Sarjoo Prasad Yadav

Copyright © 2004 Sarjoo Prasad Yadav. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Let X represent either a space C[−1,1] or Lα,βp(w), 1≤p<∞, of functions on [−1,1]. It is well known that X are Banach spaces under the sup and the p-norms, respectively. We prove that there exist the best possible normalized Banach subspaces Xα,βk of X such that the system of Jacobi polynomials is densely spread on these, or, in other words, each f∈Xα,βk can be represented by a linear combination of Jacobi polynomials to any degree of accuracy. Explicit representation for f∈Xα,βk has been given.