Algebraic approach to quantum field theory on non-globally-hyperbolic spacetimes
Ulvi Yurtsever
TL;DR
This paper develops an algebraic framework for quantum field theory that applies to arbitrary spacetimes, including those without global hyperbolicity, by generalizing the construction of the field algebra.
Contribution
It introduces a novel algebraic approach to quantize Klein-Gordon fields on non-globally-hyperbolic spacetimes, extending the traditional formalism.
Findings
Constructs the field algebra without requiring a global Cauchy surface
Reduces to standard Klein-Gordon theory on globally hyperbolic spacetimes
Provides a prescription for quantization on arbitrary topological backgrounds
Abstract
The mathematical formalism for linear quantum field theory on curved spacetime depends in an essential way on the assumption of global hyperbolicity. Physically, what lie at the foundation of any formalism for quantization in curved spacetime are the canonical commutation relations, imposed on the field operators evaluated at a global Cauchy surface. In the algebraic formulation of linear quantum field theory, the canonical commutation relations are restated in terms of a well-defined symplectic structure on the space of smooth solutions, and the local field algebra is constructed as the Weyl algebra associated to this symplectic vector space. When spacetime is not globally hyperbolic, e.g. when it contains naked singularities or closed timelike curves, a global Cauchy surface does not exist, and there is no obvious way to formulate the canonical commutation relations, hence no obvious…
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