Pages that link to "Item:Q2752679"

The following pages link to On universal trigonometric series in weighted spaces \(L^ 1_\mu[0,2\pi]\). (Q2752679):

Displaying 13 items.

• On the universal function for the class \(L^{p}[0,1]\), \(p\in (0,1)\) (Q255882) (← 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)
• Pointwise universal trigonometric series (Q1034596) (← links)
• Universal function for a weighted space \(L^1_{\mu}[0,1]\) (Q1683283) (← links)
• On the universal functions (Q1685953) (← links)
• Quasiuniversal Fourier-Walsh series for the classes \(L^p[0, 1]\), \(p > 1\) (Q1991798) (← 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)
• Asymptotics of recurrence coefficients for orthonormal polynomials on the line—Magnus’s method revisited (Q4433127) (← links)
• The structure of universal functions for $ L^p$-spaces, $ p\in(0,1)$ (Q4568557) (← links)
• On the existence of universal functions with respect to the double Walsh system for classes of integrable functions (Q5126657) (← links)
• On Fourier series that are universal modulo signs (Q5237156) (← links)