On generic G-prevalent properties of Cr diffeomorphisms of S1 and a quantitative K-S theorem
Abstract
We will consider a convex unbounded set and certain group of actions G on this set. This will substitute the translation (by adding) structure usually consider in the classical setting of prevalence. In this way we will be able to define the meaning of G-prevalent set. In this setting we will show a kind of quantitative Kupka-Smale Theorem and also a result about rotation numbers which was first consider by J.-C. Yoccoz (and, also by M. Tsujii).
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