Aluthge transform

In mathematics and more precisely in functional analysis, the Aluthge transformation is an operation defined on the set of bounded operators of a Hilbert space. It was introduced by Ariyadasa Aluthge to study p-hyponormal linear operators.^[1]

Definition

Let ${\displaystyle H}$  be a Hilbert space and let ${\displaystyle B(H)}$  be the algebra of linear operators from ${\displaystyle H}$  to ${\displaystyle H}$ . By the polar decomposition theorem, there exists a unique partial isometry ${\displaystyle U}$  such that ${\displaystyle T=U|T|}$  and ${\displaystyle \ker(U)\supset \ker(T)}$ , where ${\displaystyle |T|}$  is the square root of the operator ${\displaystyle T^{*}T}$ . If ${\displaystyle T\in B(H)}$  and ${\displaystyle T=U|T|}$  is its polar decomposition, the Aluthge transform of ${\displaystyle T}$  is the operator ${\displaystyle \Delta (T)}$  defined as:

${\displaystyle \Delta (T)=|T|^{\frac {1}{2}}U|T|^{\frac {1}{2}}.}$ 

More generally, for any real number ${\displaystyle \lambda \in [0,1]}$ , the ${\displaystyle \lambda }$ -Aluthge transformation is defined as

${\displaystyle \Delta _{\lambda }(T):=|T|^{\lambda }U|T|^{1-\lambda }\in B(H).}$ 

Example

For vectors ${\displaystyle x,y\in H}$ , let ${\displaystyle x\otimes y}$  denote the operator defined as

${\displaystyle \forall z\in H\quad x\otimes y(z)=\langle z,y\rangle x.}$ 

An elementary calculation^[2] shows that if ${\displaystyle y\neq 0}$ , then ${\displaystyle \Delta _{\lambda }(x\otimes y)=\Delta (x\otimes y)={\frac {\langle x,y\rangle }{\lVert y\rVert ^{2}}}y\otimes y.}$ 

Notes

1. Aluthge, Ariyadasa (1990). "On p-hyponormal operators for 0 < p < 1". Integral Equations Operator Theory. 13 (3): 307–315. doi:10.1007/bf01199886.
2. Chabbabi, Fadil; Mbekhta, Mostafa (June 2017). "Jordan product maps commuting with the λ-Aluthge transform". Journal of Mathematical Analysis and Applications. 450 (1): 293–313. doi:10.1016/j.jmaa.2017.01.036.

References

• Antezana, Jorge; Pujals, Enrique R.; Stojanoff, Demetrio (2008). "Iterated Aluthge transforms: a brief survey". Revista de la Unión Matemática Argentina. 49: 29–41.

External links

• Ariyadasa Aluthge at the Mathematics Genealogy Project