CR manifold

In mathematics, a CR manifold, or Cauchy–Riemann manifold,^[1] is a differentiable manifold together with a geometric structure modeled on that of a real hypersurface in a complex vector space, or more generally modeled on an edge of a wedge.

Formally, a CR manifold is a differentiable manifold M together with a preferred complex distribution L, or in other words a complex subbundle of the complexified tangent bundle $\mathbb {C} TM=TM\otimes _{\mathbb {R} }\mathbb {C}$ such that

$[L,L]\subseteq L$ (L is formally integrable)
$L\cap {\bar {L}}=\{0\}$ .

The subbundle L is called a CR structure on the manifold M.

The abbreviation CR stands for "Cauchy–Riemann" or "Complex-Real".^[1]^[2]

^ ^a ^b Lempert, László (1997). "Spaces of Cauchy-Riemann Manifolds". Advanced Studies in Pure Mathematics. CR-Geometry and Overdetermined Systems. 25: 221–236. doi:10.2969/aspm/02510221. ISBN 978-4-931469-75-4.
^ "Mathematical Sciences Research Institute - CR Geometry: Complex Analysis Meets Real Geometry and Number Theory". secure.msri.org. Archived from the original on 26 March 2012. Retrieved 12 January 2022.

[Lempert-1] Lempert, László (1997). "Spaces of Cauchy-Riemann Manifolds". Advanced Studies in Pure Mathematics. CR-Geometry and Overdetermined Systems. 25: 221–236. doi:10.2969/aspm/02510221. ISBN 978-4-931469-75-4.

[2] "Mathematical Sciences Research Institute - CR Geometry: Complex Analysis Meets Real Geometry and Number Theory". secure.msri.org. Archived from the original on 26 March 2012. Retrieved 12 January 2022.

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