M
Martin Hasler
Researcher at École Polytechnique Fédérale de Lausanne
Publications - 121
Citations - 4574
Martin Hasler is an academic researcher from École Polytechnique Fédérale de Lausanne. The author has contributed to research in topics: Synchronization of chaos & Chaotic. The author has an hindex of 30, co-authored 121 publications receiving 4433 citations. Previous affiliations of Martin Hasler include Bedford College.
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Journal ArticleDOI
Chaos shift keying: modulation and demodulation of a chaotic carrier using self-synchronizing Chua's circuits
TL;DR: In this article, a technique for transmitting digital information using a chaotic carrier is described, in which each symbol to be transmitted is coded as an attractor in Chua's circuit.
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Connectivity in ad-hoc and hybrid networks
TL;DR: It is found that the introduction of a sparse network of base stations does significantly help in increasing the connectivity, but only when the node density is much larger in one dimension than in the other.
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Communication by chaotic signals : the inverse system approach
TL;DR: The inverse of a non-linear dynamical system is introduced and its synchronization with the original system is discussed, finding that in an inverse system with reduced order it is easier to achieve synchronization; on the other hand, such a system may distort a noisy input signal considerably.
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Synchronization and Graph Topology
TL;DR: It is shown that synchronization in scale-free networks can be described by means of regular networks with a star-like coupling structure and how global stability of synchronization depends on the parameters of the individual oscillator is demonstrated.
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An introduction to the synchronization of chaotic systems: coupled skew tent maps
Martin Hasler,Yuri Maistrenko +1 more
TL;DR: In this paper, the Lyapunov exponents transversal to the synchronization manifold are used to explain the locally riddled basins of attraction in skew tent maps, leading to quite different global dynamic behavior especially when the ideal system is perturbed by parameter mismatch or noise.