Atmospheric Thermal Emission Effect on Chandrasekhar's Finite Atmosphere Problem

TL;DR

This paper extends Chandrasekhar's finite atmosphere problem by incorporating thermal emission, providing a more general analytical solution that enhances modeling accuracy of planetary atmospheres with emission.

Contribution

It introduces a comprehensive analytical framework for diffuse reflection in atmospheres with both scattering and thermal emission, including new functions and transformation relations.

Findings

Derived general integral equations for scattering and transmission functions with emission

Introduced new functions V(μ) and W(μ) analogous to Chandrasekhar's X(μ) and Y(μ)

Results reduce to Chandrasekhar's solutions in the low emission limit

Abstract

The solutions of the \textit{diffuse reflection finite atmosphere problem} are very useful in the astrophysical context. Chandrasekhar was the first to solve this problem analytically, by considering atmospheric scattering. These results have wide applications in the modeling of planetary atmospheres. However, they cannot be used to model an atmosphere with emission. We solved this problem by including \textit{thermal emission effect} along with scattering.Here, our aim is to provide a complete picture of generalized finite atmosphere problem in presence of scattering and thermal emission, and to give a physical account of the same. For that, we take an analytical approach using the invariance principle method to solve the diffuse reflection finite atmosphere problem in the presence of atmospheric thermal emission. We established the general integral equations of modified scattering function $S(\tau; \mu, \phi; \mu_0, \phi_0)$, transmission function $T(\tau; \mu, \phi; \mu_0, \phi_0)$ and their derivatives with respect to $\tau$ for a thermally emitting atmosphere. We customize these equations for the case of isotropic scattering and introduce two new functions $V(\mu)$ and $W(\mu)$, analogous to Chandrasekhar $X(\mu)$, and $Y(\mu)$ functions respectively. We also derive a transformation relation between the modified S-T functions and give a physical account of $V(\mu)$ and $W(\mu)$ functions. Our final results are consistent with those of Chandrasekhar at low emission limit (i.e. only scattering). From the consistency of our results, we conclude that the consideration of thermal emission effect in diffuse reflection finite atmosphere problem gives more general and accurate results than considering only scattering.