LEADER 02469nam0 22005413i 450 001 VAN0250111 005 20230531022819.983 017 70$2N$a9789811593512 100 $a20220913d2020 |0itac50 ba 101 $aeng 102 $aSG 105 $a|||| ||||| 200 1 $aDiophantine Approximation and Dirichlet Series$fHervé Queffélec, Martine Queffélec 205 $a2. ed 210 $aSingapore$cSpringer ; New Delhi$cHindustan Book Agency$d2020 215 $axix, 287 p.$cill.$d24 cm 410 1$1001VAN0045994$12001 $aTexts and readings in mathematics$1210 $aNew Delhi$cHindustan ; Singapore$cSpringer$v80 500 1$3VAN0250112$aDiophantine Approximation and Dirichlet Series$92909528 606 $a11-XX$xNumber theory [MSC 2020]$3VANC019688$2MF 606 $a46-XX$xFunctional analysis [MSC 2020]$3VANC019764$2MF 606 $a11M41$xOther Dirichlet series and zeta functions [MSC 2020]$3VANC021868$2MF 606 $a11Jxx$xDiophantine approximation, transcendental number theory [MSC 2020]$3VANC023205$2MF 606 $a30B50$xDirichlet series, exponential series and other series in one complex variable [MSC 2020]$3VANC025275$2MF 610 $aBagchi-Voronin theorems$9KW:K 610 $aBohr point$9KW:K 610 $aCompact Operators$9KW:K 610 $aDiophantine approximation$9KW:K 610 $aDirichlet Series$9KW:K 610 $aErgodic theory$9KW:K 610 $aHardy-Dirichlet spaces$9KW:K 610 $aRudin-Shapiro$9KW:K 610 $aThue-Morse$9KW:K 610 $acompact operator$9KW:K 610 $ar-tuples$9KW:K 620 $aSG$dSingapore$3VANL000061 620 $aIN$dNew Delhi$3VANL001098 700 1$aQueffélec$bHervé$3VANV204406$0731205 701 1$aQueffélec$bMartine$3VANV204407$058504 712 $aHindustan book agency $3VANV111183$4650 712 $aSpringer $3VANV108073$4650 801 $aIT$bSOL$c20240621$gRICA 856 4 $uhttp://doi.org/10.1007/978-981-15-9351-2$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 $aVAN0250111 950 $aBIBLIOTECA DEL DIPARTIMENTO DI MATEMATICA E FISICA$d08CONS e-book 4946 $e08eMF4946 20220913 996 $aDiophantine Approximation and Dirichlet Series$92909528 997 $aUNICAMPANIA