00838nam0 2200265 450 00001883620081104154939.00-7204-0722-220081104d1977----km-y0itay50------baengNLy-------001yyCombinatorial set theoryNeil H. WilliamsAmsterdamNorth-Holland1977XI, 208 p.23 cmStudies in logic and the foundations of mathematics912001Studies in logic and the foundations of mathematicsCombinatorial set theory32682511.320Williams,Neil H.55218ITUNIPARTHENOPE20081104RICAUNIMARC000018836M 511.3/9M 258DSA2008Combinatorial set theory32682UNIPARTHENOPE01151nam--2200373---450-9900003658202033160036582USA010036582(ALEPH)000036582USA01003658220010319d--------km-y0itay0103----baengUS||||||||001yyMicrocomputer graphics and programming techniquesHarry jr. KatzanNew YorkVan Nostrand Reinhold Company2001001-------2001Elaboratori elettroniciGraficaMicroelaboratori elettronici001.6443KATZAN,Harry jr.111195ITsalbcISBD990000365820203316001.644 3 KAT0019473 CBS001.644 300106124BKSCIPATTY9020010319USA011400PATTY9020010320USA011748ALANDI9020010516USA01113320020403USA011644PATRY9020040406USA011625Microcomputer graphics and programming techniques877206UNISA02718nam 22006014a 450 991078088280332120230214174409.01-282-75766-09786612757662981-283-882-1(CKB)2490000000001849(EBL)731335(OCoLC)670430585(SSID)ssj0000416642(PQKBManifestationID)11280018(PQKBTitleCode)TC0000416642(PQKBWorkID)10422110(PQKB)11266704(MiAaPQ)EBC731335(WSP)00007183(Au-PeEL)EBL731335(CaPaEBR)ebr10422260(CaONFJC)MIL275766(EXLCZ)99249000000000184920100823d2010 uy 0engur|n|---|||||txtccrElegant chaos[electronic resource] algebraically simple chaotic flows /Julien Clinton SprottNew Jersey World Scientificc20101 online resource (304 p.)Description based upon print version of record.981-283-881-3 Includes bibliographical references (p. 265-280) and index.Preface; Contents; List of Tables; 1. Fundamentals; 2. Periodically Forced Systems; 3. Autonomous Dissipative Systems; 4. Autonomous Conservative Systems; 5. Low-dimensional Systems (D 3); 7. Circulant Systems; 8. Spatiotemporal Systems; 9. Time-Delay Systems; 10. Chaotic Electrical Circuits; Bibliography; IndexThis heavily illustrated book collects in one source most of the mathematically simple systems of differential equations whose solutions are chaotic. It includes the historically important systems of van der Pol, Duffing, Ueda, Lorenz, Rossler, and many others, but it goes on to show that there are many other systems that are simpler and more elegant. Many of these systems have been only recently discovered and are not widely known. Most cases include plots of the attractor and calculations of the spectra of Lyapunov exponents. Some important cases include graphs showing the route to chaos.TheLyapunov exponentsFlows (Differentiable dynamical systems)Chaotic behavior in systemsMathematicsLyapunov exponents.Flows (Differentiable dynamical systems)Chaotic behavior in systemsMathematics.515/.35Sprott Julien C42637MiAaPQMiAaPQMiAaPQBOOK9910780882803321Elegant chaos3849627UNINA