001451920 000__ 04144cam\a2200529\i\4500
001451920 001__ 1451920
001451920 003__ OCoLC
001451920 005__ 20230310004724.0
001451920 006__ m\\\\\o\\d\\\\\\\\
001451920 007__ cr\cn\nnnunnun
001451920 008__ 221220s2022\\\\si\a\\\\o\\\\\001\0\eng\d
001451920 019__ $$a1353256155$$a1354208652$$a1355372151
001451920 020__ $$a9789811964343$$q(electronic bk.)
001451920 020__ $$a9811964343$$q(electronic bk.)
001451920 020__ $$z9811964335
001451920 020__ $$z9789811964336
001451920 0247_ $$a10.1007/978-981-19-6434-3$$2doi
001451920 035__ $$aSP(OCoLC)1355501386
001451920 040__ $$aGW5XE$$beng$$erda$$epn$$cGW5XE$$dEBLCP$$dYDX$$dFIE$$dUKAHL$$dOCLCQ$$dOCLCF
001451920 049__ $$aISEA
001451920 050_4 $$aQA377
001451920 08204 $$a515/.353$$223/eng/20221220
001451920 24500 $$aQualitative properties of dispersive PDEs /$$cVladimir Georgiev, Alessandro Michelangeli, Raffaele Scandone, editors.
001451920 264_1 $$aSingapore :$$bSpringer,$$c2022.
001451920 300__ $$a1 online resource :$$billustrations (black and white, and color).
001451920 336__ $$atext$$btxt$$2rdacontent
001451920 337__ $$acomputer$$bc$$2rdamedia
001451920 338__ $$aonline resource$$bcr$$2rdacarrier
001451920 4901_ $$aSpringer INdAM series ;$$vvolume 52
001451920 500__ $$aIncludes author index.
001451920 5050_ $$aPart I: Long-time behavior of NLS-type equations -- 1 Scipio Cuccagna, Note on small data soliton selection for nonlinear Schrodinger equations with potential -- 2 Jacopo Bellazzini and Luigi Forcella, Dynamics of solutions to the Gross-Pitaevskii equation describing dipolar Bose-Einstein condensates -- Part II: Probabilistic and nonstandard methods in the study of NLS equations -- 3 Renato Luca, Almost sure pointwise convergence of the cubic nonlinear Schrodinger equation on T^2 -- 4 Nevena Dugandzija and Ivana Vojnovic, Nonlinear Schrodinger equation with singularities -- Part III: Dispersive properties -- 5 Vladimir Georgiev, Alessandro Michelangeli, Raffaele Scandone, Schrodinger flow's dispersive estimates in a regime of re-scaled potentials -- 6 Federico Cacciafesta, Eric Sere, Junyong Zhang, Dispersive estimates for the Dirac-Coulomb equation -- 7 Matteo Gallone, Alessandro Michelangeli, Eugenio Pozzoli, Heat equation with inverse-square potential of bridging type across two half-lines -- Part IV: Wave and Kdv-type equations -- 8 Felice Iandoli, On the Cauchy problem for quasi-linear Hamiltonian KdV-type equations -- 9 Vladimir Georgiev and Sandra Lucente, Linear and nonlinear interaction for wave equations with time variable coefficients -- 10 Matteo Gallone and Antonio Ponno, Hamiltonian field theory close to the wave equation: from Fermi-Pasta-Ulam to water waves.
001451920 506__ $$aAccess limited to authorized users.
001451920 520__ $$aThis book provides a valuable collection of contributions by distinguished scholars presenting the state of the art and some of the most significant latest developments and future challenges in the field of dispersive partial differential equations. The material covers four major lines: (1) Long time behaviour of NLS-type equations, (2) probabilistic and nonstandard methods in the study of NLS equation, (3) dispersive properties for heat-, Schrodinger-, and Dirac-type flows, (4) wave and KdV-type equations. Across a variety of applications an amount of crucial mathematical tools are discussed, whose applicability and versatility goes beyond the specific models presented here. Furthermore, all contributions include updated and comparative literature.
001451920 588__ $$aDescription based on print version record.
001451920 650_0 $$aDifferential equations, Partial.
001451920 655_0 $$aElectronic books.
001451920 7001_ $$aGeorgiev, Vladimir,$$eeditor.
001451920 7001_ $$aMichelangeli, Alessandro,$$eeditor.
001451920 7001_ $$aScandone, Raffaele,$$eeditor.
001451920 77608 $$iPrint version:$$tQUALITATIVE PROPERTIES OF DISPERSIVE PDES.$$d[Place of publication not identified] : SPRINGER VERLAG, SINGAPOR, 2022$$z9811964335$$w(OCoLC)1338831096
001451920 830_0 $$aSpringer INdAM series ;$$vv. 52.
001451920 852__ $$bebk
001451920 85640 $$3Springer Nature$$uhttps://univsouthin.idm.oclc.org/login?url=https://link.springer.com/10.1007/978-981-19-6434-3$$zOnline Access$$91397441.1
001451920 909CO $$ooai:library.usi.edu:1451920$$pGLOBAL_SET
001451920 980__ $$aBIB
001451920 980__ $$aEBOOK
001451920 982__ $$aEbook
001451920 983__ $$aOnline
001451920 994__ $$a92$$bISE