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Complex, Lorentzian, and Euclidean simplicial quantum gravity: numerical methods and physical prospects

Ding Jia

2022Classical and Quantum Gravity22 citationsDOIOpen Access PDF

Abstract

Abstract Evaluating gravitational path integrals in the Lorentzian has been a long-standing challenge due to the numerical sign problem. We show that this challenge can be overcome in simplicial quantum gravity. By deforming the integration contour into the complex, the sign fluctuations can be suppressed, for instance using the holomorphic gradient flow algorithm. Working through simple models, we show that this algorithm enables efficient Monte Carlo simulations for Lorentzian simplicial quantum gravity. In order to allow complex deformations of the integration contour, we provide a manifestly holomorphic formula for Lorentzian simplicial gravity. This leads to a complex version of simplicial gravity that generalizes the Euclidean and Lorentzian cases. Outside the context of numerical computation, complex simplicial gravity is also relevant to studies of singularity resolving processes with complex semi-classical solutions. Along the way, we prove a complex version of the Gauss–Bonnet theorem, which may be of independent interest.

Topics & Concepts

Simplicial complexEuclidean quantum gravityPhysicsQuantum gravityHolomorphic functionSpin foamSimplicial manifoldGravitationTheoretical physicsClassical mechanicsMathematical analysisQuantumPure mathematicsLoop quantum gravityMathematicsQuantum mechanicsHomotopyHomotopy categorySimplicial setBlack Holes and Theoretical PhysicsNoncommutative and Quantum Gravity TheoriesCosmology and Gravitation Theories
Complex, Lorentzian, and Euclidean simplicial quantum gravity: numerical methods and physical prospects | Litcius