Add to ORKGCoherent state theory is shown to reproduce three categories of representations of the spectrum generating algebra for an algebraic model: (i) classical realizations which are the starting point for geometric quantization; (ii) induced unitary representations corresponding to prequantization; and (iii) irreducible unitary representations obtained in geometric quantization by choice of a polarization. These representations establish an intimate relation between coherent state theory and geometric quantization in the context of induced representations
When solving problems involving quantum mechanical systems, it is frequently desirable to find the m...
The introduction of a set of intrinsic coordinates to give an explicit construction of the intrinsic...
In this paper we introduce the algebraic formulation for group field theory and study non-Fock (cond...
grantor: University of TorontoA theory of quantization is given, for a model with symmetry...
grantor: University of TorontoA theory of quantization is given, for a model with symmetry...
A theory of quantization is given, for a model with symmetry, as the inverse of dequantization. Dequ...
A theory of quantization is given, for a model with symmetry, as the inverse of dequantization. Dequ...
We describe a family of coherent states and an associated resolution of the identity for a quantum p...
In this note we review some issues in the geometrical approach to coherent states (CS). Specifically...
Geometric quantization is a natural way to construct quantum models starting from classical data. In...
In this work we focus on an alternative quantization method using generalized coherent states. The c...
In this work we focus on an alternative quantization method using generalized coherent states. The c...
In this work we focus on an alternative quantization method using generalized coherent states. The c...
When solving problems involving quantum mechanical systems, it is frequently desirable to find the m...
We discuss the construction of coherent states (CS) for systems with continuous spectra. First, we p...
When solving problems involving quantum mechanical systems, it is frequently desirable to find the m...
The introduction of a set of intrinsic coordinates to give an explicit construction of the intrinsic...
In this paper we introduce the algebraic formulation for group field theory and study non-Fock (cond...
grantor: University of TorontoA theory of quantization is given, for a model with symmetry...
grantor: University of TorontoA theory of quantization is given, for a model with symmetry...
A theory of quantization is given, for a model with symmetry, as the inverse of dequantization. Dequ...
A theory of quantization is given, for a model with symmetry, as the inverse of dequantization. Dequ...
We describe a family of coherent states and an associated resolution of the identity for a quantum p...
In this note we review some issues in the geometrical approach to coherent states (CS). Specifically...
Geometric quantization is a natural way to construct quantum models starting from classical data. In...
In this work we focus on an alternative quantization method using generalized coherent states. The c...
In this work we focus on an alternative quantization method using generalized coherent states. The c...
In this work we focus on an alternative quantization method using generalized coherent states. The c...
When solving problems involving quantum mechanical systems, it is frequently desirable to find the m...
We discuss the construction of coherent states (CS) for systems with continuous spectra. First, we p...
When solving problems involving quantum mechanical systems, it is frequently desirable to find the m...
The introduction of a set of intrinsic coordinates to give an explicit construction of the intrinsic...
In this paper we introduce the algebraic formulation for group field theory and study non-Fock (cond...