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Hilbert-Schmidt Operator

Let H be a Hilbert space and (e_i)_(i in I) is an orthonormal basis for H. The set S(H) of all operators T for which sum_(i in I)||Te_i||^2<infty is a self-adjoint ideal of B(H). These operators are called Hilbert-Schmidt operators on H.

The algebra S(H) with the Hilbert-Schmidt norm ||T||_2=sum_(i in I)||Te_i||^2)^(1/2) is a Banach algebra. It contains operators of finite rank as a dense subset and is contained in the space K(H) of compact operators. For any pair of operators T and S in S(H), the family (<Te_i,Se_i>)_(i in I) is summable. Its sum (A,B) defines an inner product in S(H) and (T,T)^(1/2)=||T||_2. So S(H) can be regarded as a Hilbert space (independent on the choice basis (e_i)).

See also

Hilbert-Schmidt Norm, Hilbert Space

This entry contributed by Mohammad Sal Moslehian

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References

Murphy, G. J. C-*-Algebras and Operator Theory. New York: Academic Press, 1990.

Referenced on Wolfram|Alpha

Hilbert-Schmidt Operator

Cite this as:

Moslehian, Mohammad Sal. "Hilbert-Schmidt Operator." From MathWorld--A Wolfram Web Resource, created by Eric W. Weisstein. https://mathworld.wolfram.com/Hilbert-SchmidtOperator.html

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