On a low energy bound in a class of chiral field theories with solitons
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Publication:4832711
DOI10.1063/1.1488671zbMath1060.81555arXivhep-th/0202146OpenAlexW3101311838MaRDI QIDQ4832711
Publication date: 14 December 2004
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/hep-th/0202146
Related Items (5)
Investigation of the Nicole model ⋮ Energy splitting, substantial inequality, and minimization for the Faddeev and Skyrme models ⋮ New Faddeev-niemi-type variables for the static Yang-Mills theory ⋮ Quark confinement: dual superconductor picture based on a non-abelian Stokes theorem and reformulations of Yang-Mills theory ⋮ GAUGE THEORY OF FADDEEV–SKYRME FUNCTIONALS
Cites Work
- Hopf solitons onS3and3
- Partially Dual Variables in SU(2) Yang-Mills Theory
- Minimum Value for c in the Sobolev Inequality $\| {\phi ^3 } \|\leqq c\| {\nabla \phi } \|^3 $
- THE COHOMOLOGY RING OF G/T
- Partial duality in \(\text{SU}(N)\) Yang-Mills theory.
- An effective action for monopoles and knot solitons in Yang-Mills theory
- Infrared Yang-Mills theory as a spin system. A lattice approach
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