Self-Similarity and Universality in Chua's Circuit via the Approximate Chua's 1-D Map
A.P. Kuznetsov and S.P. Kuznetsov and I.R. Sataev and Leon O. Chua
EECS Department, University of California, Berkeley
Technical Report No. UCB/ERL M93/15
, 1993
http://www2.eecs.berkeley.edu/Pubs/TechRpts/1993/ERL-93-15.pdf
In this paper we investigate the features of the transition to chaos in a one-dimensional Chua's map which describes approximately the Chua's circuit. These features arise from the nonunimodality of this map. We show that there exists a variety of types of critical points, which are characterized by a universal self-similar topography in a neighborhood of each critical point in the parameter plane. Such universalities are associated with various cycles of the Feigenbaum's renormalization group equation.
BibTeX citation:
@techreport{Kuznetsov:M93/15,
Author= {Kuznetsov, A.P. and Kuznetsov, S.P. and Sataev, I.R. and Chua, Leon O.},
Title= {Self-Similarity and Universality in Chua's Circuit via the Approximate Chua's 1-D Map},
Year= {1993},
Month= {Feb},
Url= {http://www2.eecs.berkeley.edu/Pubs/TechRpts/1993/2290.html},
Number= {UCB/ERL M93/15},
Abstract= {In this paper we investigate the features of the transition to chaos in a one-dimensional Chua's map which describes approximately the Chua's circuit. These features arise from the nonunimodality of this map. We show that there exists a variety of types of critical points, which are characterized by a universal self-similar topography in a neighborhood of each critical point in the parameter plane. Such universalities are associated with various cycles of the Feigenbaum's renormalization group equation.},
}
EndNote citation:
%0 Report %A Kuznetsov, A.P. %A Kuznetsov, S.P. %A Sataev, I.R. %A Chua, Leon O. %T Self-Similarity and Universality in Chua's Circuit via the Approximate Chua's 1-D Map %I EECS Department, University of California, Berkeley %D 1993 %@ UCB/ERL M93/15 %U http://www2.eecs.berkeley.edu/Pubs/TechRpts/1993/2290.html %F Kuznetsov:M93/15