Hyponormal Operator

In mathematics, especially operator theory, a hyponormal operator is a generalization of a normal operator. In general, a bounded linear operator ''T'' on a complex Hilbert space ''H'' is said to be ''p''-hyponormal ($0 < p \le 1$) if:
:$(T^*T)^p \ge (TT^*)^p$
(That is to say, $(T^*T)^p - (TT^*)^p$ is a positive operator.) If $p = 1$, then ''T'' is called a hyponormal operator. If $p = 1/2$, then ''T'' is called a semi-hyponormal operator. Moreover, ''T'' is said to be log-hyponormal if it is invertible and
:$\log (T^*T) \ge \log (TT^*).$
An invertible ''p''-hyponormal operator is log-hyponormal. On the other hand, not every log-hyponormal is ''p''-hyponormal.

The class of semi-hyponormal operators was introduced by Xia, and the class of p-hyponormal operators was studied by Aluthge, who used what is today called the Aluthge transformation.

Every subnormal operator (in particular, a normal operator) is hyponormal, and every hyponormal operator is a paranormal convexoid operator. Not every paranormal operator is, however, hyponormal.

See also

* Putnam’s inequality

References

*

Operator theory
Linear operators

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