On the relation between operator constraint, master constraint, reduced phase space and path integral quantization

Han M, Thiemann T (2010)


Publication Status: Published

Publication Type: Journal article

Publication year: 2010

Journal

Publisher: IOP PUBLISHING LTD

Book Volume: 27

Journal Issue: 22

DOI: 10.1088/0264-9381/27/22/225019

Abstract

Path integral formulations for gauge theories must start from the canonical formulation in order to obtain the correct measure. A possible avenue to derive it is to start from the reduced phase space formulation. In this paper we review this rather involved procedure in full generality. Moreover, we demonstrate that the reduced phase space path integral formulation formally agrees with the Dirac's operator constraint quantization and, more specifically, with the master constraint quantization for first-class constraints. For first-class constraints with nontrivial structure functions the equivalence can only be established by passing to Abelian(ized) constraints which is always possible locally in phase space. Generically, the correct configuration space path integral measure deviates from the exponential of the Lagrangian action. The corrections are especially severe if the theory suffers from second-class secondary constraints. In a companion paper we compute these corrections for the Holst and Plebanski formulations of GR on which current spin foam models are based.

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How to cite

APA:

Han, M., & Thiemann, T. (2010). On the relation between operator constraint, master constraint, reduced phase space and path integral quantization. Classical and Quantum Gravity, 27(22). https://doi.org/10.1088/0264-9381/27/22/225019

MLA:

Han, Muxin, and Thomas Thiemann. "On the relation between operator constraint, master constraint, reduced phase space and path integral quantization." Classical and Quantum Gravity 27.22 (2010).

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