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arxiv: 1409.4004 · v3 · pith:2MFTEB3Onew · submitted 2014-09-14 · 🧮 math.DG

Scalar Curvature Functions of Almost-K\"ahler Metrics

classification 🧮 math.DG
keywords symplecticomegasmoothahleralmost-kdeformationmanifoldmetrics
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For a closed smooth manifold $M$ admitting a symplectic structure, we define a smooth topological invariant $Z(M)$ using almost-K\"ahler metrics, i.e. Riemannian metrics compatible with symplectic structures. We also introduce $Z(M, [[\omega]])$ depending on symplectic deformation equivalence class $[[\omega]]$. We first prove that there exists a 6-dimensional smooth manifold $M$ with more than one deformation equivalence classes with different signs of $Z(M, [[\omega]] )$. Using $Z$ invariants, we set up a Kazdan-Warner type problem of classifying symplectic manifolds into three categories. We finally prove that on every closed symplectic manifold $(M, \omega)$ of dimension $\geq 4$, any smooth function which is somewhere negative and somewhere zero can be the scalar curvature of an almost-K\"ahler metric compatible with a symplectic form which is deformation equivalent to $\omega$.

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