Bifurcation structure in the skew tent map and its application as a border collision normal form

I Sushko, V Avrutin, L Gardini - Journal of Difference Equations and …, 2016 - Taylor & Francis
Journal of Difference Equations and Applications, 2016Taylor & Francis
The goal of the present paper is to collect the results related to dynamics of a one-
dimensional piecewise linear map widely known as the skew tent map. These results may
be useful for the researchers working on theoretical and applied problems in the field of
nonsmooth dynamical systems. In particular, we propose the complete description of the
bifurcation structure of the parameter space of the skew tent map, providing the related
proofs. It is also shown how these results can be used to classify border collision bifurcations …
The goal of the present paper is to collect the results related to dynamics of a one-dimensional piecewise linear map widely known as the skew tent map. These results may be useful for the researchers working on theoretical and applied problems in the field of nonsmooth dynamical systems. In particular, we propose the complete description of the bifurcation structure of the parameter space of the skew tent map, providing the related proofs. It is also shown how these results can be used to classify border collision bifurcations in one-dimensional piecewise smooth maps.
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