Add to ORKGWe review the derivation of the Liouville action in 2DQG via the trace anomaly and emphasize how a similar approach can be used to derive an effective action describing the long wavelength dynamics of the conformal factor in 4D. In 2D we describe how to make an explicit connection between dynamical triangulations and this continuum theory, and present results which confirm the equivalance of the two approaches. By reconstructing a lattice conformal mode from DT simulations it should be possible to test this equivalence in 4D also
We determine the one-loop deformation of the conformal symmetry of a general N=2 superconformally in...
Liouville quantum gravity (LQG) is a random surface arising as the scaling limit of random planar ma...
The quantum dynamics of the gravitational field non-minimally coupled to an (also dynamical) scalar ...
We verify that summing 2D DT geometries correctly reproduces the Polyakov action for the conformal m...
We verify that summing 2D DT geometries correctly reproduces the Polyakov action for the conformal m...
We verify that summing 2D DT geometries correctly reproduces the Polyakov action for the conformal m...
The method of Causal Dynamical Triangulations is a background independent approach to Quantum Gravit...
A thorough numerical examination for the field theory of 4D quantum gravity (QG) with a special emph...
The construction of meaningful observables in models of quantum gravity is a highly non-trivial task...
We present the results of a high statistics Monte Carlo study of a model for four dimensional euclid...
Dynamical Triangulations provide us with a lattice regularization of four-dimensional Euclidean quan...
The issue of local gauge invariance in the simplicial lattice formulation of gravity is examined. We...
Causal dynamical triangulation (CDT) is a nonperturbative quantization of general relativity. Hořava...
Nowadays, two-dimensional quantumgravity can be studied in two differentapproaches, one involving di...
The search for typical length scales, eventually diverging at a critical point, is a major goal for ...
We determine the one-loop deformation of the conformal symmetry of a general N=2 superconformally in...
Liouville quantum gravity (LQG) is a random surface arising as the scaling limit of random planar ma...
The quantum dynamics of the gravitational field non-minimally coupled to an (also dynamical) scalar ...
We verify that summing 2D DT geometries correctly reproduces the Polyakov action for the conformal m...
We verify that summing 2D DT geometries correctly reproduces the Polyakov action for the conformal m...
We verify that summing 2D DT geometries correctly reproduces the Polyakov action for the conformal m...
The method of Causal Dynamical Triangulations is a background independent approach to Quantum Gravit...
A thorough numerical examination for the field theory of 4D quantum gravity (QG) with a special emph...
The construction of meaningful observables in models of quantum gravity is a highly non-trivial task...
We present the results of a high statistics Monte Carlo study of a model for four dimensional euclid...
Dynamical Triangulations provide us with a lattice regularization of four-dimensional Euclidean quan...
The issue of local gauge invariance in the simplicial lattice formulation of gravity is examined. We...
Causal dynamical triangulation (CDT) is a nonperturbative quantization of general relativity. Hořava...
Nowadays, two-dimensional quantumgravity can be studied in two differentapproaches, one involving di...
The search for typical length scales, eventually diverging at a critical point, is a major goal for ...
We determine the one-loop deformation of the conformal symmetry of a general N=2 superconformally in...
Liouville quantum gravity (LQG) is a random surface arising as the scaling limit of random planar ma...
The quantum dynamics of the gravitational field non-minimally coupled to an (also dynamical) scalar ...