One-parameter families of circle diffeomorphisms with strictly monotone rotation number
Abstract
We show that if f S1 × S1 S1 × S1 is C2, with f(x, t) = (ft(x), t), and the rotation number of ft is equal to t for all t ∈ S1, then f is topologically conjugate to the linear Dehn twist of the torus (1&1 0&1). We prove a differentiability result where the assumption that the rotation number of ft is t is weakened to say that the rotation number is strictly monotone in t.
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