Multichain-type solutions for Hamiltonian systems.
On Instability of Yang-Mills Connections.
Optimal control of variational inequality with applications to axisymmetric shells
The optimal control problem of variational inequality with applications to axisymmetric shells is discussed. First an existence result for the solution of the optimal control problem is given. Next is presented the formulation of first order necessary conditionas of optimality for the control problem governed by a variational inequality with its coefficients as control variables.
The Dirichlet problem for the equation of prescribed mean curvature
The structure and limiting behavior of locally optimal minimizers
Topologically nondegenerate functions
Two remarks about the connection of Jacobi and Neumann integrable systems.
Verzweigungspunkte von H-Flächen. I.
Verzweigungspunkte von H-Flächen. II .
Yang-Mills bar connections over compact Kähler manifolds
In this note we introduce a Yang-Mills bar equation on complex vector bundles provided with a Hermitian metric over compact Hermitian manifolds. According to the Koszul-Malgrange criterion any holomorphic structure on can be seen as a solution to this equation. We show the existence of a non-trivial solution to this equation over compact Kähler manifolds as well as a short time existence of a related negative Yang-Mills bar gradient flow. We also show a rigidity of holomorphic connections among...
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