02137nam2 2200517 450 00003332520141211102606.00 19 814524 120120918d1913----km-y0itaa50------bagrcGB<<Tomus III: insunt>> Helena, Phoenissae,Orestes, Bacchae, Iphigenia Aulidensis, Rhesusrecognovit brevique adnotatione critica instruxit Gilbertus MurraySecond editionOxoniie Typographeo Clarendoniano1913VIII, [paginazione assente]19 cmScriptorum classicorum bibliotheca Oxoniensis2001Scriptorum classicorum bibliotheca Oxoniensis0010000333222001Euripidis Fabulaevol. 3Helena / Euripides534291Phoenissae / Euripides19907Orestes / Euripides19906Bacchae / Euripides17651Iphigenia Aulidensis / Euripides19086Rhesus / Euripides19905Tragoediae / Euripides882.01(22. ed.)Dramma e poesia drammatica in greco classico. Origini-500Euripides<480-407 a.C.>229973Murray,GilbertITUniversità della Basilicata - B.I.A.REICATunimarc000033325Iphigenia Aulidensis19086Phoenissae19907Bacchae17651Orestes19906Rhesus19905Helena534291UNIBASATR4020120918BAS011006ATR4020120918BAS011007ATR4020140610BAS011520ATR4020141111BAS010958ATR0020141211BAS011025EXT0130120141211BAS011026BAS01BAS01BOOKBASA1Polo Storico-UmanisticoDSLFCollezione DiSLFFP/CLASSICI 1221 A6002F60022014111104Prestabile DidatticaBAS01BAS01BOOKBASA1Polo Storico-UmanisticoGENCollezione generaleFP/CLASSICI 122115517L155172012091802Prestabile Generale03819nam 2200889z- 450 991055760290332120210501(CKB)5400000000045374(oapen)https://directory.doabooks.org/handle/20.500.12854/69160(oapen)doab69160(EXLCZ)99540000000004537420202105d2020 |y 0engurmn|---annantxtrdacontentcrdamediacrrdacarrierMathematical and Numerical Analysis of Nonlinear Evolution EquationsAdvances and PerspectivesBasel, SwitzerlandMDPI - Multidisciplinary Digital Publishing Institute20201 online resource (208 p.)3-03943-272-9 3-03943-273-7 The topic of this book is the mathematical and numerical analysis of some recent frameworks based on differential equations and their application in the mathematical modeling of complex systems, especially of living matter. First, the recent new mathematical frameworks based on generalized kinetic theory, fractional calculus, inverse theory, Schrödinger equation, and Cahn-Hilliard systems are presented and mathematically analyzed. Specifically, the well-posedness of the related Cauchy problems is investigated, stability analysis is also performed (including the possibility to have Hopf bifurcations), and some optimal control problems are presented. Second, this book is concerned with the derivation of specific models within the previous mentioned frameworks and for complex systems in biology, epidemics, and engineering. This book is addressed to graduate students and applied mathematics researchers involved in the mathematical modeling of complex systems.Mathematical and Numerical Analysis of Nonlinear Evolution Equations Mathematics & sciencebicsscResearch & information: generalbicsscabstract Cauchy problemactive particlesalmost (s, q)-Jaggi-typeautoimmune diseaseb-metric-like spacesbasic reproduction numberboundednessC0−semigroupCahn-Hilliard systemsCauchy problemcompartment modelcomplex systemsDavydov's modeldegenerate equationsdelaydiscrete Fourier transformdiscrete kinetic theorydynamical systemselectric circuit equationsepidemicsevolution equationsexact solutionsfractional derivativefractional operatorsHopf bifurcationintegro-differential equationsinverse problemkinetic theoryLyapunov functionalnecessary optimality conditionsnonequilibrium stationary statesnonlinearityoptimal controlpartial differential equationsreal activity variableregularitySchrödinger equationsecond-order differential equationsSEIQRS-V modelstabilitythermostatwardoski contractionwell-posednessMathematics & scienceResearch & information: generalBianca Carloedt1327532Bianca CarloothBOOK9910557602903321Mathematical and Numerical Analysis of Nonlinear Evolution Equations3037986UNINA