Hamiltonian symplectomorphisms and the Berry phase

Abstract

On the space L, of loops in the group of Hamiltonian symplectomorphisms of a symplectic quantizable manifold, we define a closed Z-valued 1-form . If vanishes, the prequantization map can be extended to a group representation. On L one can define an action integral as an R/ Z-valued function, and the cohomology class [] is the obstruction to the lifting of that action integral to an R-valued function. The form also defines a natural grading on π1( L).

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