论文信息 - The roots of polynomials and the operator $$\Delta _i^3$$ on the Hahn sequence space h

The roots of polynomials and the operator $$\Delta _i^3$$ on the Hahn sequence space h

In this paper, we define the third order generalized difference operator $$\Delta _i^3$$ , where $$\begin{aligned} (\Delta _i^3x)_k=\sum _{i=0}^3\frac{(-1)^i}{i+1}\left( {\begin{array}{c}3\\ i\end{array}}\right) x_{k-i}= x_k-\frac{3}{2}x_{k-1}+x_{k-2}-\frac{1}{4}x_{k-3}, \end{aligned}$$ and show that it is a linear bounded operator on the Hahn sequence space h. Then we study the spectrum and point spectrum of the operator $$\Delta _i^3$$ on h. Furthermore, we determine the point spectrum of the adjoint of this operator. This is achieved by studying some properties of the roots of certain third order polynomials.

Gradimir V. Milovanović | Eberhard Malkowsky | Vladimir Rakočević | Orhan Tuğ

[1] The Hahn Sequence Space Defined by the Cesáro Mean , 2013 .

[2] Y. Sawano,et al. Fine spectra of the discrete generalized Cesàro operator on Banach sequence spaces , 2020 .

[3] P. J. Davis,et al. Introduction to functional analysis , 1958 .

[5] S. Dutta,et al. On certain Toeplitz matrices via difference operator and their applications , 2016 .

[6] Sudarsan Nanda,et al. Functional analysis with applications , 1989 .

[7] V. Rakocević,et al. Advanced Functional Analysis , 2019 .

[8] Eberhard Malkowsky,et al. Compact operators on the Hahn space , 2021, Monatshefte für Mathematik.

[9] H. Hahn. Über Folgen linearer Operationen , 1922 .

[10] M. Kirişci,et al. On the fine spectrum of the forward difference operator on the Hahn space , 2014 .