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In 1989, R. Coifman suggested the design of orthonormal wavelet systems with vanishing moments for both scaling and wavelet functions. They were first constructed by I. Daubechies [15, 16], and she named them coiflets. In this paper, we propose a system of necessary conditions which is redundant free and simpler than the known system due to the elimination of some quadratic conditions, thus the construction of coiflets is simplified and enables us to find the exact values of the scaling coefficients...

On the existence of a compactly supported $L^{p}$ -solution for two-dimensional two-scale dilation equations

Jarosław Kotowicz (1997)

Applicationes Mathematicae

Necessary and sufficient conditions for the existence of compactly supported $L^{p}$ -solutions for the two-dimensional two-scale dilation equations are given.

On the existence of non-linear frames

Shah Jahan, Varinder Kumar, S.K. Kaushik (2017)

Archivum Mathematicum

A stronger version of the notion of frame in Banach space called Strong Retro Banach frame (SRBF) is defined and studied. It has been proved that if $𝒳$ is a Banach space such that $𝒳^{*}$ has a SRBF, then $𝒳$ has a Bi-Banach frame with some geometric property. Also, it has been proved that if a Banach space $𝒳$ has an approximative Schauder frame, then $𝒳^{*}$ has a SRBF. Finally, the existence of a non-linear SRBF in the conjugate of a separable Banach space has been proved.

On the Existence of Principal Values for the Cauchy Integral on Weighted Lebesgue Spaces for Non-Doubling Measures.

J. García-Cuerva, J.M. Martell (2001)

The journal of Fourier analysis and applications [[Elektronische Ressource]]

On the existence of steady-state solutions to the Navier-Stokes system for large fluxes

Antonio Russo, Giulio Starita (2008)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

In this paper we deal with the stationary Navier-Stokes problem in a domain $Ω$ with compact Lipschitz boundary $\partial Ω$ and datum $a$ in Lebesgue spaces. We prove existence of a solution for arbitrary values of the fluxes through the connected components of $\partial Ω$ , with possible countable exceptional set, provided $a$ is the sum of the gradient of a harmonic function and a sufficiently small field, with zero total flux for $Ω$ bounded.

On the existence of wavelets for non-expansive dilation matrices.

Darrin Speegle (2003)

Collectanea Mathematica

Sets which simultaneously tile Rn by applying powers of an invertible matrix and translations by a lattice are studied. Diagonal matrices A for which there exist sets that tile by powers of A and by integer translations are characterized. A sufficient condition and a necessary condition on the dilations and translations for the existence of such sets are also given. These conditions depend in an essential way on the interplay between the eigenvectors of the dilation matrix and the translation lattice...

On the expansion theorem described by $H (A, B)$ spaces.

El-Sabbagh, A.A. (2004)

International Journal of Mathematics and Mathematical Sciences

On the exponential integrability of fractional integrals on spaces of homogeneous type

A. Gatto, Stephen Vági (1993)

Colloquium Mathematicae

In this paper we show that the fractional integral of order α on spaces of homogeneous type embeds $L^{1 / α}$ into a certain Orlicz space. This extends results of Trudinger [T], Hedberg [H], and Adams-Bagby [AB].

On the Fejér kernel functions with respect to the Walsh-Kaczmarz system.

Gát, György (2001)

Acta Mathematica Academiae Paedagogicae Nyí regyháziensis. New Series [electronic only]

On the Fejér means of bounded Ciesielski systems

Ferenc Weisz (2001)

Studia Mathematica

We investigate the bounded Ciesielski systems, which can be obtained from the spline systems of order (m,k) in the same way as the Walsh system arises from the Haar system. It is shown that the maximal operator of the Fejér means of the Ciesielski-Fourier series is bounded from the Hardy space $H_{p}$ to $L_{p}$ if 1/2 < p < ∞ and m ≥ 0, |k| ≤ m + 1. Moreover, it is of weak type (1,1). As a consequence, the Fejér means of the Ciesielski-Fourier series of a function f converges to f a.e. if f ∈ L₁ as n...

We introduce some spaces of generalized functions that are defined as generalized quotients and Boehmians. The spaces provide simple and natural frameworks for extensions of the Fourier transform.

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On the distributional orthogonality of the general Pollaczek polynomials.

On the dual of weighted $H^{1} (| z | < 1)$

On the $| E, q |$ summation of the Fourier series

On the eigenstructure of the Bernstein kernel.

On the embedding $H^{ω} \subset V_{p}$

On the Evaluation of Certain Two-Dimensional Singular Integrals with Cauchy Kernels.

On the exact values of coefficients of coiflets