Shahid Bahonar University of Kerman
Abstract: In this paper a class of chaotic vector fields in $R^{3}$ is considered. We prove its chaotic behavior by using of the topological entropy of a class of interval maps with finite number of discontinuities. Semi-Lorenz maps from the viewpoint of topological entropy are studied and it is proved that they have positive topological entropies. A kind of bifurcation by presenting a class of one parameter families of interval maps is studied.
Keywords: Topological entropy; Interval maps; Semi-Lorenz map; Chaotic vector fields
Classification (MSC2000): 37B40; 37D45
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