Multidimensional cut-off technique, odd-dimensional Epstein zeta functions and Casimir energy of massless scalar fields
From MaRDI portal
Publication:3373182
DOI10.1088/0305-4470/39/3/017zbMath1087.81040arXivmath-ph/0510056OpenAlexW3104533840MaRDI QIDQ3373182
Publication date: 13 March 2006
Published in: Journal of Physics A: Mathematical and General (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math-ph/0510056
Model quantum field theories (81T10) Electromagnetic interaction; quantum electrodynamics (81V10) Other Dirichlet series and zeta functions (11M41)
Related Items (18)
Three-dimensional Casimir piston for massive scalar fields ⋮ Gluing formula for Casimir energies ⋮ Casimir effect for smooth potentials on spherically symmetric pistons ⋮ Equivalence of zeta function technique and Abel–Plana formula in regularizing the Casimir energy of hyper-rectangular cavities ⋮ Casimir pistons with generalized boundary conditions: a step forward ⋮ Casimir force of two-component Bose-Einstein condensates confined by a parallel plate geometry ⋮ The Casimir effect for pistons with transmittal boundary conditions ⋮ Casimir energy and brane stability ⋮ Casimir pistons with general boundary conditions ⋮ The Casimir effect for conical pistons ⋮ Generation of off-critical zeros for hypercubic Epstein zeta functions ⋮ DIRICHLET CASIMIR ENERGY FOR A SCALAR FIELD IN A SPHERE: AN ALTERNATIVE METHOD ⋮ CASIMIR ENERGY, FERMION FRACTIONALIZATION AND STABILITY OF A FERMI FIELD IN AN ELECTRIC POTENTIAL IN (1+1) DIMENSIONS ⋮ Some developments of the Casimir effect in p-cavity of (D + 1)-dimensional space–time ⋮ Finite temperature Casimir effect in Kaluza-Klein spacetime ⋮ SLAB BAG FERMIONIC CASIMIR EFFECT, CHIRAL BOUNDARIES AND VECTOR BOSON — MAJORANA FERMION PISTONS ⋮ CASIMIR PISTONS WITH CURVED BOUNDARIES ⋮ REPULSIVE CASIMIR FORCE FOR ELECTROMAGNETIC FIELDS WITH MIXED BOUNDARY CONDITIONS
This page was built for publication: Multidimensional cut-off technique, odd-dimensional Epstein zeta functions and Casimir energy of massless scalar fields
