The twistor space of ${\mathbb{R}}^{4n}$ and Berezin-Toeplitz operators (2009.09040v2)
Abstract: A hyperk\"ahler manifold $M$ has a family of induced complex structures indexed by a two-dimensional sphere $S2 \cong \mathbb{CP}1$. The twistor space of $M$ is a complex manifold $Tw(M)$ together with a natural holomorphic projection $Tw(M) \to \mathbb{CP}1$, whose fiber over each point of $\mathbb{CP}1$ is a copy of $M$ with the corresponding induced complex structure. We remove one point from this sphere (corresponding to one fiber in the twistor space),and for the case of $M = \mathbb{R}{4n}$, $n\in\mathbb{N}$, equipped with the standard hyperk\"ahler structure, we construct one quantization that replaces the family of Berezin-Toeplitz quantizations parametrized by $S2-{ pt}$. We provide semiclassical asymptotics for this quantization.