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Main Authors: Dong, Rumin, Zhu, Lin, Sheng, Qin, Zhao, Bingxin
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2503.03468
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author Dong, Rumin
Zhu, Lin
Sheng, Qin
Zhao, Bingxin
author_facet Dong, Rumin
Zhu, Lin
Sheng, Qin
Zhao, Bingxin
contents This paper investigates quenching solutions of an one-dimensional, two-sided Riemann-Liouville fractional order convection-diffusion problem. Fractional order spatial derivatives are discretized using weighted averaging approximations in conjunction with standard and shifted Grünwald formulas. The advective term is handled utilizing a straightforward Euler formula, resulting in a semi-discretized system of nonlinear ordinary differential equations. The conservativeness of the proposed scheme is rigorously proved and validated through simulation experiments. The study is further advanced to a fully discretized, semi-adaptive finite difference method. Detailed analysis is implemented for the monotonicity, positivity and stability of the scheme. Investigations are carried out to assess the potential impacts of the fractional order on quenching location, quenching time, and critical length. The computational results are thoroughly discussed and analyzed, providing a more comprehensive understanding of the quenching phenomena modeled through two-sided fractional order convection-diffusion problems.
format Preprint
id arxiv_https___arxiv_org_abs_2503_03468
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle A semi-adaptive finite difference method for simulating two-sided fractional convection-diffusion quenching problems
Dong, Rumin
Zhu, Lin
Sheng, Qin
Zhao, Bingxin
Analysis of PDEs
This paper investigates quenching solutions of an one-dimensional, two-sided Riemann-Liouville fractional order convection-diffusion problem. Fractional order spatial derivatives are discretized using weighted averaging approximations in conjunction with standard and shifted Grünwald formulas. The advective term is handled utilizing a straightforward Euler formula, resulting in a semi-discretized system of nonlinear ordinary differential equations. The conservativeness of the proposed scheme is rigorously proved and validated through simulation experiments. The study is further advanced to a fully discretized, semi-adaptive finite difference method. Detailed analysis is implemented for the monotonicity, positivity and stability of the scheme. Investigations are carried out to assess the potential impacts of the fractional order on quenching location, quenching time, and critical length. The computational results are thoroughly discussed and analyzed, providing a more comprehensive understanding of the quenching phenomena modeled through two-sided fractional order convection-diffusion problems.
title A semi-adaptive finite difference method for simulating two-sided fractional convection-diffusion quenching problems
topic Analysis of PDEs
url https://arxiv.org/abs/2503.03468