Casimir interaction between a cylinder and a plate at finite temperature: Exact results and comparison to proximity force approximation

TL;DR

This paper provides exact finite temperature calculations of the Casimir interaction between a cylinder and a plate, compares them with proximity force approximation, and explores different temperature regimes and boundary conditions.

Contribution

It derives exact formulas for the Casimir interaction at finite temperature and analyzes the validity of the proximity force approximation across temperature regimes.

Findings

Leading terms match proximity force approximation when rT>>1.

In medium temperature, Casimir energy scales as T^{5/2} and force as T^{7/2}.

At high temperature, dominant terms come from zeroth Matsubara frequency, linear in T.

Abstract

We study the finite temperature Casimir interaction between a cylinder and a plate using the exact formula derived from the Matsubara representation and the functional determinant representation. We consider the scalar field with Dirichlet and Neumann boundary conditions. The asymptotic expansions of the Casimir energy and the Casimir force when the separation $a$ between the cylinder and the plate is small are derived. As in the zero temperature case, it is found that the leading terms of the Casimir energy and the Casimir force agree with those derived from the proximity force approximation when $rT\gg 1$, where $r$ is the radius of the cylinder. When $aT\ll 1\ll rT$ (the medium temperature region), the leading term of the Casimir energy is of order $T^{5/2}$ whereas for the Casimir force, it is of order $T^{7/2}$. In this case, the leading terms are independent of the separation $a$. When $1\ll aT\ll rT$ (the high temperature region), the dominating terms of the Casimir energy and the Casimir force come from the zeroth Matsubara frequency. In this case, the leading terms are linear in $T$, but for the energy, it is inversely proportional to $a^{3/2}$, whereas for the force, it is inversely proportional to $a^{5/2}$. The first order corrections to the proximity force approximations in different temperature regions are computed using perturbation approach. In the zero temperature case, the results agree with those derived in [Bordag, Phys. Rev. D \textbf{73}, 125018 (2006)].