MATEMATIČKI VESNIK
МАТЕМАТИЧКИ ВЕСНИК



MATEMATIČKI VESNIK
The Banach algebra $B(X)$, where $X$ is a BK space and applications
Bruno de Malafosse

Abstract

In this paper we give some properties of Banach algebras of bounded operators $B(X)$, when $X$ is a BK space. We then study the solvability of the equation $Ax=b$ for $b\in\{s_{\alpha },s_{\alpha}^{{{}^{\circ}}},s_{\alpha }^{( c)},l_{p}( \alpha)\}$ with $\alpha\in U^{+}$ and $1\leq p<\infty$. We then deal with the equation $T_{a}x=b$, where $b\in\chi(\Delta ^{k})$ for $k\geq 1$ integer, $\chi\in\{s_{\alpha },s_{\alpha }^{{{}^{\circ}}},s_{\alpha}^{(c)},l_{p}(\alpha)\}$, $1\leq p<\infty$ and $T_{a}$ is a Toeplitz triangle matrix. Finally we apply the previous results to infinite tridiagonal matrices and explicitly calculate the inverse of an infinite tridiagonal matrix. These results generalize those given in [4,~9].

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Keywords: Infinite linear system, sequence space, BK space, Banach algebra, bounded operator.

MSC: 40C05, 46A45

Pages:  41--60     

Volume  57 ,  Issue  1$-$2 ,  2005