Add to ORKGWe make use of product integrals to provide an unambiguous mathematical representation of Wilson line and Wilson loop operators. Then, drawing upon various properties of product integrals, we discuss such properties of Wilson lines and Wilson loops as approximating them with partial sums, their convergence, and their behavior under gauge transformations. We also obtain a surface product integral representation for the Wilson loop operator. The result can be interpreted as the non-abelian version of Stokes theorem
The non-abelian Stokes theorem for loop variables associated with nontrivial loops (knots and links)...
Null Polygon Wilson Loops in N = 4 SYM can be computed using the Operator Product Expansion in terms...
Compact string expressions are found for nonintersecting Wilson loops in SU(N) Yang-Mills theory on ...
We study the structure of soft gluon corrections to multi-leg scattering amplitudes in a non-Abelian...
We propose an integral formulation of the equations of motion of a large class of field theories whi...
This paper is a revised version of our recent publication Faber et al., Phys. Rev. D62 (2000) 025019...
For a marked surface $\Sigma$ and a semisimple algebraic group $G$ of adjoint type, we study the Wil...
Abstract: We study a complex analogue of a Wilson Loop, defined over a complex curve, in non-Abelian...
Wilson lines are key objects in many QCD calculations. They are parallel transporters of the gauge f...
Wilson lines, being comparators that render non-local operator products gauge invariant, are extensi...
We introduce a notion of a non-abelian loop gauge field defined on points in loop space. For this pu...
We consider polygonal Wilson loops with null edges in conformal gauge theories. We derive an OPE-lik...
We define the Wilson loop observables (WLOs) for pure Chern-Simons models with base manifold M = R3 ...
This thesis is based on the article "Wilson loops in finite Abelian lattice gauge theories" by M. Fo...
The Wilson loop with a wavy line contour is studied using integrable methods. The auxiliary problem ...
The non-abelian Stokes theorem for loop variables associated with nontrivial loops (knots and links)...
Null Polygon Wilson Loops in N = 4 SYM can be computed using the Operator Product Expansion in terms...
Compact string expressions are found for nonintersecting Wilson loops in SU(N) Yang-Mills theory on ...
We study the structure of soft gluon corrections to multi-leg scattering amplitudes in a non-Abelian...
We propose an integral formulation of the equations of motion of a large class of field theories whi...
This paper is a revised version of our recent publication Faber et al., Phys. Rev. D62 (2000) 025019...
For a marked surface $\Sigma$ and a semisimple algebraic group $G$ of adjoint type, we study the Wil...
Abstract: We study a complex analogue of a Wilson Loop, defined over a complex curve, in non-Abelian...
Wilson lines are key objects in many QCD calculations. They are parallel transporters of the gauge f...
Wilson lines, being comparators that render non-local operator products gauge invariant, are extensi...
We introduce a notion of a non-abelian loop gauge field defined on points in loop space. For this pu...
We consider polygonal Wilson loops with null edges in conformal gauge theories. We derive an OPE-lik...
We define the Wilson loop observables (WLOs) for pure Chern-Simons models with base manifold M = R3 ...
This thesis is based on the article "Wilson loops in finite Abelian lattice gauge theories" by M. Fo...
The Wilson loop with a wavy line contour is studied using integrable methods. The auxiliary problem ...
The non-abelian Stokes theorem for loop variables associated with nontrivial loops (knots and links)...
Null Polygon Wilson Loops in N = 4 SYM can be computed using the Operator Product Expansion in terms...
Compact string expressions are found for nonintersecting Wilson loops in SU(N) Yang-Mills theory on ...