The set of maps Fa,b: x -> x+a+b/2 pi sin(2 pi x) with any given rotation interval is contractible
Abstract
Consider the two-parameter family of real analytic maps Fa,b:x x+ a+b 2π (2π x) which are lifts of degree one endomorphisms of the circle. The purpose of this paper is to provide a proof that for any closed interval I, the set of maps Fa,b whose rotation interval is I, form a contractible set.
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