Invariant graphs and dynamics of a family of continuous piecewise linear planar maps
Abstract
We consider the family of piecewise linear maps Fa,b(x,y)=(|x| - y + a, x - |y| + b), where (a,b)∈ R2. This family belongs to a wider one that has deserved some interest in the recent years as it provides a framework for generalized Lozi-type maps. Among our results, we prove that for a 0 all the orbits are eventually periodic and moreover that there are at most three different periodic behaviors formed by at most seven points. For a<0 we prove that for each b∈R there exists a compact graph , which is invariant under the map F, such that for each (x,y)∈ R2 there exists n∈N (that may depend on x) such that Fa,bn(x,y)∈ . We give explicitly all these invariant graphs and we characterize the dynamics of the map restricted to the corresponding graph for all (a,b)∈R2 obtaining, among other results, a full characterization of when Fa,b| has positive or zero entropy.
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