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Equivalence of two-dimensional QCD and the c = 1 matrix model
We consider two dimensional QCD with the spatial dimension compactified to a circle. We show that the states in the theory consist of interacting strings that wind around the circle and derive the Hamiltonian for this theory in the large $N$ limit, complete with interactions. Mapping the winding sta...
| Autores principales: | , |
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| Lenguaje: | eng |
| Publicado: |
1993
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| Materias: | |
| Acceso en línea: | https://dx.doi.org/10.1016/0370-2693(93)90504-B http://cds.cern.ch/record/247680 |
| _version_ | 1780885361685168128 |
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| author | Minahan, Joseph A. Polychronakos, Alexios P. |
| author_facet | Minahan, Joseph A. Polychronakos, Alexios P. |
| author_sort | Minahan, Joseph A. |
| collection | CERN |
| description | We consider two dimensional QCD with the spatial dimension compactified to a circle. We show that the states in the theory consist of interacting strings that wind around the circle and derive the Hamiltonian for this theory in the large $N$ limit, complete with interactions. Mapping the winding states into momentum states, we express this Hamiltonian in terms of a continuous field. For a $U(N)$ gauge group with a background source of Wilson loops, we recover the collective field Hamiltonian found by Das and Jevicki for the $c=1$ matrix model, except the spatial coordinate is on a circle. We then proceed to show that two dimensional QCD with a $U(N)$ gauge group can be reduced to a one- dimensional unitary matrix model and is hence equivalent to a theory of $N$ free nonrelativistic fermions on a circle. A similar result is true for the group $SU(N)$, but the fermions must be modded out by the center of mass coordinate. |
| id | cern-247680 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 1993 |
| record_format | invenio |
| spelling | cern-2476802023-03-14T19:27:30Zdoi:10.1016/0370-2693(93)90504-Bhttp://cds.cern.ch/record/247680engMinahan, Joseph A.Polychronakos, Alexios P.Equivalence of two-dimensional QCD and the c = 1 matrix modelParticle Physics - TheoryWe consider two dimensional QCD with the spatial dimension compactified to a circle. We show that the states in the theory consist of interacting strings that wind around the circle and derive the Hamiltonian for this theory in the large $N$ limit, complete with interactions. Mapping the winding states into momentum states, we express this Hamiltonian in terms of a continuous field. For a $U(N)$ gauge group with a background source of Wilson loops, we recover the collective field Hamiltonian found by Das and Jevicki for the $c=1$ matrix model, except the spatial coordinate is on a circle. We then proceed to show that two dimensional QCD with a $U(N)$ gauge group can be reduced to a one- dimensional unitary matrix model and is hence equivalent to a theory of $N$ free nonrelativistic fermions on a circle. A similar result is true for the group $SU(N)$, but the fermions must be modded out by the center of mass coordinate.We consider two dimensional QCD with the spatial dimension compactified to a circle. We show that the states in the theory consist of interacting strings that wind around the circle and derive the Hamiltonian for this theory in the large $N$ limit, complete with interactions. Mapping the winding states into momentum states, we express this Hamiltonian in terms of a continuous field. For a $U(N)$ gauge group with a background source of Wilson loops, we recover the collective field Hamiltonian found by Das and Jevicki for the $c=1$ matrix model, except the spatial coordinate is on a circle. We then proceed to show that two dimensional QCD with a $U(N)$ gauge group can be reduced to a one- dimensional unitary matrix model and is hence equivalent to a theory of $N$ free nonrelativistic fermions on a circle. A similar result is true for the group $SU(N)$, but the fermions must be modded out by the center of mass coordinate.We consider two-dimensional QCD with the spatial dimension compactified to a circle. We show that the states in the theory consist of interacting strings that wind around the circle and derive the Hamiltonian for this theory in the large N limit, complete with interactions. Mapping the winding states into momentum states, we express this Hamiltonian in terms of a continuous field. For a U( N ) gauge with a background source of Wilson loops, we recover the collective field Hamiltonian found by Das and Jevicki for the c = 1 matrix model, except the spatial coordinate is on a circle. We then proceed to show that two-dimensional QCD with a U( N ) gauge group can be reduced to a one-dimensional unitary matrix model and is hence equivalent to a theory of N free nonrelativistic fermions on a circle. A similar result is true for the group SU( N ), but the fermions must be modded out by the center of mass coordinate.hep-th/9303153CERN-TH-6843-93UVA-HET-93-02CERN-TH-6843-93UVA-HET-93-02oai:cds.cern.ch:2476801993 |
| spellingShingle | Particle Physics - Theory Minahan, Joseph A. Polychronakos, Alexios P. Equivalence of two-dimensional QCD and the c = 1 matrix model |
| title | Equivalence of two-dimensional QCD and the c = 1 matrix model |
| title_full | Equivalence of two-dimensional QCD and the c = 1 matrix model |
| title_fullStr | Equivalence of two-dimensional QCD and the c = 1 matrix model |
| title_full_unstemmed | Equivalence of two-dimensional QCD and the c = 1 matrix model |
| title_short | Equivalence of two-dimensional QCD and the c = 1 matrix model |
| title_sort | equivalence of two-dimensional qcd and the c = 1 matrix model |
| topic | Particle Physics - Theory |
| url | https://dx.doi.org/10.1016/0370-2693(93)90504-B http://cds.cern.ch/record/247680 |
| work_keys_str_mv | AT minahanjosepha equivalenceoftwodimensionalqcdandthec1matrixmodel AT polychronakosalexiosp equivalenceoftwodimensionalqcdandthec1matrixmodel |