On the existence of local quaternionic contact geometries
Abstract
We exploit the Cartan-K\"ahler theory to prove the local existence of real analytic quaternionic contact structures for any prescribed values of the respective curvature functions and their covariant derivatives at a given point on a manifold. We show that, in a certain sense, the different real analytic quaternionic contact geometries in 4n+3 dimensions depend, modulo diffeomorphisms, on 2n+2 real analytic functions of 2n+3 variables.
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