Estimates of n-widths of Sobolev's classes on compact globally symmetric spaces of rank one

Estimates of Kolmogorov's and linear n-widths of Sobolev's classes on compact globally symmetric spaces of rank 1 (i.e. on Sd, Pd(R), Pd(C), Pd(H), P16(Cay)) are established. It is shown that these estimates have sharp orders in different important cases. New estimates for the (p,q)-norms of multiplier operators Λ={λk}k∈N are given. We apply our results to get sharp orders of best polynomial approximation and n-widths.

[1]  A. Erdélyi,et al.  Higher Transcendental Functions , 1954 .

[2]  A. Bonami,et al.  Sommes de Cesàro et multiplicateurs des développements en harmoniques sphériques , 1973 .

[3]  F. Murnaghan The unitary and rotation groups , 1962 .

[4]  Sigurdur Helgason,et al.  The Radon transform on Euclidean spaces, compact two-point homogeneous spaces and Grassmann manifolds , 1965 .

[5]  S. Helgason Differential Geometry and Symmetric Spaces , 1964 .

[6]  Hsien-Chtjng Wang,et al.  TWO-POINT HOMOGENEOUS SPACES , 1952 .

[7]  Tom H. Koornwinder,et al.  The addition formula for Jacobi polynomials and spherical harmonics : prepublication , 1973 .

[8]  Z. Ditzian,et al.  Fractional Derivatives and Best Approximation , 1998 .

[9]  A. Pinkus n-Widths in Approximation Theory , 1985 .

[10]  E. Cartan Sur la détermination d’un système orthogonal complet dans un espace de riemann symétrique clos , 1929 .

[11]  R. S. Ismagilov On n-dimensional diameters of compacts in a Hilbert space , 1968 .

[12]  Tom Lyche,et al.  Trends in approximation theory , 2001 .

[13]  A. I. Kamzolov The best approximation of the classes of functions Wpα(Sn) by polynomials in spherical harmonics , 1982 .

[14]  R. Gangolli,et al.  Positive definite kernels on homogeneous spaces and certain stochastic processes related to Lévy's brownian motion of several parameters , 1967 .

[15]  Rene F. Swarttouw,et al.  Orthogonal polynomials , 2020, NIST Handbook of Mathematical Functions.