DOCSLIB.ORG

Table of Contents (Print, Part 2)

Total Page:16

File Type:pdf, Size:1020Kb

Download full-text PDF Read full-text
Table of Contents (Print, Part 2) PERIODICALS PHYSICAL REVIEW E Postmaster send address changes to: For editorial and subscription correspondence, APS Subscription Services please see inside front cover Suite 1NO1 „ISSN: 1539-3755… 2 Huntington Quadrangle Melville, NY 11747-4502 THIRD SERIES, VOLUME 76, NUMBER 4 CONTENTS OCTOBER 2007 PART 2: NONLINEAR AND PLASMA PHYSICS, FLUID DYNAMICS, AND RELATED TOPICS RAPID COMMUNICATIONS Interdisciplinary physics Component sizes in networks with arbitrary degree distributions (4 pages) ............................. 045101͑R͒ M. E. J. Newman How scale-free networks and large-scale collective cooperation emerge in complex homogeneous social systems (4 pages) ............................................................................ 045102͑R͒ Wei Li, Xiaoming Zhang, and Gang Hu Modular networks emerge from multiconstraint optimization (4 pages) ................................ 045103͑R͒ Raj Kumar Pan and Sitabhra Sinha Chaos and pattern formation Versatile and robust chaos synchronization phenomena imposed by delayed shared feedback coupling (4 pages) ................................................................................... 045201͑R͒ Michael Peil, Laurent Larger, and Ingo Fischer Negative filament tension of scroll rings in an excitable system (4 pages) .............................. 045202͑R͒ Tamás Bánsági, Jr. and Oliver Steinbock Fluid dynamics Dynamics of thin liquid films falling on vertical cylindrical surfaces subjected to ultrasound forcing (4 pages) ................................................................................... 045301͑R͒ Len Moldavsky, Mati Fichman, and Alexander Oron Computational physics Efficient parallel tempering for first-order phase transitions (4 pages) .................................. 045701͑R͒ T. Neuhaus, M. P. Magiera, and U. H. E. Hansmann Interface width and bulk stability: Requirements for the simulation of deeply quenched liquid-gas systems (4 pages) ................................................................................... 045702͑R͒ A. J. Wagner and C. M. Pooley Copyright 2007 by The American Physical Society (Continued) CONTENTS - Continued PHYSICAL REVIEW E THIRD SERIES, VOLUME 76, NUMBER 4 OCTOBER 2007 ARTICLES Interdisciplinary physics Unanimity rule on networks (8 pages) ........................................................... 046101 Renaud Lambiotte, Stefan Thurner, and Rudolf Hanel Stability of the splay state in pulse-coupled networks (10 pages) ..................................... 046102 Rüdiger Zillmer, Roberto Livi, Antonio Politi, and Alessandro Torcini Uncovering fuzzy community structure in complex networks (7 pages) ................................ 046103 Shihua Zhang, Rui-Sheng Wang, and Xiang-Sun Zhang Steady states and linear stability analysis of precipitation pattern formation at geothermal hot springs (11 pages) .................................................................................. 046104 Pak Yuen Chan and Nigel Goldenfeld Modeling crowd turbulence by many-particle simulations (5 pages) ................................... 046105 Wenjian Yu and Anders Johansson Analyzing trails in complex networks (12 pages) .................................................. 046106 Luciano da Fontoura Costa, Francisco A. Rodrigues, and Gonzalo Travieso Random matrix analysis of complex networks (7 pages) ............................................ 046107 Sarika Jalan and Jayendra N. Bandyopadhyay Evolving network with different edges (5 pages) .................................................. 046108 Jie Sun, Yizhi Ge, and Sheng Li Tests of scaling and universality of the distributions of trade size and share volume: Evidence from three distinct markets (10 pages) .................................................................... 046109 Vasiliki Plerou and H. Eugene Stanley Microcanonical analysis of association of hydrophobic segments in a heteropolymer (4 pages) ............. 046110 Tao Chen, Xiangsong Lin, Yuan Liu, and Haojun Liang Generation of arbitrarily two-point-correlated random networks (9 pages) .............................. 046111 Sebastian Weber and Markus Porto Link and subgraph likelihoods in random undirected networks with fixed and partially fixed degree sequences (12 pages) .................................................................................. 046112 Jacob G. Foster, David V. Foster, Peter Grassberger, and Maya Paczuski Family name distributions: Master equation approach (7 pages) ...................................... 046113 Seung Ki Baek, Hoang Anh Tuan Kiet, and Beom Jun Kim Condensation in zero-range processes on inhomogeneous networks (9 pages) ........................... 046114 B. Waclaw, L. Bogacz, Z. Burda, and W. Janke Bipartite network projection and personal recommendation (7 pages) .................................. 046115 Tao Zhou, Jie Ren, Matúš Medo, and Yi-Cheng Zhang Collective behavior of stock price movements in an emerging market (9 pages) ......................... 046116 Raj Kumar Pan and Sitabhra Sinha Discrete surface growth process as a synchronization mechanism for scale-free complex networks (4 pages) ................................................................................... 046117 A. L. Pastore y Piontti, P. A. Macri, and L. A. Braunstein (Continued) CONTENTS - Continued PHYSICAL REVIEW E THIRD SERIES, VOLUME 76, NUMBER 4 OCTOBER 2007 Self-organization versus hierarchy in open-source social networks (8 pages) ............................ 046118 Sergi Valverde and Ricard V. Solé Strain localization driven by structural relaxation in sheared amorphous solids (7 pages) .................. 046119 E. A. Jagla Time-scale competition leading to fragmentation and recombination transitions in the coevolution of network and states (5 pages) .......................................................................... 046120 Federico Vazquez, Juan Carlos González-Avella, Víctor M. Eguíluz, and Maxi San Miguel Inference by replication in densely connected systems (22 pages) ..................................... 046121 Juan P. Neirotti and David Saad Attractors in continuous and Boolean networks (6 pages) ........................................... 046122 Johannes Norrell, Björn Samuelsson, and Joshua E. S. Socolar Chaos and pattern formation Array-enhanced coherence resonance and phase synchronization in a two-dimensional array of excitable chemical oscillators (6 pages) .................................................................. 046201 Taiji Okano, Akane Kitagawa, and Kenji Miyakawa Evaluation of nonlinearity and validity of nonlinear modeling for complex time series (6 pages) ........... 046202 Tomoya Suzuki, Tohru Ikeguchi, and Masuo Suzuki Guiding fields for phase separation: Controlling Liesegang patterns (9 pages) ........................... 046203 T. Antal, I. Bena, M. Droz, K. Martens, and Z. Rácz Synchronization between two coupled complex networks (6 pages) ................................... 046204 Changpin Li, Weigang Sun, and Jürgen Kurths Periodic-orbit determination of dynamical correlations in stochastic processes (11 pages) .................. 046205 Miki U. Kobayashi, Hirokazu Fujisaka, and Syuji Miyazaki Nonlinear dynamics of the polarization of multitransverse mode vertical-cavity surface-emitting lasers under current modulation (9 pages) .................................................................. 046206 A. Valle, M. Sciamanna, and K. Panajotov Spiking optical patterns and synchronization (5 pages) .............................................. 046207 Michael Rosenbluh, Yaara Aviad, Elad Cohen, Lev Khaykovich, Wolfgang Kinzel, Evi Kopelowitz, Pinhas Yoskovits, and Ido Kanter Viscosity-dependent flow reversal in a density oscillator (12 pages) ................................... 046208 T. Kano and S. Kinoshita Complex trajectories in chaotic dynamical tunneling (19 pages) ...................................... 046209 D. G. Levkov, A. G. Panin, and S. M. Sibiryakov Honeycomb hexagon pattern in dielectric barrier discharge (4 pages) .................................. 046210 Lifang Dong, Weili Liu, Hongfang Wang, Yafeng He, Weili Fan, and Ruiling Gao Steady-state solutions to the advection-diffusion equation and ghost coordinates for a chaotic flow (11 pages) .................................................................................. 046211 S. R. Hudson Asynchronous updating induces order in threshold coupled systems (10 pages) .......................... 046212 Manish Dev Shrimali, Sudeshna Sinha, and Kazuyuki Aihara (Continued) CONTENTS - Continued PHYSICAL REVIEW E THIRD SERIES, VOLUME 76, NUMBER 4 OCTOBER 2007 Fractal dimension of chaotic light scattering in regular polyhedral mirror ball structures (6 pages) .......... 046213 Kazuya Amano, Daisuke Narimatsu, Satoshi Sotome, Shinya Tashiro, Atsushi Uchida, and Shigeru Yoshimori Energetics, skeletal dynamics, and long-term predictions on Kolmogorov-Lorenz systems (11 pages) ........ 046214 V. Pelino and F. Maimone Semiclassics of the chaotic quantum-classical transition (15 pages) ................................... 046215 Benjamin D. Greenbaum, Salman Habib, Kosuke Shizume, and Bala Sundaram Peculiarities of synchronization of a resonant limit cycle on a two-dimensional torus (4 pages) ............. 046216 V. Anishchenko, S. Nikolaev, and J. Kurths Targeted mixing in an array of alternating vortices (14 pages) ........................................ 046217 R. Bachelard, T. Benzekri, C. Chandre, X. Leoncini, and M. Vittot Clustering, chaos, and crisis in a bailout embedding map (9 pages) ..................................
Load more

Recommended publications
  • Memòria Del Curs Acadèmic 2003-2004
    MEMÒRIA DEL CURS ACADÈMIC 2003-2004 Universitat de les Illes Balears Edició: Universitat de les Illes Balears. Servei de Publicacions i Intercanvi Científic. Cas Jai. Campus de la UIB. Cra. de Valldemossa, km 7.5. E-07122 Palma (Illes Balears). SUMARI 0. Introducció ........................................................................................................... 1. Òrgans generals universitaris............................................................................. 1.1. Claustre......................................................................................................................................... 1.1.1. Composició..................................................................................................................... 1.1.2. Activitats........................................................................................................................ 1.2. Consell de Govern ....................................................................................................................... 1.2.1. Composició..................................................................................................................... 1.2.2. Activitats........................................................................................................................ 1.3. Consell de Direcció ...................................................................................................................... 1.3.1. Composició....................................................................................................................
    [Show full text]
  • Noise-Induced Order out of Chaos by Bailout Embedding
    Fluctuation and Noise Letters Vol. 0, No. 0 (2002) 000–000 c World Scientific Publishing Company NOISE-INDUCED ORDER OUT OF CHAOS BY BAILOUT EMBEDDING JULYAN H. E. CARTWRIGHT Laboratorio de Estudios Cristalograficos,´ CSIC, E-18071 Granada, Spain. MARCELO O. MAGNASCO Abdus Salam International Centre for Theoretical Physics, I-34014 Trieste, Italy. ORESTE PIRO and IDAN TUVAL Institut Mediterrani d’Estudis Avanc¸ats, CSIC–UIB, E-07071 Palma de Mallorca, Spain. Received (received date) Revised (revised date) Accepted (accepted date) We review the concept of bailout embedding; a general process for obtaining order from chaotic dy- namics by embedding the system within another larger one. Such an embedding can target islands of order and hence control chaos. Moreover, a small amount of noise enhances this process. Keywords: Bailout embedding, emergence in noisy environments, noise-induced patterns, noisy self- organization 1. Introduction “But how does it happen,” I said with admiration, “that you were able to solve the mystery of the library looking at it from the outside, and you were unable to solve it when you were inside?” “Thus God knows the world, because He conceived it in His mind, as if from the outside, before it was created, and we do not know its rule, because we live inside it, having found it already made.” Dialogue between Adso and William, in Umberto Eco’s The Name of the Rose, Third Day: Vespers. Many times we have a given system, we want to study it or modify its behaviour, but we cannot get inside. We are thus obliged to do so from the outside.
    [Show full text]
  • C Copyright 2014 Sudharsan Madhavan
    c Copyright 2014 Sudharsan Madhavan Lagrangian coherent structures and the dynamics of inertial particles Sudharsan Madhavan A dissertation submitted in partial fulfillment of the requirements for the degree of Master of Science University of Washington 2014 Reading Committee: James J. Riley, Chair Steven L. Brunton J. Nathan Kutz Christopher S. Bretherton Program Authorized to Offer Degree: UW Applied Mathematics University of Washington Abstract Lagrangian coherent structures and the dynamics of inertial particles Sudharsan Madhavan Chair of the Supervisory Committee: James J. Riley Professor, Mechanical Engineering Adjunct Professor, Applied Mathematics Dynamics of inertial particles in two-dimensional planar flow have been investigated by evaluating finite-time Lyapunov exponents (FTLE). The first part of our work deals with inertial particle dynamics. The Maxey-Riley equations have been employed to track par- ticles. Patterns formed by inertial particles are reported along with their dependance on Strokes number and density of particles relative to the carrier-fluid density. Our results dis- tinguish patterns formed by particles denser than the fluid (aerosols) from those formed by particles lighter than the fluid (bubbles). Preferential concentration of these particles at specific regions of the flow have been observed. The attenuating, low-pass filter effect of Stokes drag on bubbles are reported for the first time. The results from this part of the work motivated further investigations into the underlying organizing structures of the flow, namely the Lagrangian coherent structures (LCS). LCS is traditionally evaluated us- ing FTLE. In the next part of the work, our objective was to interpret the dynamics of inertial par- ticles by evaluating finite-time Lyapunov exponents on their trajectories.
    [Show full text]
  • Dynamics of Finite-Size Particles in Chaotic Fluid Flows
    Dynamics of Finite-Size Particles in Chaotic Fluid Flows Julyan H.E. Cartwright, Ulrike Feudel, György Károlyi, Alessandro de Moura, Oreste Piro, and Tamás Tél Abstract We review recent advances on the dynamics of finite-size particles advected by chaotic fluid flows, focusing on the phenomena caused by the inertia of finite-size particles which have no counterpart in traditionally studied passive tracers. Particle inertia enlarges the phase space and makes the advection dynamics much richer than the passive tracer dynamics, because particles’ trajectories can diverge from the trajectories of fluid parcels. We cover both confined and open flow regimes, and we also discuss the dynamics of interacting particles, which can undergo fragmentation and coagulation. 1 Introduction and Overview A correct formulation of the problem of the motion of finite-size particles in fluid flows has presented difficult challenges for generations of fluid dynamicists. Although in principle this problem is “just” another application of the Navier– Stokes equation, with moving boundary conditions, a direct solution of the fluid dynamical equations is not only very difficult, but also not very illuminating. So from the nineteenth century onwards efforts were made to find the appropriate approximations which allow one to write the equations of motion of small rigid particles in a given flow in the form of ordinary differential equations, regarding the flow’s velocity field as given. Some very subtle issues are involved in making the right kinds of approximations and assumptions in a self-consistent way, and a number of incorrect results appeared in the early literature. The issue was finally resolved when Maxey and Riley [1] wrote down the equations of motion for a small spherical rigid particle advected by a (smooth) flow and Auton et al.
    [Show full text]
  • Bubbling and On-Off Intermittency in Bailout Embeddings
    PHYSICAL REVIEW E 68, 016217 ͑2003͒ Bubbling and on-off intermittency in bailout embeddings Julyan H. E. Cartwright,1,* Marcelo O. Magnasco,2,† Oreste Piro,3,‡ and Idan Tuval3,§ 1Laboratorio de Estudios Cristalogra´ficos, CSIC, E-18071 Granada, Spain 2Abdus Salam International Centre for Theoretical Physics, I-34014 Trieste, Italy 3Institut Mediterrani d’Estudis Avanc¸ats, CSIC–UIB, E-07071 Palma de Mallorca, Spain ͑Received 14 February 2003; published 21 July 2003͒ We establish and investigate the conceptual connection between the dynamics of the bailout embedding of a Hamiltonian system and the dynamical regimes associated with the occurrence of bubbling and blowout bifurcations. The roles of the invariant manifold and the dynamics restricted to it, required in bubbling and blowout bifurcating systems, are played in the bailout embedding by the embedded Hamiltonian dynamical system. The Hamiltonian nature of the dynamics is precisely the distinctive feature of this instance of a bubbling or blowout bifurcation. The detachment of the embedding trajectories from the original ones can thus be thought of as transient on-off intermittency, and noise-induced avoidance of some regions of the embedded phase space can be recognized as Hamiltonian bubbling. DOI: 10.1103/PhysRevE.68.016217 PACS number͑s͒: 05.45.Gg I. INTRODUCTION ture of the dynamics away from the invariant manifold. In the foregoing, we have supposed that both the re- Symmetry is a fundamental concept in science, both at the stricted and the unrestricted dynamics are dissipative. But we level of physical laws and when applied to specific applica- might envision a case in which the global dissipative dynam- tions.
    [Show full text]
  • And Inertia-Induced Inhomogeneity in the Distribution of Small Particles in fluid flows Julyan H
    CHAOS VOLUME 12, NUMBER 2 JUNE 2002 Noise- and inertia-induced inhomogeneity in the distribution of small particles in fluid flows Julyan H. E. Cartwrighta) Laboratorio de Estudios Cristalogra´ficos, CSIC, E-18071 Granada, Spain Marcelo O. Magnascob) Mathematical Physics Laboratory, Rockefeller University, P.O. Box 212, 1230 York Avenue, New York, New York 10021 Oreste Piroc) Institut Mediterrani d’Estudis Avanc¸ats, CSIC–UIB, E-07071 Palma de Mallorca, Spain ͑Received 2 November 2001; accepted 25 March 2002; published 20 May 2002͒ The dynamics of small spherical neutrally buoyant particulate impurities immersed in a two-dimensional fluid flow are known to lead to particle accumulation in the regions of the flow in which vorticity dominates over strain, provided that the Stokes number of the particles is sufficiently small. If the flow is viewed as a Hamiltonian dynamical system, it can be seen that the accumulations occur in the nonchaotic parts of the phase space: the Kolmogorov–Arnold–Moser tori. This has suggested a generalization of these dynamics to Hamiltonian maps, dubbed a bailout embedding. In this paper we use a bailout embedding of the standard map to mimic the dynamics of neutrally buoyant impurities subject not only to drag but also to fluctuating forces modeled as white noise. We find that the generation of inhomogeneities associated with the separation of particle from fluid trajectories is enhanced by the presence of noise, so that they appear in much broader ranges of the Stokes number than those allowing spontaneous separation. © 2002 American Institute of Physics. ͓DOI: 10.1063/1.1480441͔ Impurities suspended in a fluid flow are frequently ob- I.
    [Show full text]
  • Arxiv:1911.08207V1 [Nlin.CD] 19 Nov 2019
    Power-law trapping in the volume-preserving Arnold-Beltrami-Childress map Swetamber Das1 and Arnd B¨acker2, 1 1Max-Planck-Institut f¨urPhysik komplexer Systeme, N¨othnitzerStraße 38, 01187 Dresden, Germany 2Technische Universit¨atDresden, Institut f¨urTheoretische Physik and Center for Dynamics, 01062 Dresden, Germany (Dated: November 20, 2019) Understanding stickiness and power-law behavior of Poincar´erecurrence statistics is an open problem for higher-dimensional systems, in contrast to the well-understood case of systems with two degrees-of-freedom. We study such intermittent behavior of chaotic orbits in three-dimensional volume-preserving systems using the example of the Arnold-Beltrami-Childress map. The map has a mixed phase space with a cylindrical regular region surrounded by a chaotic sea for the considered parameters. We observe a characteristic overall power-law decay of the cumulative Poincar´erecur- rence statistics with significant oscillations superimposed. This slow decay is caused by orbits which spend long times close to the surface of the regular region. Representing such long-trapped orbits in frequency space shows clear signatures of partial barriers and reveals that coupled resonances play an essential role. Using a small number of the most relevant resonances allows for classifying long-trapped orbits. From this the Poincar´erecurrence statistics can be divided into different ex- ponentially decaying contributions which very accurately explains the overall power-law behavior including the oscillations. I. INTRODUCTION Thus already purely for topological reasons additional types of transport are possible, leading for example to Hamiltonian systems generically have a mixed phase the famous Arnold diffusion [47{49]. space in which regular and chaotic motion coexist.
    [Show full text]
  • Arxiv:Nlin/0311056V1 [Nlin.CD] 26 Nov 2003 Oi Rnnyeblc Nhproi Hoi Scattering, Chaotic Hyperbolic in Hyper Either Nonhyperbolic
    [Phys. Rev. E 68, 056307 (2003)] Reactive dynamics of inertial particles in nonhyperbolic chaotic flows Adilson E. Motter,1, ∗ Ying-Cheng Lai,2 and Celso Grebogi3 1Max Planck Institute for the Physics of Complex Systems, N¨othnitzer Strasse 38, 01187 Dresden, Germany 2Departments of Mathematics, Electrical Engineering, and Physics, Arizona State University, Tempe, Arizona 85287, USA 3Instituto de F´ısica, Universidade de S˜ao Paulo, Caixa Postal 66318, 05315-970 S˜ao Paulo, Brazil (Dated: October 31, 2018) Anomalous kinetics of infective (e.g., autocatalytic) reactions in open, nonhyperbolic chaotic flows are im- portant for many applications in biological, chemical, and environmental sciences. We present a scaling theory for the singular enhancement of the production caused by the universal, underlying fractal patterns. The key dynamical invariant quantities are the effective fractal dimension and effective escape rate, which are primarily determined by the hyperbolic components of the underlying dynamical invariant sets. The theory is general as it includes all previously studied hyperbolic reactive dynamics as a special case. We introduce a class of dissipative embedding maps for numerical verification. PACS numbers: 47.70.Fw, 47.53.+n, 47.52.+j, 05.45.-a Many chemical and biological processes in fluids are char- the periodic orbits are unstable and there are no Kolmogorov- acterized by a filamental distribution of active particles along Arnold-Moser (KAM) tori in the phase space, while the non- fractal invariant sets of the advection chaotic dynamics. These hyperbolic counterpart is frequently characterized as having fractal structures act as dynamical catalysts for the reaction, both chaotic and marginally stable periodic orbits.
    [Show full text]
  • Arxiv:Nlin.CD/0111005 V1 2 Nov 2001 Ple Namical Tems: on Asymptotically While Islands Lands W to the Apply Class
    Bailout Embeddings, Targeting of KAM Orbits, and the Control of Hamiltonian Chaos 1, 2, 3, Julyan H. E. Cartwright, ∗ Marcelo O. Magnasco, y and Oreste Piro z 1Laboratorio de Estudios Cristalograficos,´ CSIC, E-18071 Granada, Spain 2Mathematical Physics Lab, Rockefeller University, Box 212, 1230 York Avenue, NY 10021 3Institut Mediterrani d’Estudis Avanc¸ats, CSIC–UIB, E-07071 Palma de Mallorca, Spain (Dated: version of December 11, 2001) We present a novel technique, which we term bailout embedding, that can be used to target orbits having par- ticular properties out of all orbits in a flow or map. We explicitly construct a bailout embedding for Hamiltonian systems so as to target KAM orbits. We show how the bailout dynamics is able to lock onto extremely small KAM islands in an ergodic sea. PACS numbers: 05.45.Gg Control of chaos in nonlinear dynamical systems has been a parameter taking the system away from integrability is in- achieved by applying small perturbations that effectively creased, these tori break and give rise to chaotic regions in a change the dynamics of the system around the region — typ- precise sequence; for any particular value of this parameter ically a periodic orbit — that one wishes to stabilize [1]. in a neighborhood of the integrable case, there are surviving This method has been successful in dissipative systems, but tori. The problem with finding them is that, the dynamics its extensions to control and targeting in Hamiltonian sys- being volume-preserving, merely evolving trajectories either tems [2, 3, 4, 5, 6, 7, 8, 9, 10] have met various difficulties forwards or backwards does not give us convergence onto tori not present in the dissipative case: the absence of attracting [13], and since for large values of the nonlinearity, they cover sets, for instance, makes it hard to stabilize anything.
    [Show full text]
  • The Fluid Mechanics of Poohsticks
    The fluid mechanics of poohsticks rsta.royalsocietypublishing.org Julyan H. E. Cartwright1;2, Oreste Piro3 1Instituto Andaluz de Ciencias de la Tierra, Research CSIC–Universidad de Granada, E-18100 Armilla, Granada, Spain 2Instituto Carlos I de Física Teórica y Computacional, Article submitted to journal Universidad de Granada, E-18071 Granada, Spain 3Departament de Física, Universitat de les Illes Balears, E-07071 Palma de Mallorca, Spain Subject Areas: fluid mechanics; dynamical systems 2019 is the bicentenary of George Gabriel Stokes, who Keywords: in 1851 described the drag — Stokes drag — on a body moving immersed in a fluid, and 2020 is the centenary Maxey–Riley equation, of Christopher Robin Milne, for whom the game of Basset–Boussinesq–Oseen equation, poohsticks was invented; his father A. A. Milne’s “The poohsticks House at Pooh Corner”, in which it was first described in print, appeared in 1928. So this is an apt moment to Author for correspondence: review the state of the art of the fluid mechanics of a solid body in a complex fluid flow, and one floating at Julyan Cartwright the interface between two fluids in motion. Poohsticks e-mail: [email protected] pertains to the latter category, when the two fluids are Oreste Piro water and air. e-mail: [email protected] arXiv:2104.03056v1 [physics.flu-dyn] 7 Apr 2021 © The Authors. Published by the Royal Society under the terms of the Creative Commons Attribution License http://creativecommons.org/licenses/ by/4.0/, which permits unrestricted use, provided the original author and source are credited. 1. Poohsticks 2 The game or pastime of poohsticks is best described in the original source, A.
    [Show full text]
  • CURRICULUM VITÆ Julyan Cartwright
    CURRICULUM VITÆ Julyan Cartwright http://www.iact.csic.es/personal/julyan_cartwright Versión de marzo de 2019 1 CURRICULUM VITAE APELLIDO: Cartwright NOMBRES: Julyan Harold Edward FECHA DE NACIMIENTO: 4 Agosto 1967 NACIONALIDAD: Británica NIE: X1656430Q (España) SEXO: Varón TEL.: 609 355224 FORMACION ACADEMICA LICENCIATURA: (Homologada en España) Licenciado en Física Teorica University of Newcastle upon Tyne, Gran Bretaña Título de tesina: The Spherical Pendulum Revisited: Chaos in a Forced Oscillator DIRECTOR DE TESINA: Dr. David J. Tritton FECHA: Junio 1988 DOCTORADO: (Homologado en España) Doctor en Matematica Aplicada University of London, Gran Bretaña Título de tesis: Chaos in Dissipative Systems: Bifurcations and Basins DIRECTOR DE TESIS: Dr. David K. Arrowsmith FECHA: Octubre 1992 SITUACION PROFESIONAL: Científico Titular del CSIC (cuatro sexenios; cinco quinquenios) y Miembro del Instituto Carlos I de Física Teórica y Computacional, Universidad de Granada. INSTITUTO: Instituto Andaluz de Ciencias de la Tierra (CSIC–UGR) DIRECCION POSTAL: E-18100 Armilla, Granada. CORREO ELECTRONICO: [email protected] WWW http://www.iact.csis.es/personal/julyan_cartwright DEDICACION: A tiempo completo ACTIVIDADES ANTERIORES DE CARACTER CIENTIFICO FECHAS PUESTO INSTITUCION Mar 00 Científico Titular; antes Consejo Superior de Investigaciones — presente ‘Ramón y Cajal’ Fellow Científicas (CSIC), España. Nov 15 Miembro Instituto Carlos I de Física Teórica y — presente Computacional, Universidad de Granada. May 14 Visiting Scholar Pembroke College, — May 15 Cambridge University, UK. Nov 99 Visiting Scholar Lawrence Livermore Natl Laboratory, — Sep 01 University of California, USA. Nov 98 Profesor Visitante Universidad de Granada y — Feb 00 Universidad de las Islas Baleares, España Ene 98 Profesor Visitante Bioengineering Institute & Dept of Physics, — Oct 98 Miguel Hernández University, España.
    [Show full text]
  • Clustering, Chaos and Crisis in a Bailout Embedding
    Clustering, Chaos and Crisis in a Bailout Embedding Map N.Nirmal Thyagu∗ and Neelima Gupte† Indian Institute of Technology Madras, Chennai-600036,India (Dated: October 25, 2018) Abstract We study the dynamics of inertial particles in two dimensional incompressible flows. The particle dynamics is modelled by four dimensional dissipative bailout embedding maps of the base flow which is represented by 2 − d area preserving maps. The phase diagram of the embedded map is rich and interesting both in the aerosol regime, where the density of the particle is larger than that of the base flow, as well as the bubble regime, where the particle density is less than that of the base flow. The embedding map shows three types of dynamic behaviour, periodic orbits, chaotic structures and mixed regions. Thus, the embedding map can target periodic orbits as well as chaotic structures in both the aerosol and bubble regimes at certain values of the dissipation parameter. The bifurcation diagram of the 4 − d map is useful for the identification of regimes where such structures can be found. An attractor merging and widening crisis is seen for a special region for the aerosols. At the crisis, two period-10 attractors merge and widen simultaneously into a single chaotic attractor. Crisis induced intermittency is seen at some points in the phase diagram. The characteristic times before bursts at the crisis show power law behaviour as functions of the dissipation parameter. Although the bifurcation diagram for the bubbles looks similar to that of aerosols, no such crisis regime is seen for the bubbles.
    [Show full text]