01741nam 2200577Ia 450 991045063590332120200520144314.01-59726-847-X1-4175-9423-3(CKB)1000000000032162(OCoLC)228114293(CaPaEBR)ebrary10079984(SSID)ssj0000125375(PQKBManifestationID)11144356(PQKBTitleCode)TC0000125375(PQKBWorkID)10047702(PQKB)10616616(MiAaPQ)EBC3317352(Au-PeEL)EBL3317352(CaPaEBR)ebr10079984(OCoLC)923186766(EXLCZ)99100000000003216219980518d1998 uy 0engurcn|||||||||txtccrComing home to the Pleistocene[electronic resource] /Paul Shepard ; edited by Florence R. ShepardWashington, D.C. Island Press19981 online resource (208 p.) "A Shearwater book"--T.p. verso.1-55963-589-4 Includes bibliographical references (p. 177-186) and index.Hunting and gathering societiesSociobiologyNature and nurtureElectronic books.Hunting and gathering societies.Sociobiology.Nature and nurture.306.3/64Shepard Paul1925-883413Shepard Florence R895365MiAaPQMiAaPQMiAaPQBOOK9910450635903321Coming home to the Pleistocene2000290UNINA04461nam 2200613 450 991048075710332120170822144133.01-4704-0540-7(CKB)3360000000465118(EBL)3114122(SSID)ssj0000888894(PQKBManifestationID)11480048(PQKBTitleCode)TC0000888894(PQKBWorkID)10866172(PQKB)10354562(MiAaPQ)EBC3114122(PPN)195418239(EXLCZ)99336000000046511820150417h20092009 uy 0engur|n|---|||||txtccrThe dynamics of modulated wave trains /Arjen Doelman [and three others]Providence, Rhode Island :American Mathematical Society,2009.©20091 online resource (122 p.)Memoirs of the American Mathematical Society,0065-9266 ;Volume 199, Number 934"Volume 199, Number 934 (fifth of 6 numbers)."0-8218-4293-5 Includes bibliographical references.""Contents""; ""Notation""; ""Chapter 1. Introduction""; ""1.1. Grasshopper's guide""; ""1.2. Slowly-varying modulations of nonlinear wave trains""; ""1.3. Predictions from the Burgers equation""; ""1.4. Verifying the predictions made from the Burgers equation""; ""1.5. Related modulation equations""; ""1.6. References to related works""; ""Chapter 2. The Burgers equation""; ""2.1. Decay estimates""; ""2.2. Fronts in the Burgers equation""; ""Chapter 3. The complex cubic Ginzburgâ€?Landau equation""; ""3.1. Set-up""; ""3.2. Slowly-varying modulations of the k = 0 wave train: Results""""3.3. Derivation of the Burgers equation""""3.4. The construction of higher-order approximations""; ""3.5. The approximation theorem for the wave numbers""; ""3.6. Mode filters, and separation into critical and noncritical modes""; ""3.7. Estimates of the linear semigroups""; ""3.8. Estimates of the residual""; ""3.9. Estimates of the errors""; ""3.10. Proofs of the theorems from Â3.2""; ""Chapter 4. Reaction-diffusion equations: Set-up and results""; ""4.1. The abstract set-up""; ""4.2. Expansions of the linear and nonlinear dispersion relations""""4.3. Formal derivation of the Burgers equation""""4.4. Validity of the Burgers equation""; ""4.5. Existence and stability of weak shocks""; ""Chapter 5. Validity of the Burgers equation in reaction-diffusion equations""; ""5.1. From phases to wave numbers""; ""5.2. Bloch-wave analysis""; ""5.3. Mode filters, and separation into critical and noncritical modes""; ""5.4. Estimates for residuals and errors""; ""5.5. Proofs of the theorems from Â4.4""; ""Chapter 6. Validity of the inviscid Burgers equation in reaction-diffusion systems""; ""6.1. An illustration: The Ginzburgâ€?Landau equation""""6.2. Formal derivation of the conservation law""""6.3. Validity of the inviscid Burgers equation""; ""6.4. Proof of the theorems from Â6.3""; ""Chapter 7. Modulations of wave trains near sideband instabilities""; ""7.1. Introduction""; ""7.2. An illustration: The Ginzburgâ€?Landau equation""; ""7.3. Validity of the Kortewegâ€?de Vries and the Kuramotoâ€?Sivashinsky equation""; ""7.4. Proof of Theorem 7.2""; ""7.5. Proof of Theorem 7.5""; ""Chapter 8. Existence and stability of weak shocks""; ""8.1. Proof of Theorem 4.10""; ""8.2. Proof of Theorem 4.12""""Chapter 9. Existence of shocks in the long-wavelength limit""""9.1. A lattice model for weakly interacting pulses""; ""9.2. Proof of Theorem 9.2""; ""Chapter 10. Applications""; ""10.1. The FitzHughâ€?Nagumo equation""; ""10.2. The weakly unstable Taylorâ€?Couette problem""; ""Bibliography""Memoirs of the American Mathematical Society ;Volume 199, Number 934.Reaction-diffusion equationsApproximation theoryBurgers equationElectronic books.Reaction-diffusion equations.Approximation theory.Burgers equation.515.3534Doelman A.MiAaPQMiAaPQMiAaPQBOOK9910480757103321The dynamics of modulated wave trains2162257UNINA01003nam a22002531i 450099100138691970753620030122160021.0021219s1976 it |||||||||||||||||ita b1214003x-39ule_instARCHE-022983ExLDip.to Filologia Ling. e Lett.itaA.t.i. Arché s.c.r.l. Pandora Sicilia s.r.l.Duchet, Michèle381768Viaggiatori ed esploratori del Settecento /Michèle DuchetRoma ;Bari :Laterza,1976174 p. ;18 cmLe origini della antropologia ;1Universale Laterza ;353EsploratoriSec. 18..b1214003x02-04-1401-04-03991001386919707536LE008 FL.M. (TR.P.) I A 22V. 112008000368487le008-E0.00-l- 01010.i1246372301-04-03Viaggiatori ed esploratori del Settecento149535UNISALENTOle00801-04-03ma -itait 0101330nam a2200277 i 450099100378045970753620020509132035.0000220s1974 it ||| | ita b11213723-39ule_instPARLA188457ExLDip.to Filosofiaita261.7Convegno su Movimento cattolico e sviluppo capitalistico nel Veneto <1974 ; Padova>540704Movimento cattolico e sviluppo capitalistico :atti del Convegno su Movimento cattolico e sviluppo capitalistico nel Veneto /[relazioni di] Emilio Franzina ... [et al.]Venezia ; Padova :Marsilio,1974188 p. ;21 cmRicerche universitarieMovimento cattolicoVeneto1871-1945Congressi1974Franzina, Emilioauthorhttp://id.loc.gov/vocabulary/relators/aut120743.b1121372323-02-1701-07-02991003780459707536LE005IF XXXVI C 71LE005IFA-9554le005-E0.00-l- 00000.i1136649701-07-02LE009 STOR.67-7212009000366688le009-E0.00-l- 00000.i1257783207-10-03Movimento cattolico e sviluppo capitalistico1457190UNISALENTOle005le00901-01-00ma -itait 01