In mathematics, especially operator theory, a paranormal operator is a generalization of a normal operator. More precisely, a bounded linear operator T on a complex Hilbert space H is said to be paranormal if:
for every unit vector x in H.
The class of paranormal operators was introduced by V. Istratescu in 1960s, though the term "paranormal" is probably due to Furuta. [1] [2]
Every hyponormal operator (in particular, a subnormal operator, a quasinormal operator and a normal operator) is paranormal. If T is a paranormal, then Tn is paranormal. [2] On the other hand, Halmos gave an example of a hyponormal operator T such that T2 isn't hyponormal. Consequently, not every paranormal operator is hyponormal. [3]
A compact paranormal operator is normal. [4]
References
- ^ Istrăţescu, V. (1967). "On some hyponormal operators". Pacific Journal of Mathematics. 22: 413–417. MR 0213893.
- ^ a b Furuta, Takayuki (1967). "On the class of paranormal operators". Proceedings of the Japan Academy. 43: 594–598. MR 0221302.
- ^ Halmos, Paul Richard (1982). A Hilbert Space Problem Book. Encyclopedia of Mathematics and its Applications. Vol. 17 (2nd ed.). Springer-Verlag, New York-Berlin. ISBN 0-387-90685-1. MR 0675952.
- ^ Furuta, Takayuki (1971). "Certain convexoid operators". Proceedings of the Japan Academy. 47: 888–893. MR 0313864.
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