论文信息 - Determination of a time-dependent diffusivity from nonlocal conditions

Determination of a time-dependent diffusivity from nonlocal conditions

The inverse problem of determining the temperature and the time-dependent thermal diffusivity from various additional nonlocal information is investigated. These nonlocal conditions can come in the form of an internal or boundary energy, or, in the one-dimensional case, as a difference boundary temperature or heat flux so as to ensure the uniqueness of solution for the heat conduction equation with unknown thermal diffusivity coefficient. The Ritz-Galerkin method with satisfier function is employed to solve the inverse problems numerically. Numerical results are presented and discussed.

[1] Susan McLaren,et al. Exploring key discriminators of progression: relationships between attitude, meta-cognition and performance of novice designers at a time of transition , 2008 .

[2] The inverse problem of finding the time-dependent diffusion coefficient of the heat equation from integral overdetermination data , 2012 .

[3] M. Ivanchov,et al. Inverse problems for equations of parabolic type , 2003 .

[4] B. Jones,et al. The determination of a coefficient in a parabolic differential equation , 1961 .

[5] Mauro Fabrizio,et al. Existence and Uniqueness , 2021, Thermodynamics of Materials with Memory.

[6] Felix E. Browder,et al. The One-Dimensional Heat Equation , 1984 .

[7] A. Friedman. Partial Differential Equations of Parabolic Type , 1983 .

[8] S. Yousefi,et al. Satisfier function in Ritz–Galerkin method for the identification of a time-dependent diffusivity , 2012 .

[9] N. I. Ivanchov. Inverse problems for the heat-conduction equation with nonlocal boundary conditions , 1993 .

[10] William Rundell,et al. Recovering a time dependent coefficient in a parabolic differential equation , 1991 .

[11] Felix E. Browder,et al. The One-Dimensional Heat Equation: Preface , 1984 .