AbstractIn this paper we prove two theorems of Littlewood–Paley type for M-subharmonic functions. As applications we get a stronger version of an inequality of Littlewood–Paley type for M-harmonic functions and a sufficient condition for the existence of admissible limits of M-subharmonic functions
AbstractWe prove that if f is a quasiregular harmonic function, then there exists a number q∈(0,1) s...
We prove that if u is an $L^p$-subharmonic function defined outside a compact set in $\mathbb{R}^n$...
Abstract: We recall some of the existing subharmonicity results of separately subharmonic functions,...
We characterize those compact sets for which the Dirichlet problem has a solution within the class o...
In this paper is considered whether the function belongs to the class of m-subharmonic and strongly...
Domar has given a condition that ensures the existence of the largest subharmonic minorant of a give...
We prove a converse of the mean value property for superharmonic and subharmonic functions. The case...
In this paper we give a definition of A(z)-subharmonic functions and consider some properties of A(z...
We show that the spaces of $A-m$-subharmonic and $B-m$-subharmonic functions differ in sufficiently ...
International audienceWe prove a converse of the mean value property for superharmonic and subharmon...
In this paper we presents some Liouville type theorems for solutions of differential inequalities in...
By using quasi-Banach techniques as key ingredient we prove Poincaré- and Sobolev- type inequalities...
ABSTRACT: In this paper we shall study the growth and asymptotic behaviour of sub-harmonic functions...
Inequalities between volume mean-values and spherical mean-values of functions are closely related t...
In this note we present mean value characterizations of subharmonic functions related to linear seco...
AbstractWe prove that if f is a quasiregular harmonic function, then there exists a number q∈(0,1) s...
We prove that if u is an $L^p$-subharmonic function defined outside a compact set in $\mathbb{R}^n$...
Abstract: We recall some of the existing subharmonicity results of separately subharmonic functions,...
We characterize those compact sets for which the Dirichlet problem has a solution within the class o...
In this paper is considered whether the function belongs to the class of m-subharmonic and strongly...
Domar has given a condition that ensures the existence of the largest subharmonic minorant of a give...
We prove a converse of the mean value property for superharmonic and subharmonic functions. The case...
In this paper we give a definition of A(z)-subharmonic functions and consider some properties of A(z...
We show that the spaces of $A-m$-subharmonic and $B-m$-subharmonic functions differ in sufficiently ...
International audienceWe prove a converse of the mean value property for superharmonic and subharmon...
In this paper we presents some Liouville type theorems for solutions of differential inequalities in...
By using quasi-Banach techniques as key ingredient we prove Poincaré- and Sobolev- type inequalities...
ABSTRACT: In this paper we shall study the growth and asymptotic behaviour of sub-harmonic functions...
Inequalities between volume mean-values and spherical mean-values of functions are closely related t...
In this note we present mean value characterizations of subharmonic functions related to linear seco...
AbstractWe prove that if f is a quasiregular harmonic function, then there exists a number q∈(0,1) s...
We prove that if u is an $L^p$-subharmonic function defined outside a compact set in $\mathbb{R}^n$...
Abstract: We recall some of the existing subharmonicity results of separately subharmonic functions,...
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