LEADER 02049nam0 2200517 i 450 
001 VAN0104381
005 20220224022123.545
017 70$2N$a978-981-287-257-9
100   $a20151222d2014       |0itac50      ba
101   $aeng
102   $aSG
105   $a||||    |||||
200 1 $aNon-metrisable manifolds$fDavid Gauld
210   $aSingapore [etc.]$cSpringer$d2014
215   $aXVI, 203 p.$cill.$d24 cm
500  1$3VAN0241501$aNon-metrisable manifolds$91410052
606   $a54E35$xMetric spaces, metrizability [MSC 2020]$3VANC022376$2MF
606   $a57Nxx$xTopological manifolds [MSC 2020]$3VANC023566$2MF
606   $a37Bxx$xTopological dynamics [MSC 2020]$3VANC029254$2MF
610   $aBagpipe Theorem$9KW:K
610   $aBrown?s Monotone Union Theorem$9KW:K
610   $aContinuum Hypothesis$9KW:K
610   $aDynamics on Manifolds$9KW:K
610   $aExotic Structures on Long Plane$9KW:K
610   $aFoliations of the Plane$9KW:K
610   $aFoliations on Manifolds$9KW:K
610   $aHandlebody$9KW:K
610   $aLong Line$9KW:K
610   $aMetrisability Criteria for Manifolds$9KW:K
610   $aNon-Hausdorff Manifolds$9KW:K
610   $aNon-metrisable Manifolds$9KW:K
610   $aPerfect Normality versus Metrisability$9KW:K
610   $aPrüfer Manifold$9KW:K
610   $aSmooth manifolds$9KW:K
610   $aType I Manifold$9KW:K
620   $aSG$dSingapore$3VANL000061
700  1$aGauld$bDavid$3VANV081413$0721164
712   $aSpringer <editore>$3VANV108073$4650
801   $aIT$bSOL$c20240614$gRICA
856 4 $uhttp://dx.doi.org/10.1007/978-981-287-257-9$zE-book ? Accesso al full-text attraverso riconoscimento IP di Ateneo, proxy e/o Shibboleth
899   $aBIBLIOTECA CENTRO DI SERVIZIO SBA$2VAN15
912   $fN
912   $aVAN0104381
950   $aBIBLIOTECA CENTRO DI SERVIZIO SBA$d15CONS      SBA EBOOK 4313                      $e15EB 4313              20191106            
996   $aNon-metrisable manifolds$91410052
997   $aUNICAMPANIA