Philippe M. Binder
University of Hawaii at Hilo
62 Papers
216 Citations
Philippe M. Binder is an academic researcher from University of Hawaii at Hilo. The author has contributed to research in topics: Cellular automaton & Subdwarf. The author has an hindex of 16, co-authored 59 publications. Previous affiliations of Philippe M. Binder include Los Alamos National Laboratory & Yale University.
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Papers
Simulating chaotic behavior with finite-state machines
TL;DR: Although this result questions the validity of digital computer simulations of chaos, it is found that the statistical properties of the continuous equation, such as the invariant probability distribution and the Lyapunov exponent, are preserved in these cycles.
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Life's demons: information and order in biology
TL;DR: To make use of the full potential of synthetic biology to manipulate living systems, new concepts and hypotheses must be developed about the way in which cells process information; does a genuine Maxwell's Demon exist inside living organisms?
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The pulsating hot subdwarf Balloon 090100001: results of the 2005 multisite campaign
Andrzej S. Baran,R. Oreiro,R. Oreiro,A. Pigulski,F. Pérez Hernández,F. Pérez Hernández,A. Ulla,Michael D. Reed,Cristina Rodríguez-López,Cristina Rodríguez-López,Cristina Rodríguez-López,Pawel Moskalik,Seung-Lee Kim,Wen Ping Chen,R. Crowe,Michal Siwak,L. Armendarez,Philippe M. Binder,K. J. Choo,A. Dye,J. R. Eggen,R. Garrido,J. M. Gonzalez Perez,S. L. Harms,F. Y. Huang,Dorota Kozieł,H. T. Lee,James M. MacDonald,L. Fox Machado,L. Fox Machado,T. Monserrat,J. Stevick,S. Stewart,D. Terry,A.-Y. Zhou,A.-Y. Zhou,Stanisław Zoła,Stanisław Zoła +37 more
TL;DR: In this paper, the results of a multisite photometric campaign on the pulsating B-type hot subdwarf star Balloon090100001 (Bal09) were presented.
Limit cycles in a quadratic discrete iteration
TL;DR: In this article, the authors study the truncated logistic equation as a map of D integers, and the number of limit cycles and the size of longest cycle are averaged exhaustively over many values of D for parameter values a beyond the first accumulation point.
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Breakdown of the Boltzmann equation in cellular-automata lattice gases.
TL;DR: In lattice gases the Boltzmann equation is not valid at low densities, if the collision rules admit reflections of unlike particles because of long-lived correlated ring-type collisions.
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