$C^{1,1}$ Pseudohermitian, Torsion-free Manifolds
Abstract: Riemannian Manifolds may be $C{1,1}$ and the geometry of these manifolds is investigated in \cite{Groah1}. Here, a similar analysis is given for pseudohermitian, torsion-free manifolds whereby, instead of assuming that the metric is parallel, it is assumed that the metric is pseudohermitian, a condition adopted by Einstein and elaborated upon in \cite{Hlavaty}. At the level of regularity assumed here, Einstein's formulation of the pseudohermitian condition is not tensorial and so a reformulation of this condition is given here. It is shown that a $C{1,1}$ manifold is pseudohermitian and torsion-free if and only if it is Riemannian.
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