000 | a | ||
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999 |
_c30792 _d30792 |
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008 | 220621b xxu||||| |||| 00| 0 eng d | ||
020 | _a9780198821656 | ||
082 |
_a512.482 _bORT |
||
100 | _aOrtacgil, Ercument H. | ||
245 | _aAlternative approach to lie groups and geometric structures | ||
260 |
_bOxford University Press, _c2018 _aOxford : |
||
300 |
_axii, 211 p, ; _bill., _c24 cm |
||
365 |
_b73.00 _cGBP _d100.50 |
||
504 | _aIncludes bibliographical references and index. | ||
520 | _aThe theory of Lie groups is one of the most important mathematical themes of the last century and belongs to the centre of modern differential geometry. Whilst the subject is well established, this book aims to be the first to approach geometric theory of Lie groups from a new perspective. | ||
650 | _aLink groups | ||
650 | _aIntermediate | ||
650 | _aGeometry | ||
650 | _aMathematics | ||
650 | _aArrow,Bianchi identity | ||
650 | _aExponential map | ||
650 | _aHaar measure | ||
650 | _aLie group | ||
650 | _aPseudogroup | ||
650 | _a Ricci flow | ||
650 | _aVector bundle | ||
650 | _aCurvature | ||
650 | _a Globalizable | ||
650 | _aLie group | ||
650 | _aPseudogroup | ||
650 | _aRicci flow | ||
650 | _aSplitting | ||
650 | _aTensor | ||
942 |
_2ddc _cBK |