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http://acervodigital.unesp.br/handle/11449/36992
- Title:
- Chebyshev-Laurent polynomials and weighted approximation
- Universidade Estadual Paulista (UNESP)
- 0075-8469
- Let (a, b) subset of (0, infinity) and for any positive integer n, let S-n be the Chebyshev space in [a, b] defined by S-n:= span{x(-n/2+k),k= 0,...,n}. The unique (up to a constant factor) function tau(n) is an element of S-n, which satisfies the orthogonality relation S(a)(b)tau(n)(x)q(x) (x(b - x)(x - a))(-1/2) dx = 0 for any q is an element of Sn-1, is said to be the orthogonal Chebyshev S-n-polynomials. This paper is an attempt to exibit some interesting properties of the orthogonal Chebyshev S-n-polynomials and to demonstrate their importance to the problem of approximation by S-n-polynomials. A simple proof of a Jackson-type theorem is given and the Lagrange interpolation problem by functions from S-n is discussed. It is shown also that tau(n) obeys an extremal property in L-q, 1 less than or equal to q less than or equal to infinity. Natural analogues of some inequalities for algebraic polynomials, which we expect to hold for the S-n-pelynomials, are conjectured.
- 1-Jan-1998
- Orthogonal Functions, Moment Theory, and Continued Fractions. New York: Marcel Dekker, v. 199, p. 1-14, 1998.
- 1-14
- Marcel Dekker
- http://getinfo.de/app/Action-of-Eucalyptus-oils-against-Mycobacterium/id/BLSE%3ARN047458560
- Acesso restrito
- outro
- http://repositorio.unesp.br/handle/11449/36992
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