Add to ORKGABSTRACT: In this paper we shall study the growth and asymptotic behaviour of sub-harmonic functions of order greater than half near Pólya peaks. In some way our result is a generalization of Paley’s conjecture. The method employed is a non-asymptotic via a normal family of subharmonic functions
In this paper we present some results on the asymptotic growth behavior of periodic paravector value...
In this note we present mean value characterizations of subharmonic functions related to linear seco...
AbstractIn this paper we prove two theorems of Littlewood–Paley type for M-subharmonic functions. As...
In this paper we study the asymptotic behavior of functions that are extremal to the inequality intr...
We study the relation between the growth of a subharmonic functionin the half space Rn+1 + and the s...
We study the relation between the growth of a subharmonic func-tion in the half space Rn+1+ and the ...
The theory of subharmonic functions of finite order is based to a considerable extent on integral fo...
There are ten chapters in this dissertation, which focuses on nine contents: growth estimates for a ...
A class of -potentials represented as the sum of modified Green potential and modified Poisson int...
AbstractWe prove that if f is a quasiregular harmonic function, then there exists a number q∈(0,1) s...
In this paper, we are going to state and prove the maximum principle for the subharmonic functions c...
AbstractLetΩbe an open subset ofRd(d⩾2). Givenx∈Ω, a Jensenmeasureforxis a Borel probability measure...
Abstract. We study the growth of functions which are harmonic in any number of variables. The result...
AbstractEstimates are obtained for the growth of subharmonic and analytic functions in the region be...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/135520/1/plms0404.pd
In this paper we present some results on the asymptotic growth behavior of periodic paravector value...
In this note we present mean value characterizations of subharmonic functions related to linear seco...
AbstractIn this paper we prove two theorems of Littlewood–Paley type for M-subharmonic functions. As...
In this paper we study the asymptotic behavior of functions that are extremal to the inequality intr...
We study the relation between the growth of a subharmonic functionin the half space Rn+1 + and the s...
We study the relation between the growth of a subharmonic func-tion in the half space Rn+1+ and the ...
The theory of subharmonic functions of finite order is based to a considerable extent on integral fo...
There are ten chapters in this dissertation, which focuses on nine contents: growth estimates for a ...
A class of -potentials represented as the sum of modified Green potential and modified Poisson int...
AbstractWe prove that if f is a quasiregular harmonic function, then there exists a number q∈(0,1) s...
In this paper, we are going to state and prove the maximum principle for the subharmonic functions c...
AbstractLetΩbe an open subset ofRd(d⩾2). Givenx∈Ω, a Jensenmeasureforxis a Borel probability measure...
Abstract. We study the growth of functions which are harmonic in any number of variables. The result...
AbstractEstimates are obtained for the growth of subharmonic and analytic functions in the region be...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/135520/1/plms0404.pd
In this paper we present some results on the asymptotic growth behavior of periodic paravector value...
In this note we present mean value characterizations of subharmonic functions related to linear seco...
AbstractIn this paper we prove two theorems of Littlewood–Paley type for M-subharmonic functions. As...
![Asymptotic Behavior for a Class of Modified <inline-formula> <graphic file="1029-242X-2010-647627-i1.gif"/></inline-formula>-Potentials in a Half Space](/en/item/26112971/Asymptotic-Behavior-for-a-Class-of-Modified-lessinline-formulagreater-lessgraphic-file"1029-242X-2010-647627-i1.gif"greaterlessinline-formulagreater-Potentials-in-a-Half-Space){kind=link}