Estimates of best m-term trigonometric approximation of classes of analytic functions

Abstract

In metric of spaces Ls, \ 1≤ s≤∞, we obtain exact in order estimates of best m-term trigonometric approximations of classes of convolutions of periodic functions, that belong to unit all of space Lp, \ 1≤ p≤∞, with generated kernel β(t)=Σk=1∞(k)(kt-βπ2), β∈ R, whose coefficients (k) tend to zero not slower than geometric progression. Obtained estimates coincide in order with approximation by Fourier sums of the given classes of functions in Ls-metric. This fact allows to write down exact order estimates of best orthogonal trigonometric approximation and trigonometric widths of given classes.