Seidel's Representation on the Hamiltonian Group of a Cartesian Product
Abstract
Let (M,ω) be a closed symplectic manifold and Ham(M,ω) the group of Hamiltonian diffeomorphisms of (M,ω). Then the Seidel homomorphism is a map from the fundamental group of Ham(M,ω) to the quantum homology ring QH*(M;). Using this homomorphism we give a sufficient condition for when a nontrivial loop in Ham(M,ω) determines a nontrivial loop ×idN in Ham(M× N,ωη), where (N,η) is a closed symplectic manifold such that π2(N)=0.
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