Let $M$ be a closed manifold, with dimension $2n+1$. Let $F(M)$ be the frame bundle, a principal $GL(2n+1,\mathbb{R})$-bundle over $M$. An almost CR structure $P$ on $M$ is a structure group reduction of $F(M)$ to the subgroup of $GL(2n+1,\mathbb{R})$ given by $$ \begin{bmatrix} A & x\\ 0 & \tilde x \end{bmatrix}, $$ where $A\in GL(n,\mathbb{C})$, $x\in \mathbb{R}^{2n}$, and $\tilde x\in \mathbb{R}^\times$. (Webster, 1978). Let $G_0$ denote the aforementioned group.
In general, a $G$-structure is integrable if we can select charts on $M$ such that the corresponding frames are elements of the structure group reduction, and integrability of a $G$-structure corresponds to a notion of flatness (Kobayashi). For example, a Riemannian metric is a reduction of the frame bundle to $O(n)$, and an integrable $O(n)$-structure corresponds to a Riemannian metric with vanishing curvature.
Questions: What is the corresponding notion of integrability for almost CR structures? If $M$ has an almost integrable CR structure, is it a hyperplane in $\mathbb{C}^{n+1}$?
