In this note we present a operator formulation of gauge theories in a quantum phase space which is specified by a operator algebra. For simplicity we work with the Heisenberg algebra. We introduce the notion of the derivative (transport) and Wilson line (parallel transport) which enables us to construct a gauge theory in a simple way. We illustrate the formulation by a discussion of the Higgs mechanism and comment on the large N masterfield
We construct a U(1) gerbe with a connection over a finite-dimensional, classical phase space {\bb P}...
Koopman and von Neumann (KvN) extended the Liouville equation by introducing a phase space function ...
A Lie algebraic approach to the unitary transformations in Weyl quantization is discussed. This appr...
In this Letter we present a operator formulation of gauge theories in a quantum phase space which is...
In this Letter we present a operator formulation of gauge theories in a quantum phase space which is...
Schrõdinger equations in phase space are much discussed and questioned in quantum physics and chemis...
We construct a U(1) gerbe with a connection over a finite-dimensional, classical phase space {\bb P}...
We first introduce the Wigner-Weyl-Moyal formalism for a theory whose phase-space is an arbitrary Li...
We construct a U(1) gerbe with a connection over a finite-dimensional, classical phase space P. The ...
In this note we discuss local gauge-invariant operators in noncommutative gauge theories. Inspired b...
A fibre bundle viewpoint of gauge field theories is reviewed with focus on a possible quantum interp...
A fibre bundle viewpoint of gauge field theories is reviewed with focus on a possible quantum interp...
In this note we discuss local gauge-invariant operators in noncommutative gauge theories. Inspired b...
A hidden gauge theory structure of quantum mechanics which is invisible in its conventional formulat...
In this note we discuss local gauge-invariant operators in noncommutative gauge theories. Inspired b...
We construct a U(1) gerbe with a connection over a finite-dimensional, classical phase space {\bb P}...
Koopman and von Neumann (KvN) extended the Liouville equation by introducing a phase space function ...
A Lie algebraic approach to the unitary transformations in Weyl quantization is discussed. This appr...
In this Letter we present a operator formulation of gauge theories in a quantum phase space which is...
In this Letter we present a operator formulation of gauge theories in a quantum phase space which is...
Schrõdinger equations in phase space are much discussed and questioned in quantum physics and chemis...
We construct a U(1) gerbe with a connection over a finite-dimensional, classical phase space {\bb P}...
We first introduce the Wigner-Weyl-Moyal formalism for a theory whose phase-space is an arbitrary Li...
We construct a U(1) gerbe with a connection over a finite-dimensional, classical phase space P. The ...
In this note we discuss local gauge-invariant operators in noncommutative gauge theories. Inspired b...
A fibre bundle viewpoint of gauge field theories is reviewed with focus on a possible quantum interp...
A fibre bundle viewpoint of gauge field theories is reviewed with focus on a possible quantum interp...
In this note we discuss local gauge-invariant operators in noncommutative gauge theories. Inspired b...
A hidden gauge theory structure of quantum mechanics which is invisible in its conventional formulat...
In this note we discuss local gauge-invariant operators in noncommutative gauge theories. Inspired b...
We construct a U(1) gerbe with a connection over a finite-dimensional, classical phase space {\bb P}...
Koopman and von Neumann (KvN) extended the Liouville equation by introducing a phase space function ...
A Lie algebraic approach to the unitary transformations in Weyl quantization is discussed. This appr...
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