Pages that link to "Item:Q1268701"

The following pages link to Jackson theorems for Erdős weights in \(L_p\) \((0<p\leq \infty)\) (Q1268701):

Displaying 15 items.

• Higher order derivatives of approximation polynomials on \(\mathbb{R}\) (Q261150) (← links)
• On the Favard-type theorem and the Jackson-type theorem. II (Q420253) (← links)
• Converse and smoothness theorems for Erdős weights in \(L_p\) \((0<p\leq\infty)\) (Q1266096) (← links)
• The Lebesgue function and Lebesgue constant of Lagrange interpolation for Erdős weights (Q1270277) (← links)
• Smoothness theorems for Erdős weights. II (Q1284490) (← links)
• Forward and converse theorems of polynomial approximation for exponential weights on \([-1,1]\). I (Q1369239) (← links)
• Forward and converse theorems of polynomial approximation for exponential weights on \([-1,1]\). II (Q1369240) (← links)
• A tribute to Géza Freud (Q1433342) (← links)
• Direct approximation theorems for Dirichlet series in the norm of uniform convergence (Q1763774) (← links)
• Pointwise convergence of derivatives of Lagrange interpolation polynomials for exponential weights (Q1765263) (← links)
• Which weights on \(\mathbb R\) admit Jackson theorems? (Q2472734) (← links)
• Approximation by Bézier type of Meyer-König and Zeller operators (Q2477359) (← links)
• Jackson and Bernstein theorems for the weight \(\exp(-|x|)\) on \(\mathbb R\) (Q2480556) (← links)
• BOUNDEDNESS AND UNIFORM NUMERICAL APPROXIMATION OF THE WEIGHTED HILBERT TRANSFORM ON THE REAL LINE (Q2748920) (← links)
• The support of the equilibrium measure in the presence of a monomial external field on $[-1,1]$ (Q4257594) (← links)