LEADER 00887nam 2200325 450 001 990005801710203316 005 20130129164841.0 010 $a978-88-7695-471 035 $a000580171 035 $aUSA01000580171 035 $a(ALEPH)000580171USA01 035 $a000580171 100 $a20130129d2012----km-y0itay50------ba 101 $aita 102 $aIT 105 $a||||||||001yy 200 1 $aAnalisi del discorso$fDonella Antelmi 210 $aTorino$cUTET Universitą$d2012 215 $a252 p.$d24 cm 606 0 $aLinguaggio$xAnalisi strutturale$2BNCF 676 $a415 700 1$aANTELMI,$bDonella$0166732 801 0$aIT$bsalbc$gISBD 912 $a990005801710203316 951 $aIV.2. 2424$b8093 L.G.$cIV.2.$d00318685 959 $aBK 969 $aUMA 979 $aCHIARA$b90$c20130129$lUSA01$h1648 996 $aAnalisi del discorso$91080558 997 $aUNISA LEADER 01200nam0-2200397-i-450- 001 990008793430403321 005 20090506123803.0 010 $a978-1-58488-459-0 035 $a000879343 035 $aFED01000879343 035 $a(Aleph)000879343FED01 035 $a000879343 100 $a20090119d2008----km-y0itay50------ba 101 0 $aeng 102 $aUS 105 $aa-------001yy 200 1 $aDifference methods for singular pertubation problems$fG. I. Shishkin, Lidia P. Shishkina 210 $aBoca Raton$cChapman & Hall$dc2008 215 $axiv, 393 p.$d24 cm 225 1 $aChapman & Hall/CRC monographs and surveys in pure and applied mathematics$v140 610 0 $aPerturbazione (matematica) 610 0 $aAlgebra astratta 676 $a515.39$v22 700 1$aShishkin,$bGrigory I.$0504486 701 1$aShishkina,$bLidia P.$0504487 801 0$aIT$bUNINA$gRICA$2UNIMARC 901 $aBK 912 $a990008793430403321 952 $aC-18-(140$b23541$fMA1 952 $a02 44 E 34$b8569$fFINBN 959 $aMA1 959 $aFINBN 962 $a34E20 962 $a34MXX 996 $aDifference methods for singular pertubation problems$9808358 997 $aUNINA LEADER 02227nam 2200601 450 001 9910788730903321 005 20180613001259.0 010 $a1-4704-0177-0 035 $a(CKB)3360000000464776 035 $a(EBL)3113954 035 $a(SSID)ssj0000888768 035 $a(PQKBManifestationID)11480041 035 $a(PQKBTitleCode)TC0000888768 035 $a(PQKBWorkID)10865649 035 $a(PQKB)10080985 035 $a(MiAaPQ)EBC3113954 035 $a(RPAM)4471572 035 $a(PPN)195414748 035 $a(EXLCZ)993360000000464776 100 $a20140909h19961996 uy 0 101 0 $aeng 135 $aur|n|---||||| 181 $ctxt 182 $cc 183 $acr 200 10$aAnalytic deformations of the spectrum of a family of Dirac operators on an odd-dimensional manifold with boundary /$fP. Kirk, E. Klassen 210 1$aProvidence, Rhode Island :$cAmerican Mathematical Society,$d1996. 210 4$d©1996 215 $a1 online resource (73 p.) 225 1 $aMemoirs of the American Mathematical Society,$x0065-9266 ;$vNumber 592 300 $a"November 1996, Volume 124, Number 592 (third of 5 numbers)." 311 $a0-8218-0538-X 320 $aIncludes bibliographical references. 327 $a""Chapter 7. Time derivatives of extended L[sup(2)] and APS eigenvalues""""7.1. Deformations of APS and extended L[sup(2)] eigenvalues coincide""; ""7.2. Proof of Theorem 7.1""; ""Bibliography"" 410 0$aMemoirs of the American Mathematical Society ;$vNumber 592. 606 $aDifferential equations, Elliptic 606 $aComplex manifolds 606 $aDirac equation 606 $aSpectral theory (Mathematics) 615 0$aDifferential equations, Elliptic. 615 0$aComplex manifolds. 615 0$aDirac equation. 615 0$aSpectral theory (Mathematics) 676 $a515/.353 700 $aKirk$b P$g(Paul),$01580662 702 $aKlassen$b E$g(Eric),$f1958- 801 0$bMiAaPQ 801 1$bMiAaPQ 801 2$bMiAaPQ 906 $aBOOK 912 $a9910788730903321 996 $aAnalytic deformations of the spectrum of a family of Dirac operators on an odd-dimensional manifold with boundary$93861750 997 $aUNINA