Essential loops in completions of Hamiltonian groups
Abstract
We initiate the study of the fundamental group of natural completions of the group of Hamiltonian diffeomorphisms, namely its C0-closure Ham(M,ω) and its completion with respect to the spectral norm Ham(M,ω). We prove that in some situations, namely complex projective spaces and rational Hirzebruch surfaces, certain Hamiltonian loops that were known to be non-trivial in π1(Ham(M,ω)) remain non-trivial in π1(Ham(M,ω)). This yields in particular cases, including C P2 and the monotone S2× S2, the injectivity of the map π1(Ham(M,ω))π1(Ham(M,ω)) induced by the inclusion. The same results hold for the Hofer completion of Ham(M,ω). Moreover, whenever the spectral norm is known to be C0-continuous, they also hold for Ham(M,ω). Our method relies on computations of the valuation of Seidel elements and hence of the spectral norm on π1(Ham(M,ω)). Some of these computations were known before, but we also present new ones which might be of independent interest. For example, we show that the spectral pseudo-norm is degenerate when (M,ω) is any non-monotone S2× S2. At the contrary, it is a genuine norm when M is the 1-point blow-up of C P2; it is unbounded for small sizes of the blow-up and become bounded starting at the monotone one.
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