Add to ORKGWe prove uniform and tangential approximation theorems for superharmonic functions in abstract harmonic spaces. Our tangential approximation theorem differs from traditional ones by the absence of the so-called long islands condition. The result is new also in the case of the classical potential theory
The work covers the harmonic and superharmonic functions determined by a sub-elliptic equation of th...
In this paper we study asymptotic behavior of $n$-superharmonic functions at isolated singularity us...
We show that we can approximate locally every function with a fractional harmonic function in that v...
AbstractIt is shown how the cone l(U) of superharmonic functions ⩾0 on an open set U in Rn, n ⩾ 3, c...
AbstractLet Ω denote the open strip (−1, 1)×Rn−1, where n⩾2. We completely solve the problem of char...
We study quasi superharmonic functions in Brelot spaces and the relationship between a reduced funct...
summary:In the present paper we study the integral representation of nonnegative finely superharmoni...
A study of quasi superharmonic functions in Brelot spaces is intro-duced. A characterization of quas...
summary:A generalization of Nevanlinna’s First Fundamental Theorem to superharmonic functions on Gre...
We study various boundary and inner regularity questions for p(.)-(super)harmonic functions in Eucli...
Hansen W. Harmonic and superharmonic functions on compact sets. Illinois Journal of Mathematics. 198...
In this paper, the classical theory of spherical harmonics in Rm is extended to superspace using tec...
Hansen W, Netuka I. Jensen Measures in Potential Theory. Potential Analysis. 2012;37(1):79-90.It is ...
Abstract. We establish relations between the existence of the L-superharmonic functions that have co...
rem 2]. Theorem A. If E is a second category subset of [0, 2pi), then there is no harmonic function ...
The work covers the harmonic and superharmonic functions determined by a sub-elliptic equation of th...
In this paper we study asymptotic behavior of $n$-superharmonic functions at isolated singularity us...
We show that we can approximate locally every function with a fractional harmonic function in that v...
AbstractIt is shown how the cone l(U) of superharmonic functions ⩾0 on an open set U in Rn, n ⩾ 3, c...
AbstractLet Ω denote the open strip (−1, 1)×Rn−1, where n⩾2. We completely solve the problem of char...
We study quasi superharmonic functions in Brelot spaces and the relationship between a reduced funct...
summary:In the present paper we study the integral representation of nonnegative finely superharmoni...
A study of quasi superharmonic functions in Brelot spaces is intro-duced. A characterization of quas...
summary:A generalization of Nevanlinna’s First Fundamental Theorem to superharmonic functions on Gre...
We study various boundary and inner regularity questions for p(.)-(super)harmonic functions in Eucli...
Hansen W. Harmonic and superharmonic functions on compact sets. Illinois Journal of Mathematics. 198...
In this paper, the classical theory of spherical harmonics in Rm is extended to superspace using tec...
Hansen W, Netuka I. Jensen Measures in Potential Theory. Potential Analysis. 2012;37(1):79-90.It is ...
Abstract. We establish relations between the existence of the L-superharmonic functions that have co...
rem 2]. Theorem A. If E is a second category subset of [0, 2pi), then there is no harmonic function ...
The work covers the harmonic and superharmonic functions determined by a sub-elliptic equation of th...
In this paper we study asymptotic behavior of $n$-superharmonic functions at isolated singularity us...
We show that we can approximate locally every function with a fractional harmonic function in that v...