Casimir energy for a Regular Polygon with Dirichlet Boundaries

Abstract

We study the Casimir energy of a scalar field for a regular polygon with N sides. The scalar field obeys Dirichlet boundary conditions at the perimeter of the polygon. The polygon eigenvalues λN are expressed in terms of the Dirichlet circle eigenvalues λC as an expansion in 1N of the form, λN = λC (1 + 4ζ(2)N2 + 4ζ(3)N3 + 28ζ(4)N4+...). A comparison follows between the Casimir energy on the polygon with N=4 found with our method and the Casimir energy of the scalar field on a square. We generalize the result to spaces of the form Rd× PN, with PN a N-polygon. By the same token, we find the electric field energy for a "cylinder" of infinite length with polygonal section. With the method we use and in view of the results, it stands to reason to assume that the Casimir energy of D-balls has the same sign with the Casimir energy of regular shapes homeomorphic to the D-ball. We sum up and discuss our results at the end of the article.