Quantum field theory on manifolds with a boundary

Abstract

We discuss quantum theory of fields φ defined on (d+1)-dimensional manifold M with a boundary B. The free action W0(φ) which is a bilinear form in φ defines the Gaussian measure with a covariance (Green function) G. We discuss a relation between the quantum field theory with a fixed boundary condition and the theory defined by the Green function G. It is shown that the latter results by an average over of the first. The QFT in (anti)de Sitter space is treated as an example. It is shown that quantum fields on the boundary are more regular than the ones on (anti) de Sitter space.

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