Orthonormal Systems in Linear Spans
Abstract
We show that any N-dimensional linear subspace of L2(T) admits an orthonormal system such that the L2 norm of the square variation operator V2 is as small as possible. When applied to the span of the trigonometric system, we obtain an orthonormal system of trigonometric polynomials with a V2 operator that is considerably smaller than the associated operator for the trigonometric system itself.
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