LEADER 02152nam0 22005173i 450 
001 VAN0276773
005 20240604122812.934
017 70$2N$a9783030950880
100   $a20240604d2022       |0itac50      ba
101   $aeng
102   $aCH
105   $a||||    |||||
200 1 $aˆA ‰Generalization of Bohr-Mollerup's Theorem for Higher Order Convex Functions$fJean-Luc Marichal, Naïm Zenaïdi
210   $aCham$cSpringer$d2022
215   $axviii, 323 p.$cill.$d24 cm
410  1$1001VAN0102857$12001 $aDevelopments in Mathematics$1210  $aBerlin [etc.]$cSpringer$v70
610   $aBinet's Function$9KW:K
610   $aBohr-Mollerup's Theorem$9KW:K
610   $aDifference equations$9KW:K
610   $aEuler Product Form$9KW:K
610   $aEuler's Constant$9KW:K
610   $aEuler's Infinite Product$9KW:K
610   $aEuler's Reflection Formula$9KW:K
610   $aGamma Function$9KW:K
610   $aGauss Multiplication Formula$9KW:K
610   $aGauss' Limit$9KW:K
610   $aGeneralized Stieltjes Constants$9KW:K
610   $aHigher Order Convexity$9KW:K
610   $aHurwitz zeta function$9KW:K
610   $aPolygamma Functions$9KW:K
610   $aPrincipal Indefinite Sums$9KW:K
610   $aRaabe's Formula$9KW:K
610   $aStirling's Formula$9KW:K
610   $aWeierstrass' Infinite Product$9KW:K
620   $aCH$dCham$3VANL001889
700  1$aMarichal$bJean-Luc$3VANV229468$01255007
701  1$aZenaïdi$bNaïm$3VANV229469$01255008
712   $aSpringer <editore>$3VANV108073$4650
801   $aIT$bSOL$c20240614$gRICA
856 4 $uhttps://doi.org/10.1007/978-3-030-95088-0$zE-book ? Accesso al full-text attraverso riconoscimento IP di Ateneo, proxy e/o Shibboleth
899   $aBIBLIOTECA DEL DIPARTIMENTO DI MATEMATICA E FISICA$1IT-CE0120$2VAN08
912   $fN
912   $aVAN0276773
950   $aBIBLIOTECA DEL DIPARTIMENTO DI MATEMATICA E FISICA$d08CONS      e-Book                  8640        $e08eMF8640              20240605            
996   $aGeneralization of Bohr-Mollerup's Theorem for Higher Order Convex Functions$94161042
997   $aUNICAMPANIA