Kolmogorov widths and bilinear approximations of the classes of periodic
functions of one and many variables
Authors
A. S. Romanyuk
Abstract
We obtain the exact order estimates for the Kolmogorov widths of the classes $W^g_p$ of periodic functions of one variable generated by the integral operators with kernels $g(x, y)$ from the Nikol’skii – Besov classes $B^r_{p,\theta}$. We also study the
behavior of bilinear approximations to the classes $W^r_{p,\alpha}$ of periodic multivariate functions with bounded mixed derivative
in the spaces $L_{q_1,q_2}$ for some relations between the parameters $r_1, p, q_1, q_2$.
