Widths and rigidity

Abstract

We consider Kolmogorov widths of finite sets of functions. Any orthonormal system of N functions is rigid in L2, i.e. it cannot be well approximated by linear subspaces of dimension essentially smaller than N. This is not true for weaker metrics: it is known that in every Lp, p<2, the first N Walsh functions can be o(1)-approximated by a linear space of dimension o(N). We give some sufficient conditions for rigidity. We prove that independence of functions (in the probabilistic meaning) implies rigidity in L1 and even in L0 -- the metric that corresponds to convergence in measure. In the case of Lp, 1<p<2, the condition is weaker: any Sp'-system is Lp-rigid. Also we obtain some positive results, e.g. that first N trigonometric functions can be approximated by very-low-dimensional spaces in L0, and by subspaces generated by o(N) harmonics in Lp, p<1.

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