Resolvent algebra in Fock-Bargmann representation (2208.06591v1)

Abstract: The resolvent algebra $\mathcal{R}(X, \sigma)$ associated to a symplectic space $(X, \sigma)$ was introduced by D. Buchholz and H. Grundling as a convenient model of the canonical commutation relation (CCR) in quantum mechanics. We first study a representation of $\mathcal{R}(\mathbb{C}^n, \sigma)$ with the standard symplectic form $\sigma$ inside the full Toeplitz algebra over the Fock-Bargmann space. We prove that $\mathcal{R}(\mathbb{C}^n, \sigma)$ itself is a Toeplitz algebra. In the sense of R. Werner's correspondence theory we determine its corresponding shift-invariant and closed space of symbols. Finally, we discuss a representation of the resolvent algebra $\mathcal{R}(\mathcal{H}, \tilde{\sigma})$ for an infinite dimensional symplectic separable Hilbert space $(\mathcal{H}, \tilde{\sigma})$. More precisely, we find a representation of $\mathcal{R}(\mathcal{H}, \tilde{\sigma})$ inside the full Toeplitz algebra over the Fock-Bargmann space in infinitely many variables.