An Asymptotic-Preserving Method for Three-Temperature Radiative Transfer Model

The author presents an asymptotic-preserving numerical method for solving the three-temperature radiative transfer model, emphasizing its significance in inertial confinement fusion. The proposed scheme captures important limiting models and demonstrates efficiency through benchmark tests.

The content discusses the development of an asymptotic-preserving method for solving the three-temperature radiative transfer model, crucial in inertial confinement fusion. It introduces a splitting approach to handle complex interactions between radiation, electrons, and ions. The method is validated through rigorous testing and showcases energy conservation properties. Key challenges such as nonlinearity, high dimensionality, and multiscale parameters are addressed with innovative solutions. The article delves into the intricacies of modeling thermal radiative transfer in inertial confinement fusion scenarios using a three-temperature system. It highlights the importance of accurately capturing electron-ion coupling dynamics and radiation effects. The proposed method involves splitting the system into microscopic and macroscopic parts to handle nonlinearities effectively. By employing an alternating iterative solver, computational efficiency is enhanced while maintaining accuracy across extreme parameter ranges. Efforts are made to extend existing asymptotic-preserving schemes to tackle the complexities of the three-temperature radiative transfer model efficiently. The discussion covers detailed formulations, limits of diffusion behavior, two-temperature scenarios, temporal discretization methods, and iterative solvers for numerical stability. Overall, the content provides valuable insights into advanced numerical techniques for handling challenging radiative transfer problems.

2ϵ²c∂ρ/∂t + ϵ∂ψ₁/∂x = -σ(2ρ - acTₑ⁴) ϵ²c∂ψ₁/∂t + 2ϵ(3∂ρ/∂x + 2∂ψ₂/∂x) = -σψ₁ ϵ²c∂¯u/∂t + ϵA(∂u/∂x) + ϵB(∂u/∂x) = -σ¯u ϵ²Cᵥₑ ∂Tₑ/∂t = (1/2cκ)(Tᵢ - Tₑ) + σ(2ρ - acTₑ⁴) ϵ²Cᵥᵢ ∂Tᵢ/∂t = (1/2cκ)(Tₑ - Tᵢ)

"We present an asymptotic-preserving numerical method for solving the three-temperature radiative transfer model." "The proposed scheme captures two important limiting models: the three-temperature radiation diffusion equation and the two-temperature limit." "The rest of this paper is organized into detailed discussions on various aspects of the three-temperature radiative transfer model."