01987nam0 2200397 i 450 SUN011506820180228122650.5680.00N978-3-319-27323-520180221d2016 |0engc50 baengCH|||| |||||*Non-archimedean operator theoryToka Diagana, François RamarosonCham : Springer, 2016XIII156 p. ; 24 cmPubblicazione in formato elettronico001SUN01025962001 *SpringerBriefs in mathematics210 BerlinSpringer2011-.47A53(Semi-) Fredholm operators; index theories [MSC 2020]MFSUNC01987135P05General topics in linear spectral theory for PDEs [MSC 2020]MFSUNC02122312J25Non-Archimedean valued fields [MSC 2020]MFSUNC02216732PxxNon-Archimedean analysis [MSC 2020]MFSUNC02399826E30Non-Archimedean analysis [MSC 2020]MFSUNC02510446S10Functional analysis over fields other than ${\bf R}$ or ${\bf C}$ or the quaternions; non-Archimedean functional analysis [MSC 2020]MFSUNC03152037P20Dynamical systems over non-Archimedean local ground fields [MSC 2020]MFSUNC03401547S10Operator theory over fields other than ${\bf R}$, ${\bf C}$ or the quaternions; non-Archimedean operator theory [MSC 2020]MFSUNC034016CHChamSUNL001889Diagana, TokaSUNV089079756010Ramaroson, FrançoisSUNV089080756011SpringerSUNV000178650ITSOL20201019RICAhttp://dx.doi.org/10.1007/978-3-319-27323-5SUN0115068BIBLIOTECA CENTRO DI SERVIZIO SBA15CONS SBA EBOOK 2405 15EB 2405 20180221 Non-archimedean operator theory1523510UNICAMPANIA