In this paper a J. C. C. Nitsche type inequality for polyharmonic mappings between rounded annuli on the Euclidean space Rd is considered. The case of radial biharmonic mappings between annuli on the complex plane and the corresponding inequality is studied in detail
Abstract. Let ρΣ = h(|z|2) be a metric in a Riemann surface Σ, where h is a positive real function. ...
Polyharmonic functions f of in nite order and type on annular regions are systematically studied....
AbstractWe prove Hölder continuity for n/2-harmonic maps from arbitrary subsets of Rn into a sphere....
As long ago as 1962 Nitsche conjectured that a harmonic homeomorphism h: A(r,R) onto-\u3e A(r*, R*) ...
As long ago as 1962 Nitsche conjectured that a harmonic homeomorphism h: A(r,R) onto-\u3e A(r*, R*) ...
AbstractIt is proved that if u is the solution of PDE Δu=f, that maps two annuli on the space R3, th...
The conjecture in question concerns the existence of a harmonic homeomorphism between circular annul...
The conjecture in question concerns the existence of a harmonic homeomorphism between circular annul...
ABSTRACT. In this note it is formulated the J. C. C. Nitsche type conjecture for bi-harmonic mapping...
AbstractWe show that the spaces of harmonic functions with respect to the Poincaré metric in the uni...
© 2018, Springer International Publishing AG, part of Springer Nature. In this article we obtain two...
Abstract. In this paper, we first find an estimate for the range of polyharmonic mappings in the cla...
The object of the paper is to show that if f is a univalent, harmonic mapping of the annulus A(r; 1)...
© 2018 Russian Academy of Sciences (DoM), London Mathematical Society, Turpion Ltd. Functionals whos...
We study polyharmonic ($k$-harmonic) maps between Riemannian manifolds with finite $j$-energies $(j=...
Abstract. Let ρΣ = h(|z|2) be a metric in a Riemann surface Σ, where h is a positive real function. ...
Polyharmonic functions f of in nite order and type on annular regions are systematically studied....
AbstractWe prove Hölder continuity for n/2-harmonic maps from arbitrary subsets of Rn into a sphere....
As long ago as 1962 Nitsche conjectured that a harmonic homeomorphism h: A(r,R) onto-\u3e A(r*, R*) ...
As long ago as 1962 Nitsche conjectured that a harmonic homeomorphism h: A(r,R) onto-\u3e A(r*, R*) ...
AbstractIt is proved that if u is the solution of PDE Δu=f, that maps two annuli on the space R3, th...
The conjecture in question concerns the existence of a harmonic homeomorphism between circular annul...
The conjecture in question concerns the existence of a harmonic homeomorphism between circular annul...
ABSTRACT. In this note it is formulated the J. C. C. Nitsche type conjecture for bi-harmonic mapping...
AbstractWe show that the spaces of harmonic functions with respect to the Poincaré metric in the uni...
© 2018, Springer International Publishing AG, part of Springer Nature. In this article we obtain two...
Abstract. In this paper, we first find an estimate for the range of polyharmonic mappings in the cla...
The object of the paper is to show that if f is a univalent, harmonic mapping of the annulus A(r; 1)...
© 2018 Russian Academy of Sciences (DoM), London Mathematical Society, Turpion Ltd. Functionals whos...
We study polyharmonic ($k$-harmonic) maps between Riemannian manifolds with finite $j$-energies $(j=...
Abstract. Let ρΣ = h(|z|2) be a metric in a Riemann surface Σ, where h is a positive real function. ...
Polyharmonic functions f of in nite order and type on annular regions are systematically studied....
AbstractWe prove Hölder continuity for n/2-harmonic maps from arbitrary subsets of Rn into a sphere....
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