1. Extremely low order time-fractional differential equation and application in combustion process.
- Author
-
Xu, Qinwu and Xu, Yufeng
- Subjects
- *
DIFFERENTIAL equations , *COMBUSTION , *FRACTIONAL calculus , *DIFFUSION , *MATHEMATICAL inequalities , *NUMERICAL analysis - Abstract
Fractional blow-up model, especially which is of very low order of fractional derivative, plays a significant role in combustion process. The order of time-fractional derivative in diffusion model essentially distinguishes the super-diffusion and sub-diffusion processes when it is relatively high or low accordingly. In this paper, the blow-up phenomenon and condition of its appearance are theoretically proved. The blow-up moment is estimated by using differential inequalities. To numerically study the behavior around blow-up point, a mixed numerical method based on adaptive finite difference on temporal direction and highly effective discontinuous Galerkin method on spatial direction is proposed. The time of blow-up is calculated accurately. In simulation, we analyze the dynamics of fractional blow-up model under different orders of fractional derivative. It is found that the lower the order, the earlier the blow-up comes, by fixing the other parameters in the model. Our results confirm the physical truth that a combustor for explosion cannot be too small. [ABSTRACT FROM AUTHOR]
- Published
- 2018
- Full Text
- View/download PDF