Finite energy global well-posedness of the Yang-Mills equations on \(\mathbb{R}^{1+3}\): an approach using the Yang-Mills heat flow
From MaRDI portal
Publication:2354906
DOI10.1215/00127094-3119953zbMath1325.35180arXiv1210.1557OpenAlexW2166643479MaRDI QIDQ2354906
Publication date: 27 July 2015
Published in: Duke Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1210.1557
PDEs in connection with optics and electromagnetic theory (35Q60) Yang-Mills and other gauge theories in quantum field theory (81T13) PDEs in connection with quantum mechanics (35Q40) Yang-Mills and other gauge theories in mechanics of particles and systems (70S15)
Related Items (27)
Small data global existence and decay for relativistic Chern-Simons equations ⋮ Local well-posedness of the coupled Yang-Mills and Dirac system in temporal gauge ⋮ Infinite energy solutions for the \((3+1)\)-dimensional Yang-Mills equation in Lorenz gauge ⋮ On global dynamics of Schrödinger map flows on hyperbolic planes near harmonic maps ⋮ Global well-posedness and scattering of the (4+1)-dimensional Maxwell-Klein-Gordon equation ⋮ Concentration compactness for the critical Maxwell-Klein-Gordon equation ⋮ Stable blowup for the supercritical hyperbolic Yang-Mills equations ⋮ Asymptotic Stability of Harmonic Maps on the Hyperbolic Plane under the Schrödinger Maps Evolution ⋮ A Globally Stable Self-Similar Blowup Profile in Energy Supercritical Yang-Mills Theory ⋮ The hyperbolic Yang-Mills equation in the caloric gauge: local well-posedness and control of energy-dispersed solutions ⋮ On the global behavior of solutions of the Maxwell-Klein-Gordon equations ⋮ On the global dynamics of Yang-Mills-Higgs equations ⋮ The hyperbolic Yang-Mills equation for connections in an arbitrary topological class ⋮ The threshold theorem for the $(4+1)$-dimensional Yang–Mills equation: An overview of the proof ⋮ Low Regularity Well-Posedness for the Yang--Mills System in Fourier--Lebesgue Spaces ⋮ Local well-posedness of Yang-Mills equations in Lorenz gauge below the energy norm ⋮ The threshold conjecture for the energy critical hyperbolic Yang-Mills equation ⋮ Local well-posedness for the \((n + 1)\)-dimensional Yang-Mills and Yang-Mills-Higgs system in temporal gauge ⋮ Yang-Mills measure on the two-dimensional torus as a random distribution ⋮ Global well-posedness for the massive Maxwell-Klein-Gordon equation with small critical Sobolev data ⋮ Lévy Laplacian on manifold and Yang-Mills heat flow ⋮ Global Schrödinger map flows to Kähler manifolds with small data in critical Sobolev spaces: high dimensions ⋮ Null structure and local well-posedness in the energy class for the Yang-Mills equations in Lorenz gauge ⋮ Equivalence of helicity and Euclidean self-duality for gauge fields ⋮ Large data decay of Yang–Mills–Higgs fields on Minkowski and de Sitter spacetimes ⋮ Local well-posedness of the coupled Yang–Mills and Dirac system for low regularity data ⋮ The Yang-Mills heat equation with finite action in three dimensions
Cites Work
- Unnamed Item
- Unnamed Item
- Conditional global regularity of Schrödinger maps: Subthreshold dispersed energy
- Analytic capacity, the Cauchy transform, and non-homogeneous Calderón-Zygmund theory
- Global Schrödinger maps in dimensions \(d\geq 2\): small data in the critical Sobolev spaces
- The Cauchy problem for the Yang-Mills equations
- Every gauge orbit passes inside the Gribov horizon
- Deforming metrics in the direction of their Ricci tensors
- Opérateurs de Calderón-Zygmund, fonctions para-accrétives et interpolation. (Calderón-Zygmund operators, para-accretive functions and interpolation)
- The global existence of Yang-Mills-Higgs fields in 4-dimensional Minkowski space. I. Local existence and smoothness properties
- Connections with \(L^ p \)bounds on curvature
- The Yang-Mills flow in four dimensions
- On the Maxwell-Klein-Gordon equation with finite energy
- Global existence of solutions of the Yang-Mills equations on globally hyperbolic four dimensional Lorentzian manifolds
- Causal geometry of Einstein-vacuum spacetimes with finite curvature flux
- Local well-posedness of the Yang--Mills equation in the temporal gauge below the energy norm
- The \(Tb\)-theorem on non-homogeneous spaces.
- Finite energy solutions of the Yang-Mills equations in \(\mathbb{R}^{3+1}\)
- Smoothing estimates for null forms and applications
- The Yang-Mills heat semigroup on three-manifolds with boundary
- A geometric approach to the Littlewood-Paley theory
- Sharp trace theorems for null hypersurfaces on Einstein metrics with finite curvature flux
- Geometric Renormalization Below the Ground State
- A controlling norm for energy-critical Schrödinger maps
- ON THE WAVE EQUATION WITH QUADRATIC NONLINEARITIES IN THREE SPACE DIMENSIONS
- Anti Self-Dual Yang-Mills Connections Over Complex Algebraic Surfaces and Stable Vector Bundles
- Global solutions of nonlinear hyperbolic equations for small initial data
- On the Yang-Mills heat equation in two and three dimensions.
- On the optimal local regularity for the Yang-Mills equations in ℝ⁴⁺¹
- Space‐time estimates for null forms and the local existence theorem
- Counterexamples to Local Existence for Semi-Linear Wave Equations
- BILINEAR ESTIMATES ON CURVED SPACE–TIMES
- GAUGE CHOICE FOR THE YANG–MILLS EQUATIONS USING THE YANG–MILLS HEAT FLOW AND LOCAL WELL-POSEDNESS IN H1
- Topics in Harmonic Analysis Related to the Littlewood-Paley Theory. (AM-63)
- Harmonic Mappings of Riemannian Manifolds
This page was built for publication: Finite energy global well-posedness of the Yang-Mills equations on \(\mathbb{R}^{1+3}\): an approach using the Yang-Mills heat flow
