LEADER 01055cam0 22002411 450 001 SOBE00052906 005 20160701101254.0 100 $a20160701d1931 |||||ita|0103 ba 101 $aita 102 $aIT 200 1 $aDiscorso per la commemorazione del Sen. Prof. Enrico Cocchia tenuto nella R. Universitā di Napoli il 14 marzo 1931 dal Prof. Marco Galdi $fMarco Galdi 210 $aNapoli$cTipografia della R. Universitā di A. Cimmaruta$d1931 215 $a196-216 p.$d28 cm 700 1$aGaldi$b, Marco$3SOBA00011280$4070$083893 801 0$aIT$bUNISOB$c20160701$gRICA 850 $aUNISOB 852 $aUNISOB$j870|Opusc$m77936 912 $aSOBE00052906 940 $aM 102 Monografia moderna SBN 941 $aM 957 $a870|Opusc$b000078$gSI$d77936$!dedica dell'autore$!dedica dell'autore$1catenaccif$2UNISOB$3UNISOB$420160701101228.0$520160701101254.0$6catenaccif 996 $aDiscorso per la commemorazione del Sen. Prof. Enrico Cocchia tenuto nella R. Universitā di Napoli il 14 marzo 1931 dal Prof. Marco Galdi$91724697 997 $aUNISOB LEADER 03726nam 22006375 450 001 9910906292803321 005 20250212080801.0 010 $a9783031571121$b(electronic bk.) 010 $z9783031571114 024 7 $a10.1007/978-3-031-57112-1 035 $a(MiAaPQ)EBC31758477 035 $a(Au-PeEL)EBL31758477 035 $a(CKB)36516668000041 035 $a(DE-He213)978-3-031-57112-1 035 $a(EXLCZ)9936516668000041 100 $a20241108d2024 u| 0 101 0 $aeng 135 $aurcnu|||||||| 181 $ctxt$2rdacontent 182 $cc$2rdamedia 183 $acr$2rdacarrier 200 10$aTwo-dimensional Self-independent Variable Cubic Nonlinear Systems /$fby Albert C. J. Luo 205 $a1st ed. 2024. 210 1$aCham :$cSpringer Nature Switzerland :$cImprint: Springer,$d2024. 215 $a1 online resource (282 pages) 311 08$aPrint version: Luo, Albert C. J. Two-Dimensional Self-independent Variable Cubic Nonlinear Systems Cham : Springer,c2025 9783031571114 327 $aConstant and Self-Cubic Vector fields -- Self-linear and Self-cubic vector fields -- Self-quadratic and self-cubic vector fields -- Two self-cubic vector fields. 330 $aThis book is the third of 15 related monographs, presents systematically a theory of self-cubic nonlinear systems. Here, at least one vector field is self-cubic, the other vector fields can be constant, self-linear, self-quadratic, and self-cubic. For constant vector fields in this book, the dynamical systems possess 1-dimensional flows, such as source, sink and saddle flows, plus third-order source and sink flows. For self-linear and self-cubic systems, the dynamical systems possess source, sink, and saddle equilibriums, saddle-source and saddle-sink equilibriums, third-order source and sink (i.e., ( 3rdSO:SO)-source, ( 3rdSI:SI)-sink) and third-order saddle (i.e., (3rdSO:SI)-saddle, 3rdSI:SO)-saddle). For self-quadratic and self-cubic systems, in addition to the first and third-order source, sink, saddles plus saddle-source, saddle-sink, there are (3,2)-saddle-sink, (3,2)-saddle-source and double-saddles, and for the two self-cubic systems, double third-order source, sink and saddles exist. Finally, the authors describes thar the homoclinic orbits without cen-ters can be formed, and the corresponding homoclinic networks of source, sink and saddles exist. ? Develops equilibrium singularity and bifurcations in 2-dimensional self-cubic systems; ? Presents (1,3) and (3,3)-sink, source, and saddles; (1,2) and (3,2)-saddle-sink and saddle-source; (2,2)-double-saddles; ? Develops homoclinic networks of source, sink and saddles. . 606 $aPlasma waves 606 $aDynamics 606 $aNonlinear theories 606 $aMechanics, Applied 606 $aMultibody systems 606 $aVibration 606 $aWaves, instabilities and nonlinear plasma dynamics 606 $aApplied Dynamical Systems 606 $aEngineering Mechanics 606 $aMultibody Systems and Mechanical Vibrations 615 0$aPlasma waves. 615 0$aDynamics. 615 0$aNonlinear theories. 615 0$aMechanics, Applied. 615 0$aMultibody systems. 615 0$aVibration. 615 14$aWaves, instabilities and nonlinear plasma dynamics. 615 24$aApplied Dynamical Systems. 615 24$aEngineering Mechanics. 615 24$aMultibody Systems and Mechanical Vibrations. 676 $a530.44 700 $aLuo$b Albert C. J$0720985 801 0$bMiAaPQ 801 1$bMiAaPQ 801 2$bMiAaPQ 912 $a9910906292803321 996 $aTwo-dimensional Self-independent Variable Cubic Nonlinear Systems$94294983 997 $aUNINA LEADER 02247nam0 22004933i 450 001 VAN00288475 005 20250430022528.932 017 70$2N$a9789401134408 100 $a20250306d1991 |0itac50 ba 101 $aeng 102 $aNL 105 $a|||| ||||| 181 $ai$b e 182 $ab 183 $acr 200 1 $aMathematical Models in Electrical Circuits: Theory and Applications$fby C. A. Marinov and P. Neittaanmäki 210 $aDordrecht$cSpringer$d1991 215 $ax, 160 p.$cill.$d24 cm 410 1$1001VAN00022423$12001 $aMathematics and its applications$1210 $aDordrecht$cReidel$d1977-2007$1300 $aL'editore varia in: Kluwer ; [poi] Springer$v66 606 $a93C20$xControl/observation systems governed by partial differential equations [MSC 2020]$3VANC022761$2MF 606 $a94-XX$xInformation and communication theory, circuits [MSC 2020]$3VANC019701$2MF 606 $a94C05$xAnalytic circuit theory [MSC 2020]$3VANC023168$2MF 606 $a94C15$xApplications of graph theory to circuits and networks [MSC 2020]$3VANC031126$2MF 606 $a94Cxx$xCircuits, networks [MSC 2020]$3VANC027151$2MF 610 $aDifferential equations$9KW:K 610 $aFinite element methods$9KW:K 610 $aIntegrated circuits$9KW:K 610 $aLinear optimization$9KW:K 610 $aModels$9KW:K 610 $aNetworks$9KW:K 610 $aOperators$9KW:K 610 $aTransistor$9KW:K 620 $aNL$dDordrecht$3VANL000068 700 1$aMarinov$bCorneliu A.$3VANV243116$01784276 701 1$aNeittaanmäki$bPekka$3VANV083859$0340503 712 $aSpringer $3VANV108073$4650 801 $aIT$bSOL$c20250606$gRICA 856 4 $uhttps://doi.org/10.1007/978-94-011-3440-8$zE-book ? 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