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The total space of cotangent bundle of any manifold M$M$ is a symplectic manifold.
Is it true\false\unknowntrue/false/unknown that for any M$M$, $T^*M$ has Kähler structure?
Please support your claim with reference or counterexample.
The total space of cotangent bundle of any manifold M is a symplectic manifold.
Is it true\false\unknown that for any M, $T^*M$ has Kähler structure?
The total space of cotangent bundle of any manifold $M$ is a symplectic manifold.
Is it true/false/unknown that for any $M$, $T^*M$ has Kähler structure?
Is it true\false\unknown that for any M, $T^*M$ has kahlerKähler structure?
Is it true\false\unknown that for any M, $T^*M$ has kahler structure?
