EUDML

We discuss the characterization of the inequality (RN+ fq u)1/q C (RN+ fp v )1/p, 0<q, p <, for monotone functions $f \geq 0$ and nonnegative weights $u$ and $v$ and $N \geq 1$ . We prove a new multidimensional integral modular inequality for monotone functions. This inequality generalizes and unifies some recent results in one and several dimensions.

An extension of Rothe's method to non-cylindrical domains

Komil Kuliev; Lars-Erik Persson — 2007

Applications of Mathematics

In this paper Rothe’s classical method is extended so that it can be used to solve some linear parabolic boundary value problems in non-cylindrical domains. The corresponding existence and uniqueness theorems are proved and some further results and generalizations are discussed and applied.

Distribution and rearrangement estimates of the maximal function and interpolation

Irina Asekritova; Natan Krugljak; Lech Maligranda; Lars-Erik Persson — 1997

Studia Mathematica

There are given necessary and sufficient conditions on a measure dμ(x)=w(x)dx under which the key estimates for the distribution and rearrangement of the maximal function due to Riesz, Wiener, Herz and Stein are valid. As a consequence, we obtain the equivalence of the Riesz and Wiener inequalities which seems to be new even for the Lebesgue measure. Our main tools are estimates of the distribution of the averaging function f** and a modified version of the Calderón-Zygmund decomposition. Analogous...

Clarkson type inequalities and their relations to the concepts of type and cotype.

Mikio Kato; Lars-Erik. Persson; Yasuji Takahashi — 2000

Collectanea Mathematica

We prove some multi-dimensional Clarkson type inequalities for Banach spaces. The exact relations between such inequalities and the concepts of type and cotype are shown, which gives a conclusion in an extended setting to M. Milman's observation on Clarkson's inequalities and type. A similar investigation conceming the close connection between random Clarkson inequality and the corresponding concepts of type and cotype is also included. The obtained results complement, unify and generalize several...

Structure of the Hardy operator related to Laguerre polynomials and the Euler differential equation.

Natan Kruglyak; Lech Maligranda; Lars-Erik Persson — 2006

Revista Matemática Complutense

We present a direct proof of a known result that the Hardy operator Hf(x) = 1/x ∫ f(t) dt in the space L = L(0, ∞) can be written as H = I - U, where U is a shift operator (Ue = e, n ∈ Z) for some orthonormal basis {e}. The basis {e} is constructed by using classical Laguerre polynomials. We also explain connections with the Euler differential equation of the first order y' - 1/x y = g and point out some generalizations to the case with weighted L (a, b) spaces.

A study of some constants characterizing the weighted Hardy inequality

Alois Kufner; Lars-Erik Persson; Anna Wedestig — 2004

Banach Center Publications

Boundedness and compactness of the embedding between spaces with multiweighted derivatives when $1 \leq q < p < \infty$

Zamira Abdikalikova; Ryskul Oinarov; Lars-Erik Persson — 2011

Czechoslovak Mathematical Journal

We consider a new Sobolev type function space called the space with multiweighted derivatives $W_{p, \bar{α}}^{n}$ , where $\bar{α} = (α_{0}, α_{1}, ..., α_{n})$ , $α_{i} \in ℝ$ , $i = 0, 1, ..., n$ , and ${∥ f ∥}_{W_{p, \bar{α}}^{n}} = ∥ D_{\bar{α}}^{n} {f ∥}_{p} + \sum_{i = 0}^{n - 1} | D_{\bar{α}}^{i} f (1) |$ , $D_{\bar{α}}^{0} f (t) = t^{α_{0}} f (t), D_{\bar{α}}^{i} f (t) = t^{α_{i}} \frac{d}{d t} D_{\bar{α}}^{i - 1} f (t), i = 1, 2, ..., n .$ We establish necessary and sufficient conditions for the boundedness and compactness of the embedding $W_{p, \bar{α}}^{n} ↪ W_{q, \bar{β}}^{m}$ , when $1 \leq q < p < \infty$ , $0 \leq m < n$ .

Editorials' note

Miroslav Fiedler; Pankaj Jain; Lars-Erik Persson — 2009

Czechoslovak Mathematical Journal

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Generalizations of some classical inequalities and their applications

Weighted integral inequalities with the geometric mean operator.

Some weighted multidimensional Berwald, Thunsdorff and Borell inequalities.

Carleman's inequality – history, proofs and some new generalizations.

Weighted geometric mean inequalities over cones in $ℝ^{N}$ .

On some fractional order Hardy inequalities.

Carlson type inequalities.

A Sawyer duality principle for radially monotone functions in $ℝ^{n}$ .

Weight characterizations for the discrete Hardy inequality with kernel.

Some multiplicative inequalities for inner products and of the Carlson type.

On weighted inequalities with geometric mean operator generated by the Hardy-type integral transform.

Interpolation with a parameter function.