A remark on the c--splitting conjecture
Abstract
Let M be a closed symplectic manifold and suppose M P B is a Hamiltonian fibration. Lalonde and McDuff raised the question whether one always has H*(P; Q)=H*(M; Q) H*(B; Q) as vector spaces. This is known as the c--splitting conjecture. They showed, that this indeed holds whenever the base is a sphere. Using their theorem we will prove the c--splitting conjecture for arbitrary base B and fibers M which satisfy a weakening of the Hard Lefschetz condition.
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