Recent Mathematical Methods in Heat Transfer
作者: I.J. Kumar
DOI: 10.1016/S0065-2717(08)70037-6
关键词: Heat transfer 、 Applied mathematics 、 Partial differential equation 、 Recent heat 、 Perturbation (astronomy) 、 Thermodynamics 、 Biharmonic equation 、 Computer science 、 Nonlinear system 、 Boundary layer
摘要: Publisher Summary This chapter presents a review of the important analytical methods used in recent heat transfer literature. It discusses perturbation methods, asymptotic variational based on use complex variable (i.e. solution harmonic and biharmonic equations, Schwarz-Christoffel transformation, Wiener-Hopf Method), special for partial differential equations. While reviewing particular method, examples are presented from literature irrespective location problem hierarchy Thus, it is attempted to synthesize developments point view mathematical methods. The most powerful Regular can be almost all branches involving nonlinear boundary layer problems interaction radiation with other modes usually lead singular perturbations.
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