Abstract. It is shown that in four space-time dimensions the compact U(l) lattice gauge theory with general energy function converges to a renormalized free electromagnetic field on the current sector as the lattice spacing approaches zero, provided the coupling constant is sufficiently large. For the Wilson energy function, it is possible, by judicious choice of the Gibbs state, to get convergence for arbitrary coupling strengths. Furthermore, for all but a countable number of values of the coupling constant, the limit exists and is independent of the particular state chosen to define the lattice model. 1
and U(1) parts have weak couplings and can be studied accurately with perturbative methods, the SU(3...
and U(1) parts have weak couplings and can be studied accurately with perturbative methods, the SU(3...
Our earlier analysis of the lattice 4 ~ 4 theory in four dimensions i extended to a neighborhood of ...
The lattice φ$^4$ theory in four space-time dimensions is most likely “trivial”, i.e. its continuum ...
AbstractWe investigate the continuum limit of a compact formulation of the lattice U(1) gauge theory...
The universality of the continuum limit and the applicability of renormalized perturbation theory ar...
Abstract An extensive study of the compact U(1) lattice gauge theory with a higher derivative gauge-...
The continuum limit of a Z 4 gauge plus matter lattice theory is identified with massless scalar and...
A class of gauge-Higgs-Yukawa systems in four dimensions are shown to give non-trivial and well-defi...
We ibvestigate the continuum limit of the gauge-ball spectrum in the four-dimensional pure U(1) latt...
AbstractLinear lattice gauge theory is based on link variables that are arbitrary complex or real N×...
In this article we show convergence of Lattice Gauge Theory with gauge group U(1) in the energy norm...
It is shown that for non-vanishing lattice spacing, conventional infrared power counting conditions ...
Using Monte Carlo simulations, we study the phase diagram of a two-parameter action for a SU (2) lat...
We consider the role that gauge symmetry breaking terms play on the continuum limit of gauge theorie...
and U(1) parts have weak couplings and can be studied accurately with perturbative methods, the SU(3...
and U(1) parts have weak couplings and can be studied accurately with perturbative methods, the SU(3...
Our earlier analysis of the lattice 4 ~ 4 theory in four dimensions i extended to a neighborhood of ...
The lattice φ$^4$ theory in four space-time dimensions is most likely “trivial”, i.e. its continuum ...
AbstractWe investigate the continuum limit of a compact formulation of the lattice U(1) gauge theory...
The universality of the continuum limit and the applicability of renormalized perturbation theory ar...
Abstract An extensive study of the compact U(1) lattice gauge theory with a higher derivative gauge-...
The continuum limit of a Z 4 gauge plus matter lattice theory is identified with massless scalar and...
A class of gauge-Higgs-Yukawa systems in four dimensions are shown to give non-trivial and well-defi...
We ibvestigate the continuum limit of the gauge-ball spectrum in the four-dimensional pure U(1) latt...
AbstractLinear lattice gauge theory is based on link variables that are arbitrary complex or real N×...
In this article we show convergence of Lattice Gauge Theory with gauge group U(1) in the energy norm...
It is shown that for non-vanishing lattice spacing, conventional infrared power counting conditions ...
Using Monte Carlo simulations, we study the phase diagram of a two-parameter action for a SU (2) lat...
We consider the role that gauge symmetry breaking terms play on the continuum limit of gauge theorie...
and U(1) parts have weak couplings and can be studied accurately with perturbative methods, the SU(3...
and U(1) parts have weak couplings and can be studied accurately with perturbative methods, the SU(3...
Our earlier analysis of the lattice 4 ~ 4 theory in four dimensions i extended to a neighborhood of ...
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