Add to ORKGAbstract. In this paper we prove that if a weight w satisfies the C+q condition, then the Lp(w) norm of a one-sided singular integral is bounded by the Lp(w) norm of the one-sided Hardy-Littlewood maximal function, for 1 < p < q <∞. 1
We study mixed norm inequalities for some directional maximal operators which are defined from one-d...
We study mixed norm inequalities for some directional maximal operators which are defined from one-d...
We study mixed norm inequalities for some directional maximal operators which are defined from one-d...
The matrix Ap condition extends several results in weighted norm theory to functions taking values i...
The matrix Ap condition extends several results in weighted norm theory to functions taking values i...
We study the weighted norm inequalities for the minimal operator, a new operator analogous to the Ha...
Abstract. In this paper we give sufficient conditions on pair of weights (w, v) for some one-sided o...
Abstract- One-sided versions of maximal functions for suitable defined distributions are considered....
summary:In this paper, we give a generalization of Fefferman-Stein inequality for the fractional one...
AbstractFor bounded Lebesgue measurable functionsα,βon the unit circle,Sα,β=αP++βP−is called a singu...
The Hardy-Littlewood maximal opertor is defined for functions I E Lfoc(IR) by 1 lb MI(x) = sup-b- I...
AbstractWeight functions are characterized so that Hardy–Littlewood maximal operator is bounded in c...
The classical approach to the study of convergence of approximate identity operators has strong conn...
For bounded Lebesgue measurable functions α, β on the unit circle, Sα,β = αP+ + βP_ is called a sing...
In this note we present some results showing how singular integrals are controlled by maximal operat...
We study mixed norm inequalities for some directional maximal operators which are defined from one-d...
We study mixed norm inequalities for some directional maximal operators which are defined from one-d...
We study mixed norm inequalities for some directional maximal operators which are defined from one-d...
The matrix Ap condition extends several results in weighted norm theory to functions taking values i...
The matrix Ap condition extends several results in weighted norm theory to functions taking values i...
We study the weighted norm inequalities for the minimal operator, a new operator analogous to the Ha...
Abstract. In this paper we give sufficient conditions on pair of weights (w, v) for some one-sided o...
Abstract- One-sided versions of maximal functions for suitable defined distributions are considered....
summary:In this paper, we give a generalization of Fefferman-Stein inequality for the fractional one...
AbstractFor bounded Lebesgue measurable functionsα,βon the unit circle,Sα,β=αP++βP−is called a singu...
The Hardy-Littlewood maximal opertor is defined for functions I E Lfoc(IR) by 1 lb MI(x) = sup-b- I...
AbstractWeight functions are characterized so that Hardy–Littlewood maximal operator is bounded in c...
The classical approach to the study of convergence of approximate identity operators has strong conn...
For bounded Lebesgue measurable functions α, β on the unit circle, Sα,β = αP+ + βP_ is called a sing...
In this note we present some results showing how singular integrals are controlled by maximal operat...
We study mixed norm inequalities for some directional maximal operators which are defined from one-d...
We study mixed norm inequalities for some directional maximal operators which are defined from one-d...
We study mixed norm inequalities for some directional maximal operators which are defined from one-d...