issue
79 -HT-62
Citation
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McMurray, J. T., & Shaughnessy, E. J. (1979). SPECTRAL METHODS FOR TRANSIENT HEAT CONDUCTION PROBLEMS IN SIMPLE GEOMETRIES. In ASME Pap.
McMurray, J. T., and E. J. Shaughnessy. “SPECTRAL METHODS FOR TRANSIENT HEAT CONDUCTION PROBLEMS IN SIMPLE GEOMETRIES.” In ASME Pap, 1979.
McMurray JT, Shaughnessy EJ. SPECTRAL METHODS FOR TRANSIENT HEAT CONDUCTION PROBLEMS IN SIMPLE GEOMETRIES. In: ASME Pap. 1979.
McMurray, J. T., and E. J. Shaughnessy. “SPECTRAL METHODS FOR TRANSIENT HEAT CONDUCTION PROBLEMS IN SIMPLE GEOMETRIES.” ASME Pap, no. 79-HT-62, 1979.
McMurray JT, Shaughnessy EJ. SPECTRAL METHODS FOR TRANSIENT HEAT CONDUCTION PROBLEMS IN SIMPLE GEOMETRIES. ASME Pap. 1979.
Published In
ASME Pap
ISSN
0402-1215
Publication Date
January 1, 1979
Issue
79 -HT-62