LEADER 02291nam0 2200433 i 450 
001 SUN0126936
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010   $d0.00
017 70$2N$a978-3-030-24261-9
100   $a20200218d2019       |0engc50      ba
101   $aeng
102   $aCH
105   $a||||    |||||
200 1 $a*Introduction to the Foundations of Applied Mathematics$fMark H. Holmes
205   $a2. ed
210   $aCham$cSpringer$d2019
215   $axvi, 528 p.$cill.$d24 cm
410  1$1001SUN0033353$12001 $a*Texts in applied mathematics$v56$1210  $aNew York$cSpringer$d1988-.
606   $a60Jxx$xMarkov processes [MSC 2020]$2MF$3SUNC019842
606   $a76Bxx$xIncompressible inviscid fluids [MSC 2020]$2MF$3SUNC020659
606   $a76Dxx$xIncompressible viscous fluids [MSC 2020]$2MF$3SUNC020660
606   $a34Dxx$xStability theory for ordinary differential equation [MSC 2020]$2MF$3SUNC022333
606   $a76Axx$xFoundations, constitutive equations, rheology, hydrodynamical models of non-fluid phenomena [MSC 2020]$2MF$3SUNC022752
606   $a35Cxx$xRepresentations of solutions to partial differential equations [MSC 2020]$2MF$3SUNC023083
606   $a74Dxx$xMaterials of strain-rate type and history type, other materials with memory (including elastic materials with viscous damping, various viscoleastic materials) [MSC 2020]$2MF$3SUNC023359
606   $a74Bxx$xElastic materials [MSC 2020]$2MF$3SUNC023433
606   $a74Hxx$xDynamical problems in solid mechanics [MSC 2020]$2MF$3SUNC023456
606   $a34Exx$xAsymptotic theory for ordinary differential equation [MSC 2020]$2MF$3SUNC024393
606   $a35F50$xSystems of nonlinear first-order PDEs [MSC 2020]$2MF$3SUNC033422
620   $aCH$dCham$3SUNL001889
700  1$aHolmes$b, Mark H.$3SUNV044549$061979
712   $aSpringer$3SUNV000178$4650
790  1$aHolmes, M. H.$zHolmes, Mark H.$3SUNV064200
801   $aIT$bSOL$c20210503$gRICA
856 4 $uhttp://doi.org/10.1007/978-3-030-24261-9
912   $aSUN0126936
950   $aUFFICIO DI BIBLIOTECA DEL DIPARTIMENTO DI MATEMATICA E FISICA$d08CONS      e-book                  1623        $e08eMF1623              20200218            
996   $aIntroduction to the foundations of applied mathematics$9229916
997   $aUNICAMPANIA