Approximation of smooth functions on compact two-point homogeneous spaces
Abstract
Estimates of Kolmogorov n-widths dn(Bpr, Lq) and linear n-widths n(Bpr, Lq), (1≤ q≤ ∞) of Sobolev's classes Bpr, (r>0, 1≤ p≤ ∞) on compact two-point homogeneous spaces (CTPHS) are established. For part of (p, q)∈[1,∞]×[1,∞], sharp orders of dn(Bpr, Lq) or n (Bpr, Lq) were obtained by Bordin, Kushpel, Levesley and Tozoni in a recent paper `` J. Funct. Anal. 202 (2) (2003), 307--326''. In this paper, we obtain the sharp orders of dn(Bpr, Lq) and n (Bpr, Lq) for all the remaining (p,q). Our proof is based on positive cubature formulas and Marcinkiewicz-Zygmund type inequalities on CTPHS.
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