Saved in:
Bibliographic Details
Main Authors: Bordag, M., Klimchitskaya, G. L., Mostepanenko, V. M.
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2405.14306
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866914846446977024
author Bordag, M.
Klimchitskaya, G. L.
Mostepanenko, V. M.
author_facet Bordag, M.
Klimchitskaya, G. L.
Mostepanenko, V. M.
contents In this paper, we consider the convergence properties of the polarization tensor of graphene obtained in the framework of thermal quantum field theory in three-dimensional space-time. During the last years, this problem attracted much attention in connection with calculation of the Casimir force in graphene systems and investigation of the electrical conductivity and reflectance of graphene sheets. There are contradictory statements in the literature, especially on whether this tensor has an ultraviolet divergence in three dimensions. Here, we analyze this problem using the well known method of dimensional regularization. It is shown that the thermal correction to the polarization tensor is finite at any $D$, whereas its zero-temperature part behaves differently for $D=3$ and 4. For $D=3$, it is obtained by the analytic continuation with no subtracting infinitely large terms. As to the space-time of $D=4$, the finite result for the polarization tensor at zero temperature is found after subtracting the pole term. Our results are in agreement with previous calculations of the polarization tensor at both zero and nonzero temperature. This opens possibility for a wider application of the quantum field theoretical approach in investigations of graphene and other two-dimensional novel materials.
format Preprint
id arxiv_https___arxiv_org_abs_2405_14306
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle On the convergence of the polarization tensor in space-time of three dimensions
Bordag, M.
Klimchitskaya, G. L.
Mostepanenko, V. M.
High Energy Physics - Theory
In this paper, we consider the convergence properties of the polarization tensor of graphene obtained in the framework of thermal quantum field theory in three-dimensional space-time. During the last years, this problem attracted much attention in connection with calculation of the Casimir force in graphene systems and investigation of the electrical conductivity and reflectance of graphene sheets. There are contradictory statements in the literature, especially on whether this tensor has an ultraviolet divergence in three dimensions. Here, we analyze this problem using the well known method of dimensional regularization. It is shown that the thermal correction to the polarization tensor is finite at any $D$, whereas its zero-temperature part behaves differently for $D=3$ and 4. For $D=3$, it is obtained by the analytic continuation with no subtracting infinitely large terms. As to the space-time of $D=4$, the finite result for the polarization tensor at zero temperature is found after subtracting the pole term. Our results are in agreement with previous calculations of the polarization tensor at both zero and nonzero temperature. This opens possibility for a wider application of the quantum field theoretical approach in investigations of graphene and other two-dimensional novel materials.
title On the convergence of the polarization tensor in space-time of three dimensions
topic High Energy Physics - Theory
url https://arxiv.org/abs/2405.14306