The aim of this paper is to show that Liouville type property is a sufficient and necessary condition for the regularity of weak solutions of nonlinear elliptic systems of the higher order.

A note on regular points for solutions of nonlinear elliptic systems

Josef Daněček; Eugen Viszus — 1996

Archivum Mathematicum

It is shown in this paper that gradient of vector valued function $u (x),$ solution of a nonlinear elliptic system, cannot be too close to a straight line without $u (x)$ being regular.

A note on regularity for nonlinear elliptic systems

Josef Daněček; Eugen Viszus — 2000

Archivum Mathematicum

The $L^{2, λ}$ - regularity of the gradient of weak solutions to nonlinear elliptic systems is proved.

On Liouville theorem and Hölder continuity of weak solutions to some quasilinear elliptic systems of higher order

Lubomír Balanda; Eugen Viszus — 1992

Mathematica Bohemica

The aim of this paper is to show that the Liouville-type property is a sufficient and necessary condition for the regularity of weak solutions of quasilinear elliptic systems of higher orders.

Regularity of minima of variational integrals

Josef Daněček; Eugen Viszus — 1999

Mathematica Slovaca

On Hölder regularity for vector-valued minimizers of quasilinear functionals

Josef Daněček; Eugen Viszus — 2010

Mathematica Bohemica

We discuss the interior Hölder everywhere regularity for minimizers of quasilinear functionals of the type $𝒜 (u; Ω) = \int_{Ω} A_{i j}^{α β} (x, u) D_{α} u^{i} D_{β} u^{j} d x$ whose gradients belong to the Morrey space $L^{2, n - 2} (Ω, ℝ^{n N})$ .

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