Add to ORKGWe study numerically the dynamical triangulation formulation of two-dimensional quantum gravity using a restricted class of triangulation, so-called minimal triangulations, in which only vertices of coordination number 5, 6, and 7 are allowed. A real-space RG analysis shows that for pure gravity (central charge c = 0) this restriction does not affect the critical behavior of the model. Furthermore, we show that the critical behavior of an Ising model coupled to minimal dynamical triangulations (c = 1/2) is still governed by the KPZ-exponents
The statistical properties of dynamically triangulated manifolds (DT mfds) in terms of the geodesic ...
We study with Monte Carlo methods an ensemble of c=&5 gravity graphs, generated by coupling a co...
Causal dynamical triangulation (CDT) is a nonperturbative quantization of general relativity. Hořava...
We introduce and investigate numerically a minimal class of dynamical triangulations of two-dimensio...
We use the recently proposed node decimation algorithm for blocking dynamical geometries to investig...
An outstanding challenge for models of non-perturbative quantum gravity is the consistent formulatio...
The dynamical triangulation model of three-dimensional quantum gravity is shown to have a line of tr...
An outstanding challenge for models of non-perturbative quantum gravity is the consistent formulatio...
We propose a new real-space renormalization group transformation for dynamical triangulations. It is...
The dynamical triangulation model of three-dimensional quantum gravity is shown to have a line of tr...
The search for typical length scales, eventually diverging at a critical point, is a major goal for ...
We consider two issues in the DT model of quantum gravity. First, it is shown that the triangulation...
We propose a new real-space renormalization group transformation for dynamical triangulations. It is...
We estimate analytically the critical coupling separating the weak and the strong coupling regime in...
A potentially powerful approach to quantum gravity has been developed over the last few years under ...
The statistical properties of dynamically triangulated manifolds (DT mfds) in terms of the geodesic ...
We study with Monte Carlo methods an ensemble of c=&5 gravity graphs, generated by coupling a co...
Causal dynamical triangulation (CDT) is a nonperturbative quantization of general relativity. Hořava...
We introduce and investigate numerically a minimal class of dynamical triangulations of two-dimensio...
We use the recently proposed node decimation algorithm for blocking dynamical geometries to investig...
An outstanding challenge for models of non-perturbative quantum gravity is the consistent formulatio...
The dynamical triangulation model of three-dimensional quantum gravity is shown to have a line of tr...
An outstanding challenge for models of non-perturbative quantum gravity is the consistent formulatio...
We propose a new real-space renormalization group transformation for dynamical triangulations. It is...
The dynamical triangulation model of three-dimensional quantum gravity is shown to have a line of tr...
The search for typical length scales, eventually diverging at a critical point, is a major goal for ...
We consider two issues in the DT model of quantum gravity. First, it is shown that the triangulation...
We propose a new real-space renormalization group transformation for dynamical triangulations. It is...
We estimate analytically the critical coupling separating the weak and the strong coupling regime in...
A potentially powerful approach to quantum gravity has been developed over the last few years under ...
The statistical properties of dynamically triangulated manifolds (DT mfds) in terms of the geodesic ...
We study with Monte Carlo methods an ensemble of c=&5 gravity graphs, generated by coupling a co...
Causal dynamical triangulation (CDT) is a nonperturbative quantization of general relativity. Hořava...