Add to ORKGThe Witten-Veneziano relation between the topological susceptibility of pure gauge theories without fermions and the main contribution of the complete theory and the corresponding formula of Seiler and Stamatescu with the so-called contact term are discussed for the Schwinger model on a circle. Using the (Euclidean) path integral and the canonical (Hamiltonian) approaches at finite temperatures we demonstrate that both formulae give the same result in the limit of infinite volume and (or) zero temperature
Gauge theories embedded into higher-dimensional spaces with certain topologies acquire inductance te...
We study the θ dependence of the continuum limit of 2D UðNÞ gauge theories defined on compact manif...
Gauge theories embedded into higher-dimensional spaces with certain topologies acqui...
The Witten-Veneziano relation between the topological susceptibility of puregauge theories without f...
The Witten–Veneziano relation between the topological susceptibility of pure gauge theories without ...
We discuss and propose the minimal generalization of the Witten-Veneziano relation to finite tempera...
We solve the massless Schwinger model exactly in Hamiltonian formalism on a circle. We construct ph...
在這篇論文中,我們應用最佳手則對稱之新費米場作用量(optimal domain-wall fermion),研究Schwinger模型上的拓樸率。藉由拓樸率的定義,我們可以利用整體拓樸荷(globa...
An investigation of the topological susceptibility, which can be related to the mass of the η ′ meso...
We construct the fermion zero-mode for arbitrary charge one SU(n) calorons with non-trivial holonomy...
The classical and quantum aspects of the Schwinger model on the torus are considered. First we find ...
In the framework of the Euclidean path integral approach we derive the exact formula for the genera...
In this paper, we point out that the analytic solution of the two dimensional U(1) gauge theory, on ...
The topological susceptibility,x(4), following the work of Witten and Veneziano, plays a key role in...
We study the supersymmetric vacua of the Veneziano-Wosiek model in sectors with fermion number F=2, ...
Gauge theories embedded into higher-dimensional spaces with certain topologies acquire inductance te...
We study the θ dependence of the continuum limit of 2D UðNÞ gauge theories defined on compact manif...
Gauge theories embedded into higher-dimensional spaces with certain topologies acqui...
The Witten-Veneziano relation between the topological susceptibility of puregauge theories without f...
The Witten–Veneziano relation between the topological susceptibility of pure gauge theories without ...
We discuss and propose the minimal generalization of the Witten-Veneziano relation to finite tempera...
We solve the massless Schwinger model exactly in Hamiltonian formalism on a circle. We construct ph...
在這篇論文中,我們應用最佳手則對稱之新費米場作用量(optimal domain-wall fermion),研究Schwinger模型上的拓樸率。藉由拓樸率的定義,我們可以利用整體拓樸荷(globa...
An investigation of the topological susceptibility, which can be related to the mass of the η ′ meso...
We construct the fermion zero-mode for arbitrary charge one SU(n) calorons with non-trivial holonomy...
The classical and quantum aspects of the Schwinger model on the torus are considered. First we find ...
In the framework of the Euclidean path integral approach we derive the exact formula for the genera...
In this paper, we point out that the analytic solution of the two dimensional U(1) gauge theory, on ...
The topological susceptibility,x(4), following the work of Witten and Veneziano, plays a key role in...
We study the supersymmetric vacua of the Veneziano-Wosiek model in sectors with fermion number F=2, ...
Gauge theories embedded into higher-dimensional spaces with certain topologies acquire inductance te...
We study the θ dependence of the continuum limit of 2D UðNÞ gauge theories defined on compact manif...
Gauge theories embedded into higher-dimensional spaces with certain topologies acqui...