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The following pages link to On the representation of functions by orthogonal series in weighted $L^p$ spaces (Q4241760):

Displaying 33 items.

On the universal function for the class $L^{p}[0,1]$, $p\in (0,1)$ (Q255882) (← links)
Nonlinear approximation by the trigonometric system in weighted $L_\mu^p$ spaces (Q260344) (← links)
On the existence of universal series by the generalized Walsh system (Q277371) (← links)
Universality properties of a double series by the generalized Walsh system (Q355566) (← links)
On existence of a universal function for $L^p[0, 1]$ with $p\in(0, 1)$ (Q511335) (← links)
On the existence of universal series by trigonometric system (Q813938) (← links)
On rearranged series by Haar system (Q944117) (← links)
Series by Haar system with monotone coefficients (Q944135) (← links)
The strong $L^{1}$- greedy property of the Walsh system (Q1006965) (← links)
Unconditional $C$-strong property of Faber-Schauder system (Q1018678) (← links)
On the completeness and other properties of some function systems in $L_p$, $0<p<\infty$ (Q1270285) (← links)
Some theorems for Preiss systems (Q1397494) (← links)
On the L1-convergence and behavior of coefficients of Fourier-Vilenkin series (Q1670449) (← links)
Universal function for a weighted space $L^1_{\mu}[0,1]$ (Q1683283) (← links)
Nonlinear approximation of functions from the class $L^r$ with respect to the Vilenkin system (Q1946933) (← links)
Quasiuniversal Fourier-Walsh series for the classes $L^p[0, 1]$, $p > 1$ (Q1991798) (← links)
On representation of functions from normed subspaces of $H(D)$ by series of exponentials (Q2009433) (← links)
Functions, universal with respect to the classical systems (Q2193459) (← links)
Universal functions with respect to the double Walsh system for classes of integrable functions (Q2204114) (← links)
Functions universal with respect to the Walsh system (Q2227016) (← links)
On the structure of universal functions for classes $L^p[0,1)^2$, $p\in(0,1)$, with respect to the double Walsh system (Q2314367) (← links)
Universal functions for classes $L^p[0,1)^2, p\in (0,1),$ with respect to the double Walsh system (Q2329009) (← links)
On the structure of functions, universal for weighted spaces $L_\mu ^p\left[ {0,1} \right],p > 1$ (Q2331545) (← links)
Universal series by trigonometric system in weighted $L_{\mu }^{1}$ spaces (Q2644158) (← links)
Universal functions in `correction' problems guaranteeing the convergence of Fourier-Walsh series (Q2966730) (← links)
(Q3799106) (← links)
The structure of universal functions for $ L^p$-spaces, $ p\in(0,1)$ (Q4568557) (← links)
Functions universal with respect to the trigonometric system (Q4989077) (← links)
Functions with universal Fourier-Walsh series (Q5122434) (← links)
On the existence of universal functions with respect to the double Walsh system for classes of integrable functions (Q5126657) (← links)
A complete orthonormal system of divergence (Q5917559) (← links)
On the existence and structure of universal functions for weighted spaces $L^1_\mu [0,1]$ (Q6147681) (← links)
On universal (in the sense of signs) Fourier series with respect to the Walsh system (Q6639690) (← links)