Toeplitz operator operator theory , a Toeplitz operatorcompression of a multiplication operator on the circle to the Hardy space .Details Let S 1 be the circle, with the standard Lebesgue measure , and L 2 be the Hilbert space of square-integrable functions . A bounded measurable function g on S 1 defines a multiplication operator Mg on L 2 . Let P be the projection from L 2 onto the Hardy space H 2 . The Toeplitz operator with symbol g is defined byrestriction .bounded operator on H 2 is Toeplitz if and only if its matrix representation , in the basis , has constant diagonals.Theorems For a proof, see . He attributes the theorem to Mark Krein , Harold Widom and Allen Devinatz.special case of the Atiyah-Singer index theorem . Axler- Chang- Sarason Theorem: The operator is compact if and only if. analytic functions continuous functions on the circle.
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