We elaborate the idea that matrix gauge theories provide a natural framework to describe identical particles. After demonstrating the general prescription, we study an exactly solvable harmonic oscillator type gauged matrix model. We show the model gives a generalization of the Sutherland system where the strength of the inverse square potential is not fixed but dynamical bounded by below
We introduce a variational method for calculating dispersion relations of translation invariant (1 +...
To a graded finite-rank matrix factorisation of the difference of two homogeneous potentials one can...
In this note we discuss local gauge-invariant operators in noncommutative gauge theories. Inspired b...
Starting from the quantum theory of identical particles, we show how to define a classical mechanics...
We analyze Susskind's proposal of applying the non-commutative Chern-Simons theory to the quantum Ha...
We study a quantum system of p commuting matrices and find that such a quantum system requires an ex...
The $B_N$-type Calogero-Sutherland-Moser system in one-dimension is shown to be equivalent to a set ...
I address the problem of explaining why wave functions for identical particles must be either symmet...
We clarify the issue of entanglement between identical particles. It needs to be defined for a given...
We show how the fields and particles of the standard model can be naturally realized in noncommutati...
The U(N) Maxwell-Chern-Simons matrix gauge theory is proposed as an extension of Susskind's noncommu...
We introduce a variational method for calculating dispersion relations of translation invariant (1+1...
According to our understanding of the everyday physical world, observable phenomena are underpinned ...
The S-matrix is known to be independent of the gauge fixing parameter to all orders in perturbation ...
For a specific exactly solvable 2 by 2 matrix model with a PT-symmetric Hamiltonian possessing a rea...
We introduce a variational method for calculating dispersion relations of translation invariant (1 +...
To a graded finite-rank matrix factorisation of the difference of two homogeneous potentials one can...
In this note we discuss local gauge-invariant operators in noncommutative gauge theories. Inspired b...
Starting from the quantum theory of identical particles, we show how to define a classical mechanics...
We analyze Susskind's proposal of applying the non-commutative Chern-Simons theory to the quantum Ha...
We study a quantum system of p commuting matrices and find that such a quantum system requires an ex...
The $B_N$-type Calogero-Sutherland-Moser system in one-dimension is shown to be equivalent to a set ...
I address the problem of explaining why wave functions for identical particles must be either symmet...
We clarify the issue of entanglement between identical particles. It needs to be defined for a given...
We show how the fields and particles of the standard model can be naturally realized in noncommutati...
The U(N) Maxwell-Chern-Simons matrix gauge theory is proposed as an extension of Susskind's noncommu...
We introduce a variational method for calculating dispersion relations of translation invariant (1+1...
According to our understanding of the everyday physical world, observable phenomena are underpinned ...
The S-matrix is known to be independent of the gauge fixing parameter to all orders in perturbation ...
For a specific exactly solvable 2 by 2 matrix model with a PT-symmetric Hamiltonian possessing a rea...
We introduce a variational method for calculating dispersion relations of translation invariant (1 +...
To a graded finite-rank matrix factorisation of the difference of two homogeneous potentials one can...
In this note we discuss local gauge-invariant operators in noncommutative gauge theories. Inspired b...
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