In this paper we presents some Liouville type theorems for solutions of differential inequalities involving the φ-Laplacian. Our results, in particular, improve and generalize known results for the Laplacian and the p-Laplacian, and are new even in these cases. PhragmenLindeloff type results, and a weak form of the Omori-Yau maximum principle are also discussed
We show that the parabolicity of a manifold is equivalent to the validity of the `divergence theorem...
In this paper we propose a new proof for non-linear Liouville type results concerning the $p$-Laplac...
This paper deals with the study of differential inequalities with gradient terms on Carnot groups. W...
In this paper we presents some Liouville type theorems for solutions of differential inequalities in...
In this paper we present some Liouville type theorems for solutions of differential inequalities inv...
We prove Liouville type results for non-negative solutions of the differential inequality Δφu⩾f(u)ℓ(...
Let L be a sub-Laplacian on LN and let G = (LN , ◦, δλ) be its related homogeneous Lie group. Let E ...
Let L be a sub-Laplacian on LN and let G = (LN, ◦, δλ) be its related homogeneous Lie group. Let E b...
The Liouville theorem for harmonic functions states that a solution u of u ≥ 0, ∆u = 0 in IRN is a c...
AbstractThe method of deriving Liouville's theorem for subharmonic functions in the plane from the c...
In this paper we explore Liouville-type theorems to solutions of PDEs involving the ϕ-Laplace operat...
AbstractWe study the qualitative behavior of non-negative entire solutions of differential inequalit...
In this paper, we prove the following result. Let α be any real number between 0 and 2. Assume that ...
AbstractIn this paper we prove two theorems of Littlewood–Paley type for M-subharmonic functions. As...
We study the qualitative behavior of non-negative entire solutions of differential inequalities with...
We show that the parabolicity of a manifold is equivalent to the validity of the `divergence theorem...
In this paper we propose a new proof for non-linear Liouville type results concerning the $p$-Laplac...
This paper deals with the study of differential inequalities with gradient terms on Carnot groups. W...
In this paper we presents some Liouville type theorems for solutions of differential inequalities in...
In this paper we present some Liouville type theorems for solutions of differential inequalities inv...
We prove Liouville type results for non-negative solutions of the differential inequality Δφu⩾f(u)ℓ(...
Let L be a sub-Laplacian on LN and let G = (LN , ◦, δλ) be its related homogeneous Lie group. Let E ...
Let L be a sub-Laplacian on LN and let G = (LN, ◦, δλ) be its related homogeneous Lie group. Let E b...
The Liouville theorem for harmonic functions states that a solution u of u ≥ 0, ∆u = 0 in IRN is a c...
AbstractThe method of deriving Liouville's theorem for subharmonic functions in the plane from the c...
In this paper we explore Liouville-type theorems to solutions of PDEs involving the ϕ-Laplace operat...
AbstractWe study the qualitative behavior of non-negative entire solutions of differential inequalit...
In this paper, we prove the following result. Let α be any real number between 0 and 2. Assume that ...
AbstractIn this paper we prove two theorems of Littlewood–Paley type for M-subharmonic functions. As...
We study the qualitative behavior of non-negative entire solutions of differential inequalities with...
We show that the parabolicity of a manifold is equivalent to the validity of the `divergence theorem...
In this paper we propose a new proof for non-linear Liouville type results concerning the $p$-Laplac...
This paper deals with the study of differential inequalities with gradient terms on Carnot groups. W...
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