Kolmogorov widths of balls in mixed norms: the case of rigidity

Abstract

We describe the set of parameters (p1,p2,q1,q2) such that the balls Bq1,q2s,b are rigid in q1,q2s,b metric i.e. they are poorly approximated by linear subspaces of dimension (1-)sb, for large s, b. Thus we have settled an important qualitative case in the problem of estimating widths of balls in mixed norms. The proof combines lower bounds from our previous papers and a new construction for the approximation by linear subspaces in the so-called exceptional case.

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