LEADER 03787nam2 2200529 i 450 
001 SUN0125157
005 20191113114444.776
010   $d0.00
017 70$2N$a978-981-13-2715-5
100   $a20191031d2018       |0engc50      ba
101   $aeng
102   $aSG
105   $a||||    |||||
200 1 $a<<*Quantum Theory and Symmetries with Lie Theory and Its Applications in Physics$eQTS-X/LT-XII, Varna, Bulgaria, June 2017>> 1$fVladimir Dobrev editor
205   $aSingapore : Springer, 2018
210   $axv$d419 p.$cill. ; 24 cm
215   $aPubblicazione in formato elettronico
410  1$1001SUN0102574$12001 $a*Springer proceedings in mathematics & statistics$v263$1210  $aBerlin$cSpringer$d2012-.
461  1$1001SUN0125159$12001 $a*Quantum Theory and Symmetries with Lie Theory and Its Applications in Physics$eQTS-X/LT-XII, Varna, Bulgaria, June 2017$fVladimir Dobrev editor$v1$1210  $aSingapore$cSpringer$d2018$1215  $avolumi$cill.$d24 cm.
606   $a58B34$xNoncommutative geometry (a la Connes) [MSC 2020]$2MF$3SUNC021523
606   $a83C65$xMethods of noncommutative geometry in general relativity [MSC 2020]$2MF$3SUNC021526
606   $a11S40$xZeta functions and $L$-functions [MSC 2020]$2MF$3SUNC021786
606   $a11R42$xZeta functions and $L$-functions of number fields [MSC 2020]$2MF$3SUNC021832
606   $a35Q53$xKdV equations (Korteweg-de Vries equations) [MSC 2020]$2MF$3SUNC022707
606   $a17Bxx$xLie algebras and Lie superalgebras [MSC 2020]$2MF$3SUNC024319
606   $a22E65$xInfinite-dimensional Lie groups and their Lie algebras: general properties  [MSC 2020]$2MF$3SUNC024368
606   $a20G42$xQuantum groups (quantized function algebras) and their representations [MSC 2020]$2MF$3SUNC026946
606   $a37J35$xCompletely integrable finite-dimensional Hamiltonian systems, integration methods, integrability tests [MSC 2020]$2MF$3SUNC029280
606   $a37K10$xCompletely integrable infinite-dimensional Hamiltonian and Lagrangian systems, integration methods, integrability tests, integrable hierarchies (KdV, KP, Toda, etc.) [MSC 2020]$2MF$3SUNC029281
606   $a70H06$xCompletely integrable systems and methods of integration for problems in Hamiltonian and Lagrangian mechanics [MSC 2020]$2MF$3SUNC029282
606   $a81Rxx$xGroups and algebras in quantum theory [MSC 2020]$2MF$3SUNC031461
606   $a17A70$xSuperalgebras [MSC 2020]$2MF$3SUNC033996
606   $a11M32$xMultiple Dirichlet series and zeta functions and multizeta values [MSC 2020]$2MF$3SUNC035213
606   $a91B80$xApplications of statistical and quantum mechanics to economics (econophysics) [MSC 2020]$2MF$3SUNC035427
606   $a33D80$xConnections of basic hypergeometric functions with quantum groups, Chevalley groups, $p$-adic groups, Hecke algebras, and related topics [MSC 2020]$2MF$3SUNC035428
606   $a19F27$xÉtale cohomology, higher regulators, zeta and $L$-functions ($K$-theoretic aspects) [MSC 2020]$2MF$3SUNC035429
620   $aSG$dSingapore$3SUNL000061
702  1$aDobrev$b, Vladimir$3SUNV081364
712 12$aInternational Symposium on Quantum Theory and Symmetries$d10.$f2017$eVarna, Bulgaria$3SUNV096619
712 12$aInternational Workshop in Lie Theory and Its Applications in Physics$d12.$f2017$eVarna, Bulgaria$3SUNV096620
712   $aSpringer$3SUNV000178$4650
801   $aIT$bSOL$c20210503$gRICA
856 4 $uhttp://doi.org/10.1007/978-981-13-2715-5
912   $aSUN0125157
950   $aUFFICIO DI BIBLIOTECA DEL DIPARTIMENTO DI MATEMATICA E FISICA$d08CONS      e-book                  1331        $e08eMF1331              20191031            
996   $aQuantum Theory and Symmetries with Lie Theory and Its Applications in Physics$91563609
997   $aUNICAMPANIA