S
Steven H. Strogatz
Researcher at Cornell University
Publications - 227
Citations - 92888
Steven H. Strogatz is an academic researcher from Cornell University. The author has contributed to research in topics: Josephson effect & Kuramoto model. The author has an hindex of 79, co-authored 219 publications receiving 85750 citations. Previous affiliations of Steven H. Strogatz include Boston College & Purdue University.
Papers
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Book ChapterDOI
Norbert Wiener’s Brain Waves
TL;DR: In the late 1950’s Norbert Wiener became interested in the spectrum of human brain waves (Wiener 1958, 1961), and made high-resolution electroencephalographic recordings from subjects who were awake but resting with their eyes closed.
Journal Article
Scaling Law of Urban Ride Sharing
Remi Tachet,Oleguer Sagarra,Paolo Santi,Giovanni Resta,Michael Szell,Steven H. Strogatz,Carlo Ratti +6 more
TL;DR: In this paper, the authors compute the shareability curves for each city, and find that a natural rescaling collapses them onto a single, universal curve, and explain this scaling law theoretically with a simple model that predicts the potential for ride sharing in any city, using a few basic urban quantities and no adjustable parameters.
Journal ArticleDOI
Mean-field behavior in coupled oscillators with attractive and repulsive interactions.
Hyunsuk Hong,Steven H. Strogatz +1 more
TL;DR: A variant of the Kuramoto model of coupled oscillators in which both attractive and repulsive pairwise interactions are allowed, and it is found, unexpectedly, that the mixed interactions produce no new effects.
Book ChapterDOI
Dynamics on Expanding Spaces: Modeling the Emergence of Novelties
TL;DR: In this article, the authors review the scientific attempts to effectively model the emergence of the new and its regularities, with an emphasis on more recent contributions: from the plain Simon's model tracing back to the 1950s, to the newest model of Polya's urn with triggering of one novelty by another.
Journal ArticleDOI
Singular filaments organize chemical waves in three dimensions: I. Geometrically simple waves
TL;DR: In this article, a series of papers on the anatomy of three-dimensional dissipative structures in excitable media is presented, where the authors describe the propagation of chemical waves in such media first in terms of phase in a cycle of excitation and relaxation, and then in the terms of chemical concentration surfaces.