01513nam 2200373Ia 450 99639345280331620200824132935.0(CKB)4940000000119189(EEBO)2240887438(OCoLC)ocm47012541e(OCoLC)47012541(EXLCZ)99494000000011918920010525f16631674 uy 0engurbn||||a|bb|A new ballad; declaring The excellent parable of the prodigal child[electronic resource] To the tune of, The wanton wife[London] Printed for F. Coles, T. Vere, and J. Wright.[between 1663 and 1674]1 sheet ([1] p.) illContains 3 illustrations.Place and date of publication taken from Wing (2nd ed.)Right half-sheet contains: The second part, shewing the great misery he endured, being constrained through hunger, to eat with the hogs, and how his merciful father received him again. To the same tune.Reproduction of original in: University of Glasgow. Library.eebo-0166Ballads, English17th centuryProdigal son (Parable)PoetryBroadsidesEngland17th century.rbgenrBallads, EnglishProdigal son (Parable)EAEEAEBOOK996393452803316A new ballad; declaring The excellent parable of the prodigal child2310303UNISA05244nam 2200709Ia 450 991095898850332120251116232104.097866119609029781281960900128196090X97898128122929812812296(CKB)1000000000551137(EBL)1193541(SSID)ssj0000312417(PQKBManifestationID)12083627(PQKBTitleCode)TC0000312417(PQKBWorkID)10331560(PQKB)10001086(MiAaPQ)EBC1193541(WSP)00001982 (Au-PeEL)EBL1193541(CaPaEBR)ebr10698841(CaONFJC)MIL196090(OCoLC)316005566(Perlego)850501(EXLCZ)99100000000055113720081008d2008 uy 0engur|n|---|||||txtccrUniversality in nonequilibrium lattice systems theoretical foundations /Geza Odor1st ed.Hackensack, NJ World Scientificc20081 online resource (296 p.)Description based upon print version of record.9789812812278 981281227X Includes bibliographical references (p. 249-269) and index.1. Introduction. 1.1. Critical exponents of equilibrium (thermal) systems. 1.2. Static percolation cluster exponents. 1.3. Dynamical critical exponents. 1.4. Crossover between classes. 1.5. Critical exponents and relations of spreading processes. 1.6. Field theoretical approach to reaction-diffusion systems. 1.7. The effect of disorder -- 2. Out of equilibrium classes. 2.1. Field theoretical description of dynamical classes at and below T[symbol]. 2.2. Dynamical classes at T[symbol] > 0. 2.3. Ising classes. 2.4. Potts classes. 2.5. XY model classes. 2.6. O(N) symmetric model classes -- 3. Genuine basic nonequilibrium classes with fluctuating ordered states. 3.1. Driven lattice gas (DLG) classes -- 4. Genuine basic nonequilibrium classes with absorbing state. 4.1. Mean-field classes of general nA[symbol](n+k)A, mA[symbol](m-l)A processes. 4.2. Directed percolation (DP) classes. 4.3. Generalized, n-particle contact processes. 4.4. Dynamical isotropic percolation (DIP) classes. 4.5. Voter model (VM) classes. 4.6. Parity conserving (PC) classes. 4.7. Classes in models with n < m production and m particle annihilation at [symbol]=0. 4.8. Classes in models with n < m production and m particle coagulation at [symbol]=0; reversible reactions (1R). 4.9. Generalized PC models. 4.10. Multiplicative noise classes -- 5. Scaling at first-order phase transitions. 5.1. Tricritical directed percolation classes (TDP). 5.2. Tricritical DIP classes -- 6. Universality classes of multi-component systems. 6.1. The A+B[symbol]� classes. 6.2. AA[symbol]�, BB[symbol]� with hard-core exclusion. 6.3. Symmetrical, multi-species A[symbol]+A[symbol][symbol]�(q-MAM) classes. 6.4. Heterogeneous, multi-species A[symbol]+A[symbol][symbol]� system. 6.5. Unidirectionally coupled ARW classes. 6.6. DP coupled to frozen field classes. 6.7. DP with coupled diffusive field classes. 6.8. BARWe with coupled non-diffusive field class. 6.9. DP with diffusive, conserved slave field classes. 6.10. DP with frozen, conserved slave field classes. 6.11. Coupled N-component DP classes. 6.12. Coupled N-component BARW2 classes. 6.13. Hard-core 2-BARW2 classes in one dimension -- 7. Surface-interface growth classes. 7.1. The random deposition class. 7.2. Edwards-Wilkinson (EW) classes. 7.3. Quench disordered EW classes (QEW). 7.4. Kardar-Parisi-Zhang (KPZ) classes. 7.5. Other continuum growth classes. 7.6. Unidirectionally coupled DP classes. 7.7. Unidirectionally coupled PC classes -- 8. Summary and outlook.Universal scaling behavior is an attractive feature in statistical physics because a wide range of models can be classified purely in terms of their collective behavior due to a diverging correlation length. This book provides a comprehensive overview of dynamical universality classes occurring in nonequilibrium systems defined on regular lattices. The factors determining these diverse universality classes have yet to be fully understood, but the book attempts to summarize our present knowledge, taking them into account systematically.The book helps the reader to navigate in the zoo of basic mScaling laws (Statistical physics)Lattice theorySelf-organizing systemsPhase transformations (Statistical physics)Differentiable dynamical systemsScaling laws (Statistical physics)Lattice theory.Self-organizing systems.Phase transformations (Statistical physics)Differentiable dynamical systems.530.15/95Ódor Géza1891908MiAaPQMiAaPQMiAaPQBOOK9910958988503321Universality in nonequilibrium lattice systems4536330UNINA