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A class of tridiagonal operators associated to some subshifts

Christian Hernández-Becerra, Benjamín A. Itzá-Ortiz (2016)

Open Mathematics

We consider a class of tridiagonal operators induced by not necessary pseudoergodic biinfinite sequences. Using only elementary techniques we prove that the numerical range of such operators is contained in the convex hull of the union of the numerical ranges of the operators corresponding to the constant biinfinite sequences; whilst the other inclusion is shown to hold when the constant sequences belong to the subshift generated by the given biinfinite sequence. Applying recent results by S. N....

A convex treatment of numerical radius inequalities

Zahra Heydarbeygi, Mohammad Sababheh, Hamid Moradi (2022)

Czechoslovak Mathematical Journal

We prove an inner product inequality for Hilbert space operators. This inequality will be utilized to present a general numerical radius inequality using convex functions. Applications of the new results include obtaining new forms that generalize and extend some well known results in the literature, with an application to the newly defined generalized numerical radius. We emphasize that the approach followed in this article is different from the approaches used in the literature to obtain such...

A lower bound of the norm of the operator X → AXB + BXA.

Mohamed Barraa, Mohamed Boumazgour (2001)

Extracta Mathematicae

A numerical radius inequality and an estimate for the numerical radius of the Frobenius companion matrix

Fuad Kittaneh (2003)

Studia Mathematica

It is shown that if A is a bounded linear operator on a complex Hilbert space, then $w (A) \leq 1 / 2 (| | A | | + | | A ² | |^{1 / 2})$ , where w(A) and ||A|| are the numerical radius and the usual operator norm of A, respectively. An application of this inequality is given to obtain a new estimate for the numerical radius of the Frobenius companion matrix. Bounds for the zeros of polynomials are also given.

A numerical radius inequality involving the generalized Aluthge transform

Amer Abu Omar, Fuad Kittaneh (2013)

Studia Mathematica

A spectral radius inequality is given. An application of this inequality to prove a numerical radius inequality that involves the generalized Aluthge transform is also provided. Our results improve earlier results by Kittaneh and Yamazaki.

A -range and φ- spatial Numerical range of a Tensor

Thanassis Chryssakis (2000)

Δελτίο της Ελληνικής Μαθηματικής Εταιρίας

A space by W. Gowers and new results on norm and numerical radius attaining operators

Maria D. Acosta, Francisco J. Aguirre, Rafael Payá (1992)

Acta Universitatis Carolinae. Mathematica et Physica

A survey of some recent inequalities for the norm and numerical radius of operators in Hilbert spaces.

Dragomir, Sever S. (2007)

Banach Journal of Mathematical Analysis [electronic only]

A survey on the numerical index of a Banach space.

Miguel Martín (2000)

Extracta Mathematicae

Alcune osservazioni sul rango numerico per operatori non lineari

Jürgen Appell, G. Conti, Paola Santucci (1999)

Mathematica Bohemica

We discuss some numerical ranges for Lipschitz continuous nonlinear operators and their relations to spectral sets. In particular, we show that the spectrum defined by Kachurovskij (1969) for Lipschitz continuous operators is contained in the so-called polynomial hull of the numerical range introduced by Rhodius (1984).

An alternative polynomial Daugavet property

Elisa R. Santos (2014)

Studia Mathematica

We introduce a weaker version of the polynomial Daugavet property: a Banach space X has the alternative polynomial Daugavet property (APDP) if every weakly compact polynomial P: X → X satisfies $m a x_{ω \in} | | I d + ω P | | = 1 + | | P | |$ . We study the stability of the APDP by c₀-, $ℓ_{\infty}$ - and ℓ₁-sums of Banach spaces. As a consequence, we obtain examples of Banach spaces with the APDP, namely $L_{\infty} (μ, X)$ and C(K,X), where X has the APDP.

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