Semicircular elements induced by p-adic number fields
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wersja wydawnicza
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pp. 665-703
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Bibliogr. 701-703.
Abstract
In this paper, we study semicircular-like elements, and semicircular elements induced by $p$-adic analysis, for each prime $p$. Starting from a $p$-adic number field $\mathbb{Q}{p}$, we construct a Banach $∗$-algebra $\mathfrak{LS}{p}$, for a fixed prime $p$, and show the generating elements $Q_{p,j}$ of $\mathfrak{LS}{p}$ form weighted-semicircular elements, and the corresponding scalar-multiples $\Theta{p,j}$ of $Q_{p,j}$ become semicircular elements, for all $j\in\mathbb{Z}$. The main result of this paper is the very construction of suitable linear functionals $\tau_{p,j}^{0}$ on $\mathfrak{LS}{p}$, making $Q{p,j}$ be weighted-semicircular, for all $j\in\mathbb{Z}$.

