Numerical Analysis of some Generalized Casimir Pistons

Abstract

The Casimir force due to a scalar field on a piston in a cylinder of radius r with a spherical cap of radius R>r is computed numerically in the world-line approach. A geometrical subtraction scheme gives the finite interaction energy that determines the Casimir force. The spectral function of convex domains is obtained from a probability measure on convex surfaces that is induced by the Wiener measure on Brownian bridges the convex surfaces are the hulls of. The vacuum force on the piston by a scalar field satisfying Dirichlet boundary conditions is attractive in these geometries, but the strength and short-distance behavior of the force depends crucially on the shape of the piston casing. For a cylindrical casing with a hemispherical head, the force for a/R 0 does not depend on the dimension of the casing and numerically approaches - 0.00326(4) c/a2. Semiclassically this asymptotic force is due to short, closed and non-periodic trajectories that reflect once off the piston near its periphery. The semiclassical estimate - c/(96π a2)(1+2R2-r2/a) for the force when a/r r/R≤ 1 reproduces the numerical results within statistical errors.