Add to ORKGWe consider the operator $T_gf(x)=g(x) \int^x_0 f$, where $g$ is a positive nonincreasing function, and characterize the pairs of positive measurable functions $(u,v)$ such that the generalized weak type inequality \begin{center}$\Phi^{-1}_2\Bigg(\Phi_2(\lambda)\int_{\{x\in(0,\infty);\vert T_gf(x)\vert >\lambda\}}u\Bigg)\leq\Phi^{-1}_1\bigg(\int^\infty_0\Phi_1(K\vert f\vert)v\bigg)$\end{center} holds, where either $\Phi_1$ $N$-function and $\Phi_2$ is a positive increasing function such that $\Phi_1\circ\Phi^{-1}_2$ is countably subadditive or $\Phi_1 (t)= t$ and $\Phi_2$ is a positive increasing function whose inverse is countably subadditive
summary:Some $q$-analysis variants of Hardy type inequalities of the form $$ \int _0^b \bigg (x^{\al...
In this paper, we give some new types of the classical Hardy integral inequality by including a seco...
Abstract. We discuss mixed weak type inequalities in weighted spaces for one-sided operators. In par...
We characterize the pairs of weights (v,w) for which the Hardy-Steklov-type operator Tf(x)=g(x)∫ s(x...
We characterize the pairs of weights (v,w) for which the Hardy-Steklov-type operator T f (x) = g(x) ...
We characterize the pairs of weights (v, w) for which the operator Tf(x) = g(x) ∫s(x)h(x) f with s a...
Let μ1 and μ2 be positive sigma-finite measures on Omega1 and Omega2 respectively, k : Omega1 × Omeg...
AbstractWe characterize weighted modular inequalities of weak and strong type for the Hardy–Steklov ...
We improve on several mixed weak type inequalities both for the Hardy-Littlewood maximal function an...
summary:Let $u$ be a weight on $(0, \infty)$. Assume that $u$ is continuous on $(0, \infty)$. Let th...
summary:We give a quantitative characterization of the pairs of weights $(w,v)$ for which the dyadic...
In this paper we characterize the validity of the Hardy-type inequality ∥ ∥ ∫ s∞...
Given a space of homogeneous type \((X,d,\mu)\), we prove strong-type weighted norm inequalities for...
Suppose u, v, w, and t are weight functions on an appropriate measure space (X,μ), and $Φ_1$, $Φ_2$ ...
The paper deals with Hardy-type inequalities when the right-hand side contains the weighted norm of ...
summary:Some $q$-analysis variants of Hardy type inequalities of the form $$ \int _0^b \bigg (x^{\al...
In this paper, we give some new types of the classical Hardy integral inequality by including a seco...
Abstract. We discuss mixed weak type inequalities in weighted spaces for one-sided operators. In par...
We characterize the pairs of weights (v,w) for which the Hardy-Steklov-type operator Tf(x)=g(x)∫ s(x...
We characterize the pairs of weights (v,w) for which the Hardy-Steklov-type operator T f (x) = g(x) ...
We characterize the pairs of weights (v, w) for which the operator Tf(x) = g(x) ∫s(x)h(x) f with s a...
Let μ1 and μ2 be positive sigma-finite measures on Omega1 and Omega2 respectively, k : Omega1 × Omeg...
AbstractWe characterize weighted modular inequalities of weak and strong type for the Hardy–Steklov ...
We improve on several mixed weak type inequalities both for the Hardy-Littlewood maximal function an...
summary:Let $u$ be a weight on $(0, \infty)$. Assume that $u$ is continuous on $(0, \infty)$. Let th...
summary:We give a quantitative characterization of the pairs of weights $(w,v)$ for which the dyadic...
In this paper we characterize the validity of the Hardy-type inequality ∥ ∥ ∫ s∞...
Given a space of homogeneous type \((X,d,\mu)\), we prove strong-type weighted norm inequalities for...
Suppose u, v, w, and t are weight functions on an appropriate measure space (X,μ), and $Φ_1$, $Φ_2$ ...
The paper deals with Hardy-type inequalities when the right-hand side contains the weighted norm of ...
summary:Some $q$-analysis variants of Hardy type inequalities of the form $$ \int _0^b \bigg (x^{\al...
In this paper, we give some new types of the classical Hardy integral inequality by including a seco...
Abstract. We discuss mixed weak type inequalities in weighted spaces for one-sided operators. In par...