Wick quantization and asymptotic morphisms (Q2725486)

Let \(\overline{\mathbb C}\) be the compactification of the complex plane by the circle at infinity. For a compact metric pair \((X,Y)\) let \(E(X,Y)=E(C(X),C_0(X\setminus Y))\) denote the relative \(E\)-theory group introduced by the author [\textit{E. Guentner}, \(K\)-Theory 17, No. 1, 55-93 (1999; Zbl 0928.19002)]. The author shows how the Wick quantization of Toeplitz operators on the Fock space determines an element \([Q_t]\in E(\overline{\mathbb C},S^1)\). The operator \(\overline{\partial}\) also defines an element \([\overline{\partial}]\in E(\overline{\mathbb C},S^1)\). The main result of the paper is the equality \([Q_t]=[\overline{\partial}]\).