The present paper investigates the weighted L^(1)-convergence of Gr□nwald in terpolatory operators based on the zeros of the second Chebyshev polynomials U_(n)(x) = sin(n+1)θ/sinθ. The approximation rate is sharp.
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https://www.riss.kr/link?id=A35498708
WANG, JIAN LI (Department of Mathematics, Shaoxing Arts and Science College) ; ZHOU, SONG PING (Institute of Mathematics, Zhejiang Sci-Tech University)
2006
English
410.5
SCOPUS,KCI등재,ESCI
학술저널
111-118(8쪽)
0
상세조회0
다운로드다국어 초록 (Multilingual Abstract)
The present paper investigates the weighted L^(1)-convergence of Gr□nwald in terpolatory operators based on the zeros of the second Chebyshev polynomials U_(n)(x) = sin(n+1)θ/sinθ. The approximation rate is sharp.
The present paper investigates the weighted L^(1)-convergence of Gr□nwald in terpolatory operators based on the zeros of the second Chebyshev polynomials U_(n)(x) = sin(n+1)θ/sinθ. The approximation rate is sharp.
Special Linear Group and Modified Laguerre Functions
On Strongly Nonlinear Implicit Complementarity Problems in Hilbert Spaces