A nonautonomous Cr-topological equivalence involving contractions and unbounded nonlinearities
Abstract
We study the smoothness of the topological equivalence between a linear equation and its nonlinear perturbation, which is regarded as unbounded. To the best of our knowledge, it has not previously been considered such study in the literature. Therefore, the main result of this work copes with this lack, that is, it is shown, on the positive half line, that such topological equivalence is of class Cr (r ≥ 1) when the linear part is a uniform contraction and the nonlinearities considered are unbounded.
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