A Discrete history of the Lorentzian path integral
Dec, 200237 pages
Part of Proceedings, 271st WE-Heraeus Seminar on Aspects of Quantum Gravity: From Theory to Experiment Search : Bad Honnef, Germany, February 25-March 1, 2002, 137-171
Published in:
- Lect.Notes Phys. 631 (2003) 137-171
Contribution to:
e-Print:
- hep-th/0212340 [hep-th]
Report number:
- SPIN-2002-40
View in:
Citations per year
Abstract:
In these lecture notes, I describe the motivation behind a recent formulation of a non-perturbative gravitational path integral for Lorentzian (instead of the usual Euclidean) space-times, and give a pedagogical introduction to its main features. At the regularized, discrete level this approach solves the problems of (i) having a well-defined Wick rotation, (ii) possessing a coordinate-invariant cutoff, and (iii) leading to_convergent_ sums over geometries. Although little is known as yet about the existence and nature of an underlying continuum theory of quantum gravity in four dimensions, there are already a number of beautiful results in d=2 and d=3 where continuum limits have been found. They include an explicit example of the inequivalence of the Euclidean and Lorentzian path integrals, a non-perturbative mechanism for the cancellation of the conformal factor, and the discovery that causality can act as an effective regulator of quantum geometry.Note:
- 38 pages, 16 figures, typos corrected, some comments and references added
- talk: Bad Honnef
- quantum gravity
- path integral
- triangulation
- space-time: simplex
- geometry
- propagator
- dimension: 2
- dimension: 3
- numerical calculations
References(0)
Figures(0)
Loading ...