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008 040705s2003    riua     b    001 0 eng d
020   $a0821827782
035   $ab12954457-39ule_inst
040   $aDip.to Matematica$beng
041 1 $aeng$hgre
082 0 $a512.55$222
084   $aAMS 53C30
084   $aLC QA387.A78
100 1 $aArvanitoyeorgos, Andreas$0487064
240 10$aHomades Lie, homogeneis choroi kai diaphorike geometria.$lEnglish$912924
245 13$aAn introduction to Lie groups and the geometry of homogeneous spaces /$cAndreas Arvanitoyeorgos
260   $aProvidence, R.  I. :$bAmerican Mathematical Society,$cc2003
300   $axvi, 141 p. :$bill. ;$c22 cm
440  0$aStudent mathematical library,$x1520-9121 ;$v22
504   $aIncludes bibliographical references (p. 129-137) and index
505 0 $gCh. 1:$tLie Groups ;$gCh. 2:$tMaximal  Tori and the classification theorem ;$gCh. 3: The$tgeometry of a compact Lie group ;$gCh. 4:$tHomogeneous spaces ;$gCh. 5: The$tgeometry of a reductive homogeneous space ;$gCh. 6:$tSymmetric spaces ;$gCh. 7:$tGeneralized flag manifolds ;$gCh. 8:$tAdvanced topics
650  0$aLie groups
650  0$aHomogeneous spaces
907   $a.b12954457$b10-04-08$c05-07-04
912   $a991002640659707536
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996   $aHomades Lie, homogeneis choroi kai diaphorike geometria$912924
997   $aUNISALENTO
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