00896nam0-22003371i-450-99000787475040332120080325154101.088-15-08669-2000787475FED01000787475(Aleph)000787475FED0100078747520040426d1999----km-y0itay50------baitaITa---a---001yyStoria della psicologiaa cura di Paolo Legrenzi4. ed.Bolognail Mulino1999261 p.ill.22 cmItinerariPsicologiaPsicologiaStoria150.921itaLegrenzi,PaoloITUNINARICAUNIMARCBK990007874750403321P.1 PG 526Bibl. 43938FLFBCFLFBCStoria della psicologia277122UNINA02830nam 2200625 a 450 991045287310332120200520144314.01-84217-906-31-84217-908-X(CKB)2550000001042857(SSID)ssj0000860457(PQKBManifestationID)12391410(PQKBTitleCode)TC0000860457(PQKBWorkID)10897834(PQKB)11538262(MiAaPQ)EBC3007526(Au-PeEL)EBL3007526(CaPaEBR)ebr10678632(OCoLC)836864282(EXLCZ)99255000000104285720120402d2012 uy 0engurcn|||||||||txtccrLiving the lunar calendar[electronic resource] /edited by Jonathan Ben-Dov, Wayne Horowitz and John M. SteeleOxford ;Oakville, Conn. Oxbow Booksc2012viii, 387 p. illBibliographic Level Mode of Issuance: Monograph1-84217-481-9 Includes bibliographical references.Forward / Amanda Weiss -- Introduction / Jonathan Ben-Dov, Wayne Horowitz and John M. Steele -- Sunday in Mesopotamia / Wayne Horowitz -- Middle Assyrian lunar calendar and chronology / Yigal Bloch -- Beyond the moon : Minoan calendar-symbolism in the blue bird fresco / Sabine Beckman -- Early Greek lunisolar cycles : the Pythian and olympic games / Robert Hannah -- What to do on the thirtieth? : a neo-Platonic interpretation of Hesiod's works and days, 765-8 / Patrizia Marzillo -- Why Greek lunar months began a day later than Egyptian lunar months, both before first visibility of the new crescent / Leo Depuydt -- Lunar calendars at Qumran : a comparative and ideological study / Jonathan Ben-Dov -- Tame and wild time in the Qumran and Rabbinic calendar / Ron H. Feldman -- The Rabbinic new moon procedure : context and significance / Sacha Stern -- From observation to calculation : the development of the Rabbinic lunar calendar / Lawrence H. Schiffman.CalendarsHistoryTo 1500Calendar, Assyro-BabylonianCalendar, GreekCalendar, EgyptianCalendar, JewishElectronic books.CalendarsHistoryCalendar, Assyro-Babylonian.Calendar, Greek.Calendar, Egyptian.Calendar, Jewish.529/.3Ben-Dov Jonathan948674Horowitz Wayne1957-879527Steele John M882565MiAaPQMiAaPQMiAaPQBOOK9910452873103321Living the lunar calendar2145649UNINA05390nam 22006734a 450 991082997260332120230617041829.01-280-27839-097866102783980-470-35478-X0-471-75472-20-471-75470-6(CKB)1000000000377257(EBL)239410(OCoLC)61762097(SSID)ssj0000157721(PQKBManifestationID)11147173(PQKBTitleCode)TC0000157721(PQKBWorkID)10144536(PQKB)10806848(MiAaPQ)EBC239410(EXLCZ)99100000000037725720050427d2005 uy 0engur|n|---|||||txtccrFractal-based point processes[electronic resource] /Steven Bradley Lowen, Malvin Carl TeichHoboken, N.J. Wiley-Interscience20051 online resource (628 p.)Wiley Series in Probability and Statistics ;v.366Description based upon print version of record.0-471-38376-7 Includes bibliographical references (p. 513-565) and index.Fractal-Based Point Processes; Preface; Contents; List of Figures; List of Figures; List of Tables; List of Tables; Authors; 1 Introduction; 1.1 Fractals; 1.1 Coastline of Iceland at different scales; 1.2 Point Processes; 1.3 Fractal-Based Point Processes; 1.2 Vehicular-traffic point process; Problems; 1.1 Length of Icelandic coastline at different scales; 1.2 Polygon approximation for perimeter of circle; 2 Scaling, Fractals, and Chaos; 2.1 Dimension; 2.1 Representative objects: measurements and dimensions; 2.2 Scaling Functions; 2.3 Fractals; 2.4 Examples of Fractals2.1 Cantor-set construction2.2 Realization of Brownian motion; 2.3 Fern: a nonrandom natural fractal; 2.4 Grand Canyon: a random natural fractal; 2.5 Examples of Nonfractals; 2.5 Realization of a homogeneous Poisson process; 2.6 Deterministic Chaos; 2.6 Nonchaotic system with nonfractal attractor: time course; 2.7 Chaotic system with nonfractal attractor: time course; 2.8 Chaotic system with fractal attractor; 2.9 Chaotic system with fractal attractor: time course; 2.10 Nonchaotic system with fractal attractor; 2.7 Origins of Fractal Behavior2.11 Nonchaotic system with fractal attractor: time course2.8 Ubiquity of Fractal Behavior; Problems; 3 Point Processes: Definition and Measures; 3.1 Point Processes; 3.2 Representations; 3.1 Point-process representations; 3.3 Interval-Based Measures; 3.2 Rescaled-range analysis: pseudocode; 3.3 Rescaled-range analysis: illustration; 3.4 Detrended fluctuation analysis: pseudocode; 3.4 Count-Based Measures; 3.5 Detrended fluctuation analysis: illustration; 3.6 Construction of normalized variances; 3.5 Other Measures; Problems; 4 Point Processes: Examples; 4.1 Homogeneous Poisson Point Process4.2 Renewal Point Processes4.3 Doubly Stochastic Poisson Point Processes; 4.1 Stochastic-rate point processes; 4.4 Integrate-and-Reset Point Processes; 4.5 Cascaded Point Processes; 4.2 Cascaded point process; 4.6 Branching Point Processes; 4.7 Lévy-Dust Counterexample; Problems; 5 Fractal and Fractal-Rate Point Processes; 5.1 Measures of Fractal Behavior in Point Processes; 5.2 Ranges of Power-Law Exponents; 5.3 Relationships among Measures; 5.4 Examples of Fractal Behavior in Point Processes; 5.1 Representative rate spectra; 5.2 Representative normalized Haar-wavelet variances5.5 Fractal-Based Point Processes5.3 Normalized Daubechies-wavelet variances; 5.4 Fractal and nonfractal point processes; 5.5 Fractal-rate and nonfractal point processes; Problems; 5.6 Estimated normalized-variance curves; 5.7 Representative interval spectra; 5.8 Representative interval wavelet variances; 5.9 Representative interevent-interval histograms; 5.10 Representative capacity dimensions; 5.11 Generalized dimensions for an exocytic point process; 6 Processes Based on Fractional Brownian Motion; 6.1 Fractional Brownian Motion; 6.1 Realizations of fractional Brownian motion6.2 Fractional Gaussian NoiseAn integrated approach to fractals and point processesThis publication provides a complete and integrated presentation of the fields of fractals and point processes, from definitions and measures to analysis and estimation. The authors skillfully demonstrate how fractal-based point processes, established as the intersection of these two fields, are tremendously useful for representing and describing a wide variety of diverse phenomena in the physical and biological sciences. Topics range from information-packet arrivals on a computer network to action-potential occurrences in a neural Wiley Series in Probability and StatisticsPoint processesFractalsPoint processes.Fractals.514.742519.2/3519.23Lowen Steven Bradley1962-1615391Teich Malvin Carl302140MiAaPQMiAaPQMiAaPQBOOK9910829972603321Fractal-based point processes3945562UNINA