Add to ORKGAbstract. Given an integer m ≥ 2, the Hardy–Littlewood inequalities assert that for p ≥ 2m there exists a constant CRm,p ≥ 1 such that, for all continuous m–linear forms A: `Np × · · · × `Np → R and all positive integers N, N∑ j1,...,jm=1 |A(ej1,..., ejm)
Hardy type inequalities: Prehistory, history and current status The first weighted form of the conti...
This work is divided into three parts. In the first, we study the behavior of constants that satisfy ...
The inequality (*) $(∑_{|n|=1}^{∞} ∑_{|m|=1}^{∞} |nm|^{p-2} |f̂(n,m)|^p)^{1/p} ≤ C_p ∥ƒ∥_{H_p}$ (0 <...
Abstract. In this paper, among other results, we improve the best known estimates for the constants ...
We investigate the behavior of the constants of the polynomial Hardy-Littlewood inequality
© I.K. Shafigullin. 2017. In the paper we consider the conjecture by E.B. Davies on an uniform lower...
In this study we show two classical inequalities, namely Bohnenblust-Hille inequality and Hardy-Lit...
In this study we show two classical inequalities, namely Bohnenblust-Hille inequality and Hardy-Lit...
Dans cette Note nous généralisons l'inégalité de Hardy-Littlewood pour des intégrantes de la forme ƒ...
An inequality of Hardy and Littlewood for m-homogeneous polynomials on ℓp spaces is valid for p >...
We establish an analogue for the p-Laplacian on the half-line of an integro-differential inequality ...
We establish an analogue for the p-Laplacian on the half-line of an integro-differential inequality ...
We establish an analogue for the p-Laplacian on the half-line of an integro-differential inequality ...
The best possible constant in a classical inequality due to Bonsall is established by relating that ...
We establish an analogue for the p-Laplacian on the half-line of an integro-differential inequality ...
Hardy type inequalities: Prehistory, history and current status The first weighted form of the conti...
This work is divided into three parts. In the first, we study the behavior of constants that satisfy ...
The inequality (*) $(∑_{|n|=1}^{∞} ∑_{|m|=1}^{∞} |nm|^{p-2} |f̂(n,m)|^p)^{1/p} ≤ C_p ∥ƒ∥_{H_p}$ (0 <...
Abstract. In this paper, among other results, we improve the best known estimates for the constants ...
We investigate the behavior of the constants of the polynomial Hardy-Littlewood inequality
© I.K. Shafigullin. 2017. In the paper we consider the conjecture by E.B. Davies on an uniform lower...
In this study we show two classical inequalities, namely Bohnenblust-Hille inequality and Hardy-Lit...
In this study we show two classical inequalities, namely Bohnenblust-Hille inequality and Hardy-Lit...
Dans cette Note nous généralisons l'inégalité de Hardy-Littlewood pour des intégrantes de la forme ƒ...
An inequality of Hardy and Littlewood for m-homogeneous polynomials on ℓp spaces is valid for p >...
We establish an analogue for the p-Laplacian on the half-line of an integro-differential inequality ...
We establish an analogue for the p-Laplacian on the half-line of an integro-differential inequality ...
We establish an analogue for the p-Laplacian on the half-line of an integro-differential inequality ...
The best possible constant in a classical inequality due to Bonsall is established by relating that ...
We establish an analogue for the p-Laplacian on the half-line of an integro-differential inequality ...
Hardy type inequalities: Prehistory, history and current status The first weighted form of the conti...
This work is divided into three parts. In the first, we study the behavior of constants that satisfy ...
The inequality (*) $(∑_{|n|=1}^{∞} ∑_{|m|=1}^{∞} |nm|^{p-2} |f̂(n,m)|^p)^{1/p} ≤ C_p ∥ƒ∥_{H_p}$ (0 <...