Chebyshev subspaces and convergence of positive linear operators

C.A. Micchelli1

doi:10.1090/S0002-9939-1973-0328445-2

Proceedings of the American Mathematical Society

Paper

01 Jan 1973

Chebyshev subspaces and convergence of positive linear operators

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Abstract

A theorem of Korovkin states that a sequence of positive linear operators on C[a, 6] converges strongly to the identity if and only if convergence holds on a three-dimensional Chebyshev subspace of C[a, b]. We extend this theorem to include Chebyshev subspaces of arbitrary dimension and convergence to other positive linear operators. © 1973, American Mathematical Society.

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