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040   $aDip.to Filol. Class. e Med. - Sala$bita
082 0 $a481
100 1 $aRoberts, Colin H.$0500878
245 10$aDocuments of the ptolemaic, roman, and byzantine periods :$b(Nos. 552-717) /$cedited by C.H. Roberts and E.G. Turner
260   $aManchester :$bUniversity Press,$c1952
300   $aXVI, 211 p., [8] c. di tav. ;$c33 cm.
490 0 $aCatalogue of the Greek Papyri in the John Rylands Library Manchester ;$v4
650  4$aPapiri documentari - Greci
700 1 $aTurner, Eric G.
740 0 $aP Ryl.
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996   $aDocuments of the ptolemaic, roman, and byzantine periods$9858866
997   $aUNISALENTO
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040   $aDip.to Matematica$beng
082 0 $a515
084   $aAMS 26-01
084   $aAMS 26-XX
084   $aLC QA303.G713
100 1 $aGoursat, Edouard$0335028
245 12$aA course in mathematical analysis /$cby Edouard Goursat ; translated by Earle Raymond Hedrick
260   $aNew York :$bDover,$c[1959-1964]
300   $a3 v. in 5. :$bill. ;$c21 cm.
500   $aOrig. ed. - Hedrick, c1904.
500   $aPubl. in Canada by General Publ., Toronto.
500   $aPubl. in the United Kingdom by Constable and Co., London.
500   $aAn unabridged and unaltered republication of a translation, v. 1 of which was published in French, 1902; v. 2 is from the 2d French ed., 1910-1915; v. 3 is from the 5th French ed., 1956.
505 0 $aV. 1: Derivatives and differentials ; Definite integrals ; Expansion in series ; Applications to geometry / translated by E.R. Hedrick. - viii, 548 p.
505 0 $aV. 2, pt. 1: Functions of a complex variable / translated by E. R. Hedrick and O. Dunkel. - x, 259 p.
505 0 $aV. 2, pt. 2: Differential equations / translated by E. R. Hedrick and O. Dunkel.
505 0 $aV. 3, pt. 1: Variation of solutions ; Partial differential equations of the second order / translated by H. G. Bergmann.
505 0 $aV. 3, pt. 2: Integral equations ; Calculus of variations / translated by H. G. Bergmann.
650  4$aMathematical analysis
700 1 $aHedrick, Earle Raymond
700 1 $aDunkel, Otto
700 1 $aBergmann, H. G.
740 02$aDerivatives and differentials ; Definite integrals ; Expansion in series ; Applications to geometry / by Edouard Goursat
740 02$aFunctions of a complex variable / by Edouard Goursat
907   $a.b10854836$b21-09-06$c28-06-02
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996   $aCourse in mathematical analysis$9332267
997   $aUNISALENTO
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