论文信息 - A Method of Solution for the One-Dimensional Heat Equation Subject to Nonlocal Conditions

A Method of Solution for the One-Dimensional Heat Equation Subject to Nonlocal Conditions

The problem of solving the one-dimensional heat equation ∂φ/∂t - ∂2φ/∂x2 = f(x, t) subject to given initial and nonlocal conditions is considered. It is solved in the Laplace transform domain by taking the Laplace transform of the unknown function φ with respect to time t. The physical solution is recovered with the help of a numerical technique for inverting the Laplace transform.

W. Ang | Whye-Teong Ang

[1] W. A. Day. A decreasing property of solutions of parabolic equations with applications to thermoelasticity , 1983 .

[2] W. Ang. A Crack in an Anisotropic Layered Material Under the Action of Impact Loading , 1988 .

[3] Gunnar Ekolin,et al. Finite difference methods for a nonlocal boundary value problem for the heat equation , 1991 .

[4] William Alan Day,et al. Extensions of a property of the heat equation to linear thermoelasticity and other theories , 1982 .

[5] R. Bellman,et al. A NUMERICAL INVERSION OF THE LAPLACE TRANSFORM , 1963 .