Resolvents of Functions of Operators with Hilbert-Schmid Hermitian Components
Abstract
Let $\cH$ be a separable Hilbertspace with the unit operator $I$.
We derive a sharp norm estimate for the operator function
$(\la I-f(A))\mi$ $(\la\in\bc)$,
where $A$ is a bounded linear operator in $\cH$ whose Hermitian component $(A-A^*)/2i$
is a Hilbert-Schmidt operator
and $f(z)$ is a function holomorphic on
the convex hull of the spectrum of $A$.
Here $A^*$ is the operator
adjoint to $A.$
Applications of the
obtained estimate to
perturbations of operator equations, whose coefficients are operator functions
and localization of spectra
are also discussed.
We derive a sharp norm estimate for the operator function
$(\la I-f(A))\mi$ $(\la\in\bc)$,
where $A$ is a bounded linear operator in $\cH$ whose Hermitian component $(A-A^*)/2i$
is a Hilbert-Schmidt operator
and $f(z)$ is a function holomorphic on
the convex hull of the spectrum of $A$.
Here $A^*$ is the operator
adjoint to $A.$
Applications of the
obtained estimate to
perturbations of operator equations, whose coefficients are operator functions
and localization of spectra
are also discussed.
Refbacks
- There are currently no refbacks.