Wyniki wyszukiwania - Biblioteka Nauki

1

Antiplane strain (shear) of orthotropic non-homogeneous prismatic shell-like bodies

100%

Chinchaladze N. , Jaiani G.

Archives of Mechanics

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2017

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tom Vol. 69, nr 4-5

305--316

EN

Antiplane strain (shear) of orthotropic non-homogeneous prismatic shell-like bodies are considered when the shear modulus depending on the body projection (i.e., on a domain lying in the plane of interest) variables may vanish either on a part or on the entire boundary of the projection. We study the dependence of the well-posedness of the boundary conditions (BCs) on the character of the vanishing of the shear modulus. The case of vibration is considered as well.

2

On integral equation in space-time

100%

Hącia L.

Demonstratio Mathematica

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1999

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tom Vol. 32, nr 4

795-805

EN

Integral equations in space-time play very important role in wave and heat conduction theory. Particular cases of these equations of so-called mixed integral equations or Volterra-Fredholm integral equations arise in the mathematical modelling of the spatio-temporal development of an epidemic. Some initial-boundary problems for a number of differential partial equations in physics, mechanics and technology are reducible to the considered integral equations. In this paper some methods for solving these linear integral equations are presented in weighted spaces. It is shown that better results can be obtained in weighted spaces.

3

Bounded projections in weighted function spaces in a generalized unit disc

88%

Karapetyan A.

Annales Polonici Mathematici

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1995

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tom 62

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nr 3

193-218

EN

Let $M_{m,n}$ be the space of all complex m × n matrices. The generalized unit disc in $M_{m,n}$ is >br> $R_{m,n} = {Z ∈ M_{m,n}: I^{(m)} - ZZ* is positive definite}$. Here $I^{(m)} ∈ M_{m,m}$ is the unit matrix. If 1 ≤ p < ∞ and α > -1, then $L^{p}_{α}(R_{m,n})$ is defined to be the space $L^p{R_{m,n}; [det(I^{(m)} - ZZ*)]^α dμ_{m,n}(Z)}$, where $μ_{m,n}$ is the Lebesgue measure in $M_{m,n}$, and $H^p_α(R_{m,n}) ⊂ L^{p}_{α}(R_{m,n})$ is the subspace of holomorphic functions. In [8,9] M. M. Djrbashian and A. H. Karapetyan proved that, if $Reβ > (α+1)/p -1$ (for 1 < p < ∞) and Re β ≥ α (for p = 1), then $f(𝒵)= T^{β}_{m,n}(f)(𝒵), 𝒵 ∈ R_{m,n}, where $T^{β}_{m,n}$ is the integral operator defined by (0.13)-(0.14). In the present paper, given 1 ≤ p < ∞, we find conditions on α and β for $T^{β}_{m,n}$ to be a bounded projection of $L^p_α(R_{m,n})$ onto $H^p_α(R_{m,n})$. Some applications of this result are given.

4

Two-weighted norm inequalities for the fractional integral operator between L^p and Lipschitz spaces

88%

Pradolini G.

Annales Societatis Mathematicae Polonae. Seria 1: Commentationes Mathematicae

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2001

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tom [Z] 41

147-169

EN

We characterize the pairs of weights for which the fractional integral of order y, I_y, is bounded from weighted Lebesgue spaces L^ into suitable weighted BMO and Lipschitz integral spaces with a weight w. We also study the properties of the classes of weights that arise in connection with this boundedness of I-y.

5

Harmonic vibration of cusped plates in the N-th approximation of Vekua’s hierarchical models

75%

Chinchaladze N.

Archives of Mechanics

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2013

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tom Vol. 65, nr 5

345--365

EN

In this paper elastic cusped symmetric prismatic shells (i.e., plates of variable thickness with cusped edges) in the N-th approximation of Vekua’s hierarchical models are considered. The well-posedness of the boundary value problems (BVPs) under the reasonable boundary conditions at the cusped edge and given displacements at the non-cusped edge is studied in the case of harmonic vibration. The classical and weak setting of the BVPs in the case of the N-th approximation of hierarchical models is considered. Appropriate weighted functional spaces are introduced. Uniqueness and existence results for the variational problem are proved. The structure of the constructed weighted space is described and its connection with weighted Sobolev spaces is established.

6

A regularity criterion for positive part of radial component in the case of axially symmetric Navier-Stokes equations

75%

Kubica A.

Demonstratio Mathematica

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2015

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tom Vol. 48, nr 1

62--72

EN

We examine the conditional regularity of the solutions of Navier–Stokes equations in the entire three-dimensional space under the assumption that the data are axially symmetric. We show that if positive part of the radial component of velocity satisfies a weighted Serrin type condition and in addition angular component satisfies some condition, then the solution is regular.

7

On weighted harmonic Bergman spaces

75%

Petrosyan A.

Demonstratio Mathematica

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2008

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tom Vol. 41, nr 1

73-83

EN

This paper is devoted to the investigation of the weighted Bergman harmonic spaces bp/alpha(B] in the unit ball in Rn. The reproducing kernel Ralpha for the ball is constructed and the integral representation for functions in bp/alpha(B) by means of this kernel is obtained. Besides an linear mapping between the bp/alpha(B) spaces and the ordinary L2-space on the unit sphere, which has an explicit form of integral operator along with its inversion, is established.

8

Distribution and rearrangement estimates of the maximal function and interpolation

63%

U. Asekritova I. , Krugljak N. Y. , Maligranda L. , Persson L.-E.

Studia Mathematica

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1997

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tom 124

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nr 2

107-132

EN

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 methods allow us to obtain K-functional formulas in terms of the maximal function for couples of weighted $L_p$-spaces.

9

Approximation by q-analogue of modified Jakimovski-Leviatan-Stancu type operators

63%

Mursaleen M. , Nasiruzzaman M. , Wafi A.

Demonstratio Mathematica

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2017

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tom Vol. 50, nr 1

175--189

EN

In this paper, we introduce the q-analogue of the Jakimovski-Leviatan type modied operators introduced by Atakut with the help of the q-Appell polynomials. We obtain some approximation results via the well-known Korovkin’s theorem for these operators. We also study convergence properties by using the modulus of continuity and the rate of convergence of the operators for functions belonging to the Lipschitz class. Moreover, we study the rate of convergence in terms of modulus of continuity of these operators in a weighted space.

10

Convergence of generalized sampling series in weighted spaces

63%

Acar T. , Alagöz O. , Aral A. , Costarelli D. , Turgay M. , Vinti G.

Demonstratio Mathematica

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2022

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tom Vol. 55, nr 1

153--162

EN

The present paper deals with an extension of approximation properties of generalized sampling series to weighted spaces of functions. A pointwise and uniform convergence theorem for the series is proved for functions belonging to weighted spaces. A rate of convergence by means of weighted moduli of continuity is presented and a quantitative Voronovskaja-type theorem is obtained.