Adelic analysis and functional analysis on the finite Adele ring

Abstract

In this paper, we study operator theory on the $∗$-algebra $\mathcal{M}{\mathcal{P}}$, consisting of all measurable functions on the finite Adele ring $A{\mathbb{Q}}$, in extended free-probabilistic sense. Even though our $∗$-algebra $\mathcal{M}{\mathcal{P}}$ is commutative, our Adelic-analytic data and properties on $\mathcal{M}{\mathcal{P}}$ are understood as certain free-probabilistic results under enlarged sense of (noncommutative) free probability theory (well-covering commutative cases). From our free-probabilistic model on $A_{\mathbb{Q}}$, we construct the suitable Hilbert-space representation, and study a $C∗$-algebra $M_{\mathcal{P}}$ generated by $\mathcal{M}{\mathcal{P}}$ under representation. In particular, we focus on operator-theoretic properties of certain generating operators on $M{\mathcal{P}}$.