A computational method for identifying a spacewise-dependent heat source

This paper investigates the inverse problem of determining a spacewise dependent heat source in the parabolic heat equation using the usual conditions of the direct problem and information from a supplementary temperature measurement at a given single instant of time. The spacewise dependent tempera

In this paper an effective meshless and integration-free numerical scheme for solving an inverse spacewise-dependent heat source problem is proposed. Due to the use of the fundamental solution as basis functions, the method leads to a global approximation scheme in both spatial and time domains. The

## a b s t r a c t We consider an inverse problem for estimating an unknown time-dependent heat source HðtÞ in a heat conduction equation T t ðx; tÞ ¼ T xx ðx; tÞ þ HðtÞ, with the aid of an extra measurement of temperature at an internal point. The Lie-group shooting method (LGSM) was used in the

Presented is an efficient numerical method for computing thermal rate constants for quantum systems with few, localized degrees of freedom. The starting point is the work of Miller, Schwartz and Tromp in which the rate constant is expressed in terms of an equilibrium flux-flux correlation function.

We consider a time-dependent, energy-dependent, nonlinear radiative transfer problem in which opacities are large [O(ε -1 )] and interior sources are small [O(ε)]. An asymptotic analysis of this problem as ε → 0 leads to the equilibrium diffusion equation in the interior of the system, along with bo