Growth Conditions for Operators With Smallest Spectrum

Abstract: Let A be an invertible operator on a complex Banach space X. For a given α ≥ 0, we define the class $\mathcal{D}$Aα(ℤ) (resp. $\mathcal{D}$Aα (ℤ+)) of all bounded linear operators T on X for which there exists a constant CT>0, such that $ \begin{equation*} \Vert A^{n}TA^{-n}\Vert \leq C_{T}\left( 1+\left\vert n\right\vert \right) ^{\alpha }, \end{equation*} $ for all n ∈ ℤ (resp. n∈ ℤ+). We present a complete description of the class $\mathcal{D}$Aα (ℤ) in the case when the spectrum of A is real or is a sin… Show more

“…More general results are obtained by Karaev and Mustafayev [9], Karaev and Pehlivan [8], Drissi and Mbekhta [4,5] and Mustafayev [12,13], see also references therein.…”

On some deddens subspaces of Banach algebras

“…More general results are obtained by Karaev and Mustafayev [9], Karaev and Pehlivan [8], Drissi and Mbekhta [4,5] and Mustafayev [12,13], see also references therein.…”

On some deddens subspaces of Banach algebras

“…For related results see also, [1,13]. For the proof of Theorem 2.2, we need some preliminary results.…”

Operators Whose Conjugation Orbits Satisfy Polynomial Growth Conditions