Geometric Techniques in Gauge Theories: Proceedings of the Fifth Scheveningen Conference on Differential Equations, The Netherlands, August 23-28, 1981R. Martini, E.M. de Jager |
Contents
1 | |
7 | |
Invited speakers | 85 |
University of Utrecht | 107 |
E F Corrigan Department of Mathematics | 160 |
of Theoretical Physics 16 1977561565 | 179 |
G Eastwood Mathematical Institute | 190 |
12 K Uhlenbeck Removable singularities in YangMills fields | 198 |
P Molino Institut de mathématiques | 219 |
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Common terms and phrases
abelian Cartan classical complex condition connection coordinates corresponding cross-section curvature defined denotes derivative differential equations differential forms differential geometry Ehresmann electrodynamics energy Euclidean fiber bundle fiber space field equations finite flux fluxtubes foliation formula function gauge fields gauge theories gauge transformation global gravitation Hence Hermann Higgs horizontal instanton integral interactions invariant isomorphism Lagrangian Lett Lie algebra Lie group linear magnetic charge magnetic monopoles manifold massless Math mathematical matrix Maxwell Maxwell's equations metric non-abelian nonlinear obtain one-forms open subset operator Pfaffian system Phys physics principal bundle pseudopotential quantization quantum field theory quantum mechanics quantum theory quarks Riemannian satisfied scalar self-dual soliton solution space-time structure group submanifold subspaces symmetry tangent tensor Theorem topological twistor two-form V₁ V₂ vector bundle vector fields vector space Yang-Mills field Λω μν