Vacuum condensate of mass dimension 2 as the origin of mass gap and quark confinement
From MaRDI portal
Publication:5940370
DOI10.1016/S0370-2693(01)00817-6zbMath0971.81077arXivhep-th/0105299MaRDI QIDQ5940370
Publication date: 8 August 2001
Published in: Physics Letters. B (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/hep-th/0105299
Yang-Mills and other gauge theories in quantum field theory (81T13) Quantization in field theory; cohomological methods (81T70)
Related Items (21)
A determination of and the non-perturbative vacuum energy of Yang-Mills theory in the Landau gauge ⋮ Quark masses and the meson spectrum: a holographic approach ⋮ Chiral and deconfining phase transitions from holographic QCD study ⋮ Spin-charge separation, conformal covariance and the \(\text{SU}(2)\) Yang-Mills theory ⋮ Reformulations of Yang-Mills theories with space-time tensor fields ⋮ Dimension-two vacuum condensates in gauge-invariant theories ⋮ Gauge invariance of the dimension-two condensate in the Yang-Mills theory ⋮ NO-WALL HOLOGRAPHIC MODEL FOR QCD ⋮ Electrodynamics in the 't Hooft gauge, a covariant operator approach ⋮ Gluon-ghost condensate of mass dimension 2 in the Curci--Ferrari gauge. ⋮ Noncommutative gauge theories and gauge invariance of dimension two condensate in Yang-Mills theory ⋮ Yang-Mills theory in Landau gauge as a liquid crystal ⋮ The gluon condensate in an effective SU(2) Yang–Mills theory ⋮ GINZBURG–LANDAU EQUATION FROM SU(2) GAUGE FIELD THEORY ⋮ Three-loop HTL gluon thermodynamics at intermediate coupling ⋮ Renormalization properties of the mass operator \(A^a_{\mu}A^a_{\mu}\) in three-dimensional Yang-Mills theories in the Landau gauge ⋮ On the dynamical mass generation in confining Yang-Mills theories ⋮ Renormalizability of pure 𝒩 = 1 super-Yang–Mills in the Wess–Zumino gauge in the presence of the local composite operators A2 and λ̄λ ⋮ PHANTOM ENERGY FROM GRADED ALGEBRAS ⋮ Three loop \(\overline{MS}\) renormalization of the Curci-Ferrari model and the dimension two BRST invariant composite operator in QCD ⋮ The `BRST-invariant' condensate of dimension two in QCD
Cites Work
- Emerging phenomenology of \(\langle\)A\(_{min}^2\rangle\)
- A FORMULATION OF THE YANG–MILLS THEORY AS A DEFORMATION OF A TOPOLOGICAL FIELD THEORY BASED ON THE BACKGROUND FIELD METHOD AND QUARK CONFINEMENT PROBLEM
- Another BRS Transformation
- Renormalizable Abelian-Projected Effective Gauge Theory Derived from Quantum Chromodynamics
- The non-perturbative groundstate of QCD and the local composite operator \(A^2_{\mu}\)
This page was built for publication: Vacuum condensate of mass dimension 2 as the origin of mass gap and quark confinement
