Add to ORKGrem 2]. Theorem A. If E is a second category subset of [0, 2pi), then there is no harmonic function h on C such that r−µh(reiθ) → + ∞ as r → + ∞ fo
Abstract. Let T be the set of vertices of a tree. We assume that the Green function is finite and G(...
In this paper, we are going to state and prove the maximum principle for the subharmonic functions c...
We prove uniform and tangential approximation theorems for superharmonic functions in abstract harmo...
Gardiner SJ, Hansen W. Boundary sets where harmonic functions may become infinite. Mathematische Ann...
Abstract. Consider harmonic functions on the upper-half plane R2+ = f(x; y)j y> 0g satisfying the...
In general, superbiharmonic functions do not satisfy a mini-mum principle like superharmonic functio...
[[abstract]]Let h be a harmonic function on R(superscript n), n≥2. Then there exists on entire funct...
Let $\Psi_v$ be the class of harmonic functions in the unit disk or unit ball in ${\mathsf R}^m$ whi...
Abstract. Let u1, 1t2t...ru * be nonconstant uniform limits (on compact subsets) of,4 harmonic funct...
© 2017, Pleiades Publishing, Ltd.Strict superharmonicity of generalized reduced module as a function...
We study how adding certain poles to rational harmonic functions of the form R(z) − z, with R(z) ra...
Hansen W, Nikolov N. One-radius results for supermedian functions on R-d, d <= 2. Mathematische A...
AbstractLet N be the nontangential maximal function of a function u harmonic in the Euclidean half-s...
We study various boundary and inner regularity questions for p(.)-(super)harmonic functions in Eucli...
A function u(z) dened in the complex plane is called -subharmonic if it may be represented as a dier...
Abstract. Let T be the set of vertices of a tree. We assume that the Green function is finite and G(...
In this paper, we are going to state and prove the maximum principle for the subharmonic functions c...
We prove uniform and tangential approximation theorems for superharmonic functions in abstract harmo...
Gardiner SJ, Hansen W. Boundary sets where harmonic functions may become infinite. Mathematische Ann...
Abstract. Consider harmonic functions on the upper-half plane R2+ = f(x; y)j y> 0g satisfying the...
In general, superbiharmonic functions do not satisfy a mini-mum principle like superharmonic functio...
[[abstract]]Let h be a harmonic function on R(superscript n), n≥2. Then there exists on entire funct...
Let $\Psi_v$ be the class of harmonic functions in the unit disk or unit ball in ${\mathsf R}^m$ whi...
Abstract. Let u1, 1t2t...ru * be nonconstant uniform limits (on compact subsets) of,4 harmonic funct...
© 2017, Pleiades Publishing, Ltd.Strict superharmonicity of generalized reduced module as a function...
We study how adding certain poles to rational harmonic functions of the form R(z) − z, with R(z) ra...
Hansen W, Nikolov N. One-radius results for supermedian functions on R-d, d <= 2. Mathematische A...
AbstractLet N be the nontangential maximal function of a function u harmonic in the Euclidean half-s...
We study various boundary and inner regularity questions for p(.)-(super)harmonic functions in Eucli...
A function u(z) dened in the complex plane is called -subharmonic if it may be represented as a dier...
Abstract. Let T be the set of vertices of a tree. We assume that the Green function is finite and G(...
In this paper, we are going to state and prove the maximum principle for the subharmonic functions c...
We prove uniform and tangential approximation theorems for superharmonic functions in abstract harmo...