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The following pages link to The maximum principle and the Dirichlet problem for Dirac-harmonic maps (Q1949414):

Displaying 21 items.

A maximum principle for generalizations of harmonic maps in Hermitian, affine, Weyl, and Finsler geometry (Q253807) (← links)
Energy estimates for the supersymmetric nonlinear sigma model and applications (Q345038) (← links)
Gradient estimates and Liouville theorems for Dirac-harmonic maps (Q391281) (← links)
Omori-Yau maximum principles, \(V\)-harmonic maps and their geometric applications (Q465479) (← links)
\(F\)-harmonic maps as global maxima (Q480315) (← links)
A global weak solution of the Dirac-harmonic map flow (Q1679690) (← links)
Short time existence of the heat flow for Dirac-harmonic maps on closed manifolds (Q1688771) (← links)
Estimates for solutions of Dirac equations and an application to a geometric elliptic-parabolic problem (Q1731777) (← links)
Regularity for Dirac-harmonic map with Ricci type spinor potential (Q1942233) (← links)
The boundary value problem for Dirac-harmonic maps (Q1949972) (← links)
Boundary value problems for Dirac-harmonic maps and their heat flows (Q2042265) (← links)
Local existence and uniqueness of skew mean curvature flow (Q2043596) (← links)
Energy identity and necklessness for \(\alpha\)-Dirac-harmonic maps into a sphere (Q2048715) (← links)
A mixed elliptic-parabolic boundary value problem coupling a harmonic-like map with a nonlinear spinor (Q2121986) (← links)
Magnetic Dirac-harmonic maps (Q2260498) (← links)
On \textit{VT}-harmonic maps (Q2291466) (← links)
On the evolution of regularized Dirac-harmonic maps from closed surfaces (Q2309619) (← links)
Some aspects of Dirac-harmonic maps with curvature term (Q2348077) (← links)
Uniqueness of Dirac-harmonic maps from a compact surface with boundary (Q2696048) (← links)
The maximum principle and the Yamabe flow (Q2759788) (← links)
Existence and uniqueness of local regular solution to the Schrödinger flow from a bounded domain in \(\mathbb{R}^3\) into \(\mathbb{S}^2\) (Q6109375) (← links)