Muntz-Jackson Theorems in L p [0, 1] and C[0, 1]
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Publication:5669253
DOI10.2307/2374631zbMath0254.41005OpenAlexW2328873862MaRDI QIDQ5669253
Publication date: 1972
Published in: American Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2307/2374631
Related Items (12)
Comparison between the degrees of approximation by lacunary and ordinary algebraic polynomials ⋮ Linear approximation by exponential sums on finite intervals ⋮ Approximation by Müntz-polynomials away from the origin ⋮ Müntz-Jackson theorems in \(L_ p (0,1), 1 \leq{} p < 2\) ⋮ Lineare Approximation durch komplexe Exponentialsummen ⋮ Generalized polynomial approximation ⋮ Müntz-Jackson theorems in \(L^p, p<2\) ⋮ Jackson-Müntz-Szász theorems in \(L^p[0,1\) and \(C[0,1]\) for complex exponents] ⋮ On the efficiency of general rational approximation ⋮ Kantorovich-Bernstein α-fractal function in 𝓛P spaces ⋮ Piecewise Monotone Interpolation and Approximation with Muntz Polynomials ⋮ On the approximation of Müntz series by Müntz polynomials
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