Generalized attracting horseshoe in the Rössler attractor
Document Type
Article
Publication Date
1-1-2021
Abstract
We show that there is a mildly nonlinear three-dimensional system of ordinary differential equations—realizable by a rather simple electronic circuit—capable of producing a generalized attracting horseshoe map. A system specifically designed to have a Poincaré section yielding the desired map is described, but not pursued due to its complexity, which makes the construction of a circuit realization exceedingly difficult. Instead, the generalized attracting horseshoe and its trapping region is obtained by using a carefully chosen Poincaré map of the Rössler attractor. Novel numerical techniques are employed to iterate the map of the trapping region to approximate the chaotic strange attractor contained in the generalized attracting horseshoe, and an electronic circuit is constructed to produce the map. Several potential applications of the idea of a generalized attracting horseshoe and a physical electronic circuit realization are proposed.
Identifier
85098777960 (Scopus)
Publication Title
Symmetry
External Full Text Location
https://doi.org/10.3390/sym13010030
e-ISSN
20738994
First Page
1
Last Page
12
Issue
1
Volume
13
Recommended Citation
Murthy, Karthik; Jordan, Ian; Sojitra, Parth; Rahman, Aminur; and Blackmore, Denis, "Generalized attracting horseshoe in the Rössler attractor" (2021). Faculty Publications. 4694.
https://digitalcommons.njit.edu/fac_pubs/4694
