โ Scribed by Yu.T. Glazunov
No coin nor oath required. For personal study only.
The Kantorovich variational method has been used to obtain the approximate solutions of the nonlinear combined heat and mass transfer problems under first-and second-kind boundary conditions in an infinite plate. The solutions obtained have the property of convergence and the accuracy suitable for practical applications.
l"O~IEl"CLATURE Fo Fourier number (nondimensional time) Kim mass transfer Kirpichyov number Ki q heat transfer Kirpichyov number Ko* modified Kossovich number L Lagrangian depending on functions of one variable, Fo !i' Lagrangian depending on functions of two variables, X and Fo LII Luikov number PII Posnov number X non dimensional space coordinate. Greek symbols 01(X, Fo) nondimensional temperature 02(X, Fo) nondimensional mass transfer potential. Superscripts 8/8Fo. Il"TRODUCTION
๐ SIMILAR VOLUMES
This paper proposes a computational procedure based on the Trefftz method for the solution of non-linear Poisson problems. The problem is solved by finding an approximate particular solution to the Poisson equation and using boundary collocation to solve the resulting Laplace equation. This method r