Physics – High Energy Physics – High Energy Physics - Theory
Scientific paper
2003-08-16
Phys.Rev. D69 (2004) 085005
Physics
High Energy Physics
High Energy Physics - Theory
25 pages, 2 figures, section and appendix on the surface energy for a spherical shell are added, references added, accepted fo
Scientific paper
10.1103/PhysRevD.69.085005
We argue that already at classical level the energy-momentum tensor for a scalar field on manifolds with boundaries in addition to the bulk part contains a contribution located on the boundary. Using the standard variational procedure for the action with the boundary term, the expression for the surface energy-momentum tensor is derived for arbitrary bulk and boundary geometries. Integral conservation laws are investigated. The corresponding conserved charges are constructed and their relation to the proper densities is discussed. Further we study the vacuum expectation value of the energy-momentum tensor in the corresponding quantum field theory. It is shown that the surface term in the energy-momentum tensor is essential to obtain the equality between the vacuum energy, evaluated as the sum of the zero-point energies for each normal mode of frequency, and the energy derived by the integration of the corresponding vacuum energy density. As an application, by using the zeta function technique, we evaluate the surface energy for a quantum scalar field confined inside a spherical shell.
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