02104nam0 2200409 i 450 SUN011375720191023103801.1820.00N978-3-319-22870-920180118d2015 |0engc50 baengCH|||| |||||The *analysis and geometry of Hardy's inequalityAlexander A. Balinsky, W. Desmond Evans, Roger T. Lewis[Cham] : Springer, 2015XV263 p.ill. ; 24 cmPubblicazione in formato elettronico001SUN00245062001 *Universitext210 BerlinSpringer.31A05Harmonic, subharmonic, superharmonic functions in two dimensions [MSC 2020]MFSUNC02077131B05Harmonic, subharmonic, superharmonic functions in higher dimensions [MSC 2020]MFSUNC02231235Q40PDEs in connection with quantum mechanics [MSC 2020]MFSUNC02286534A40Theoretical approximation of solutions to ordinary differential equations [MSC 2020]MFSUNC02314235R45Partial differential inequalities and systems of partial differential inequalities [MSC 2020]MFSUNC02870835A23Inequalities applied to PDEs involving derivatives, differential and integral operators, or integrals [MSC 2020]MFSUNC031168CHChamSUNL001889Balinsky, Alexander A.SUNV087864755654Evans, W. DesmondSUNV036603521422Lewis, Roger T.SUNV08786648271SpringerSUNV000178650Evans, William DesmondEvans, W. DesmondSUNV096096Evans, W. D.Evans, W. DesmondSUNV096097ITSOL20210503RICAhttp://dx.doi.org/10.1007/978-3-319-22870-9SUN0113757UFFICIO DI BIBLIOTECA DEL DIPARTIMENTO DI MATEMATICA E FISICA08CONS e-book 0466 08eMF466 20180118 Analysis and geometry of Hardy's inequality1522772UNICAMPANIA