Add to ORKGWe give a derivation of the loop equation for two-dimensional gravity from the KdV equations and the string equation of the one matrix model. We find that the loop equation is equivalent to an infinite set of linear constraints on the square root of the partition function satisfying the Virasoro algebra. We give an interpretation of these equations in topological gravity and discuss their extension to multi-matrix models. For the multi-critical models the loop equation naturally singles out the operators corresponding to the primary fields of the minimal models
Abstract We study multi-boundary correlators in 2d Witten-Kontsevich topological gravity. We present...
In the last 20 years, loop quantum gravity, a background independent approach to unify general relat...
This is the fifth and final paper in our series of five in which we test the master constraint progr...
Based on Ashtekar\u27s new variables there are two different representation for canonical quantum gr...
We derive the loop equations for the d-dimensional n-Hermitian matrix model. These are a consequence...
The one-matrix model at the kth multicritical point is known to describe the (2, 2k-1) minimal model...
This is the second paper in our series of five in which we test the Master Constraint Programme for ...
We investigate soluble toy models of fluctuating random surfaces which arise through the topological...
The treatment of quantum constraint theories in physics is considered. These systems exist in many ...
Recently the Master Constraint Programme for Loop Quantum Gravity (LQG) was proposed as a classicall...
Although an important issue in canonical quantization, the problem of representing the constraint al...
This is the third paper in our series of five in which we test the Master Constraint Programme for s...
The Hamiltonian constraint is the key element of the canonical formulation of loop quantum gravity (...
In [1] we initiated an approach towards quantizing the Hamiltonian constraint in Loop Quantum Gravit...
Abstract. We review some approaches to the Hamiltonian dynamics of (loop) quantum gravity, the main ...
Abstract We study multi-boundary correlators in 2d Witten-Kontsevich topological gravity. We present...
In the last 20 years, loop quantum gravity, a background independent approach to unify general relat...
This is the fifth and final paper in our series of five in which we test the master constraint progr...
Based on Ashtekar\u27s new variables there are two different representation for canonical quantum gr...
We derive the loop equations for the d-dimensional n-Hermitian matrix model. These are a consequence...
The one-matrix model at the kth multicritical point is known to describe the (2, 2k-1) minimal model...
This is the second paper in our series of five in which we test the Master Constraint Programme for ...
We investigate soluble toy models of fluctuating random surfaces which arise through the topological...
The treatment of quantum constraint theories in physics is considered. These systems exist in many ...
Recently the Master Constraint Programme for Loop Quantum Gravity (LQG) was proposed as a classicall...
Although an important issue in canonical quantization, the problem of representing the constraint al...
This is the third paper in our series of five in which we test the Master Constraint Programme for s...
The Hamiltonian constraint is the key element of the canonical formulation of loop quantum gravity (...
In [1] we initiated an approach towards quantizing the Hamiltonian constraint in Loop Quantum Gravit...
Abstract. We review some approaches to the Hamiltonian dynamics of (loop) quantum gravity, the main ...
Abstract We study multi-boundary correlators in 2d Witten-Kontsevich topological gravity. We present...
In the last 20 years, loop quantum gravity, a background independent approach to unify general relat...
This is the fifth and final paper in our series of five in which we test the master constraint progr...