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PETRŽELA, J.
Original Title
Binary memory with orthogonal eigenspaces: from stable states to chaotic oscillations
Type
journal article in Web of Science
Language
English
Original Abstract
This short paper demonstrates numerically and experimentally observed transitions between the stable states, regular and chaotic oscillations in the case of state representations of binary memory transformed into the Jordan form. Math model of original memory describes simple anti-series connection of two resonant tunneling diodes (RTDs). Derived third-order dynamical system is analyzed with respect to global behavior and, consequently, implemented as lumped analog circuit with piecewise linear (PWL) vector field. Oscilloscope screenshots prove that chaotic motion of binary memory is robust.
Keywords
binary memory; chaos; piecewise linear; stable states; strange attractors
Authors
Released
26. 3. 2020
Publisher
Springer
Location
Francie
ISBN
1951-6355
Periodical
European Physical Journal-Special Topics
Year of study
229
Number
1
State
French Republic
Pages from
1021
Pages to
1032
Pages count
12
URL
https://link.springer.com/article/10.1140/epjst/e2020-900242-1
BibTex
@article{BUT163198, author="Jiří {Petržela}", title="Binary memory with orthogonal eigenspaces: from stable states to chaotic oscillations", journal="European Physical Journal-Special Topics", year="2020", volume="229", number="1", pages="1021--1032", doi="10.1140/epjst/e2020-900242-1", issn="1951-6355", url="https://link.springer.com/article/10.1140/epjst/e2020-900242-1" }