Abstract
This work proposes a mechanical analog of the unsteady energy conservation equation for analysis of the stability of its numerical solution. The space discretized energy conservation equation is the analog of the linear momentum equation, from which no relevant information can be extracted concerning the stability of its numerical solution. The corresponding angular momentum equation can be obtained from the space discretized energy conservation equation, from which relevant information can be extracted concerning stability of the numerical solution. In that equation, the angular perturbation is the analog of the temperature perturbation. This approach/analogy and results help for a better understanding of the stability/instability of the numerical solution of unsteady diffusion problems.
Disclosure statement
The author declares that he has no known competing financial interests or personal relationships that could have appeared to influence the work reported in the article entitled ‘Stability of the numerical solution of unsteady heat conduction: A mechanical approach’ submitted for publication in the Numerical Heat Transfer, Part B: Fundamentals.