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ISSN Online: 2379-1748

ISBN Flash Drive: 978-1-56700-472-4

ISBN Online: 978-1-56700-471-7

3rd Thermal and Fluids Engineering Conference (TFEC)
March, 4–7, 2018, Fort Lauderdale, FL, USA

SEMI-ANALYTIC NUMERICAL SOLUTION OF HEAT CONDUCTION PROBLEMS USING GREEN'S FUNCTIONS

Get access (open in a dialog) pages 249-270
DOI: 10.1615/TFEC2018.cfd.021672

要約

A semi-analytic numerical solution using Green's functions (GFs) is developed and demonstrated. The X22B10T0 solution for 1 − D transient conduction is used as a kernel to govern the dynamics of energy over discrete elements in the computational domain. Assembly of the elemental equations results in an explicit time marching scheme to compute new temperatures at the nodes at each time steps. An assumption regarding the temperature variation over each element is necessary in order to account for the "initial condition" term in the GF at each time step. Piecewise constant and linear variations in temperature over each element are examined. The semi-analytic method is benchmarked against a standard Crank − Nicolson scheme. Test cases evaluated include the temperature responses due to step, triangular, quadratic, and quartic heat flux pulses. The effect of element size and time step on each case is studied, and the results are compared to the exact solution.