![Gradient Estimates for Weak Solutions of <inline-formula> <graphic file="1029-242X-2010-685046-i1.gif"/></inline-formula>-Harmonic Equations](/en/item/26979339/Gradient-Estimates-for-Weak-Solutions-of-lessinline-formulagreater-lessgraphic-file"1029-242X-2010-685046-i1.gif"greaterlessinline-formulagreater-Harmonic-Equations){kind=link}
Add to ORKGThis article presents L^p estimates for the gradient of p-harmonic maps. Since the system satisfies a natural growth condition, it is difficult to use standard elliptic estimates. We use spherical coordinates to convert the system into another system with angle functions. The new system can be estimate by the standard elliptic technique
In this paper we generalize classical L-q,q >= p, estimates of the gradient to the Orlicz space f...
A periodic connection is constructed for a double well potential defined in the plane. This solution...
We obtain gradient estimates in Orlicz spaces for weak solutions of -Harmonic Equations under the ...
This article is concerned with L^{p(x)} estimates of the gradient of p(x)-harmonic maps. It is know...
J. oflnequal. & Appl., 1999, Vol. 3, pp. 109-125 Reprints available directly from the publisher ...
We extend the p-harmonic approximation lemma proved by Duzaar and Mingione for p-harmonic functions...
We establish existence and regularity for a solution of the evolution problem associated to p-harmon...
We characterize all local phase-portraits of the finite and infinite singular points of the gradient...
In this paper we obtain local L-q, q >= p, gradient estimates for weak solutions of elliptic equa...
In this paper we generalize gradient estimates in L-p space to Orlicz space for weak solutions of el...
AbstractDerivative formulae for heat semigroups are used to give gradient estimates for harmonic fun...
Derivative formulae for heat semigroups are used to give gradient estimates for harmonic functions o...
Abstract. We consider elliptic problems with non standard growth conditions whose most prominent mod...
summary:Let $X=(X_1,X_2,\dots ,X_q)$ be a system of vector fields satisfying the Hör\-man\-der condi...
Breit D, Cianchi A, Diening L, Kuusi T, Schwarzacher S. Pointwise Calderón-Zygmund gradient estimate...
In this paper we generalize classical L-q,q >= p, estimates of the gradient to the Orlicz space f...
A periodic connection is constructed for a double well potential defined in the plane. This solution...
We obtain gradient estimates in Orlicz spaces for weak solutions of -Harmonic Equations under the ...
This article is concerned with L^{p(x)} estimates of the gradient of p(x)-harmonic maps. It is know...
J. oflnequal. & Appl., 1999, Vol. 3, pp. 109-125 Reprints available directly from the publisher ...
We extend the p-harmonic approximation lemma proved by Duzaar and Mingione for p-harmonic functions...
We establish existence and regularity for a solution of the evolution problem associated to p-harmon...
We characterize all local phase-portraits of the finite and infinite singular points of the gradient...
In this paper we obtain local L-q, q >= p, gradient estimates for weak solutions of elliptic equa...
In this paper we generalize gradient estimates in L-p space to Orlicz space for weak solutions of el...
AbstractDerivative formulae for heat semigroups are used to give gradient estimates for harmonic fun...
Derivative formulae for heat semigroups are used to give gradient estimates for harmonic functions o...
Abstract. We consider elliptic problems with non standard growth conditions whose most prominent mod...
summary:Let $X=(X_1,X_2,\dots ,X_q)$ be a system of vector fields satisfying the Hör\-man\-der condi...
Breit D, Cianchi A, Diening L, Kuusi T, Schwarzacher S. Pointwise Calderón-Zygmund gradient estimate...
In this paper we generalize classical L-q,q >= p, estimates of the gradient to the Orlicz space f...
A periodic connection is constructed for a double well potential defined in the plane. This solution...
We obtain gradient estimates in Orlicz spaces for weak solutions of -Harmonic Equations under the ...