Rigorous results on the existence of dyon solutions
Journal Article
·
· Phys. Rev. Lett.; (United States)
The existence of finite-energy dyon solutions satisfying the Julia-Zee Ansatz and the generalization of SU(N) gauge groups is rigorously established. It is also proved that the solutions are real analytic on (0,infinity) and infinitely differentiable at zero. The proof is based on an abstract theorem that allows one to study constrained variational problems without introducing Lagrange multipliers.
- Research Organization:
- Yeshiva University, New York, New York 10033
- OSTI ID:
- 5238373
- Journal Information:
- Phys. Rev. Lett.; (United States), Journal Name: Phys. Rev. Lett.; (United States) Vol. 44:20; ISSN PRLTA
- Country of Publication:
- United States
- Language:
- English
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Related Subjects
645400* -- High Energy Physics-- Field Theory
72 PHYSICS OF ELEMENTARY PARTICLES AND FIELDS
DYONS
ELEMENTARY PARTICLES
FUNCTIONS
GAUGE INVARIANCE
INVARIANCE PRINCIPLES
LAGRANGIAN FUNCTION
LIE GROUPS
MATHEMATICAL SPACE
MINKOWSKI SPACE
POSTULATED PARTICLES
SPACE
SU GROUPS
SU-2 GROUPS
SYMMETRY GROUPS
YANG-MILLS THEORY
72 PHYSICS OF ELEMENTARY PARTICLES AND FIELDS
DYONS
ELEMENTARY PARTICLES
FUNCTIONS
GAUGE INVARIANCE
INVARIANCE PRINCIPLES
LAGRANGIAN FUNCTION
LIE GROUPS
MATHEMATICAL SPACE
MINKOWSKI SPACE
POSTULATED PARTICLES
SPACE
SU GROUPS
SU-2 GROUPS
SYMMETRY GROUPS
YANG-MILLS THEORY