Add to ORKGWithin the frame of a Group Approach to Quantization anomalies arise in a quite natural way. We present in this talk an analysis of the basic obstructions that can be found when we try to translate symmetries of the Newton equations to the Quantum Theory. They fall into two classes: algebraic and topologic according to the local or global character of the obstruction. We present here one explicit example of each
We examine in detail the process of resolving 't Hooft anomalies by extending the symmetry of a theo...
Geometrie quantisation on (infinite dimensional) graded symplectic manifolds is elaborated for a res...
Geometric quantization is applied to infinite (countable) dimensional linear Kähler manifolds to obt...
A quantum anomaly is the breaking of symmetry with respect to some transformations after the quantiz...
A quantum anomaly is the breaking of symmetry with respect to some transformations after the quantiz...
A family of quantum systems parametrized by the points of a compact space can realizeits classical s...
A quantum anomaly is the breaking of symmetry with respect to some transformations after the quantiz...
We study the deformation quantisation (Moyal quantisation) of general constrained Hamiltonian system...
We develop a proposal by Freed to see anomalous field theories as relative field theories, namely fi...
An algebraic program of computation and characterization of higher loop BRST anomalies is presented....
We develop a proposal by Freed to see anomalous field theories as relative field theories, namely fi...
We develop a proposal by Freed to see anomalous field theories as relative field theories, namely fi...
Anomalies can be anticipated at the classical level without changing the classical cohomology, by in...
Geometric quantization is applied to infinite (countable) dimensional linear Kähler manifolds to obt...
Geometric quantization is applied to infinite (countable) dimensional linear Kähler manifolds to obt...
We examine in detail the process of resolving 't Hooft anomalies by extending the symmetry of a theo...
Geometrie quantisation on (infinite dimensional) graded symplectic manifolds is elaborated for a res...
Geometric quantization is applied to infinite (countable) dimensional linear Kähler manifolds to obt...
A quantum anomaly is the breaking of symmetry with respect to some transformations after the quantiz...
A quantum anomaly is the breaking of symmetry with respect to some transformations after the quantiz...
A family of quantum systems parametrized by the points of a compact space can realizeits classical s...
A quantum anomaly is the breaking of symmetry with respect to some transformations after the quantiz...
We study the deformation quantisation (Moyal quantisation) of general constrained Hamiltonian system...
We develop a proposal by Freed to see anomalous field theories as relative field theories, namely fi...
An algebraic program of computation and characterization of higher loop BRST anomalies is presented....
We develop a proposal by Freed to see anomalous field theories as relative field theories, namely fi...
We develop a proposal by Freed to see anomalous field theories as relative field theories, namely fi...
Anomalies can be anticipated at the classical level without changing the classical cohomology, by in...
Geometric quantization is applied to infinite (countable) dimensional linear Kähler manifolds to obt...
Geometric quantization is applied to infinite (countable) dimensional linear Kähler manifolds to obt...
We examine in detail the process of resolving 't Hooft anomalies by extending the symmetry of a theo...
Geometrie quantisation on (infinite dimensional) graded symplectic manifolds is elaborated for a res...
Geometric quantization is applied to infinite (countable) dimensional linear Kähler manifolds to obt...