Let $X$ be a complex manifold with strongly pseudoconvex boundary $M$. If $\psi$ is a defining function for $M$, then $-\log\psi$ is plurisubharmonic on a neighborhood of $M$ in $X$, and the (real) 2-form $\sigma = i \del \delbar(-\log \psi)$ is a symplectic structure on the complement of $M$ in a neighborhood in $X$ of $M$; it blows up along $M$. The Poisson structure obtained by inverting $\sigma$ extends smoothly across $M$ and determines a contact structure on $M$ which is the same as the one induced by the complex structure. When $M$ is compact, the Poisson structure near $M$ is completely determined up to isomorphism by the contact structure on $M$. In addition, when $-\log\psi$ is plurisubharmonic throughout $X$, and $X$ is compact, bidifferential operators constructed by Engli\v{s} for the Berezin-Toeplitz deformation quantization of $X$ are smooth up to the boundary. The proofs use a complex Lie algebroid determined by the CR structure on $M$, along with some ideas of Epstein, Melrose, and Mendoza concerning manifolds with contact boundary
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