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An alternative approach to lie groups and geometric structures / Ercument Ortacgil.

By: Material type: TextTextPublication details: Oxford : Oxford University Press, 2018Description: xii, 211 pISBN:
  • 9780198821656 (hbk)
Subject(s): DDC classification:
  • 512.55 Or82
Contents:
Fundemental concepts1: Parallelizable manifolds2: The nonlinear curvature3: Local Lie Groups (LLG.s)4: The centralizer5: s-invariance6: The linear curvature7: The structure objectSome Consequences8: The nonlinear Spencer sequence9: Deformations10: The de Rham cohomology of a LLG11: The linear Spencer sequence12: The secondary characteristic classes13: The homogeneous flow14: The Van Est Theorem15: The symmetry groupHow to Generalize16: Klein geometries17: The universal jet groupoids18: Embeddings of Klein geometries into universal jet groupoids19: The de.nition of a prehomogeneous geometry (PHG)20: Curvature and generalized PHG.s
List(s) this item appears in: New Arrival Fy 2021-22 | Mathematics_Fy2021-22
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Fundemental concepts1: Parallelizable manifolds2: The nonlinear curvature3: Local Lie Groups (LLG.s)4: The centralizer5: s-invariance6: The linear curvature7: The structure objectSome Consequences8: The nonlinear Spencer sequence9: Deformations10: The de Rham cohomology of a LLG11: The linear Spencer sequence12: The secondary characteristic classes13: The homogeneous flow14: The Van Est Theorem15: The symmetry groupHow to Generalize16: Klein geometries17: The universal jet groupoids18: Embeddings of Klein geometries into universal jet groupoids19: The de.nition of a prehomogeneous geometry (PHG)20: Curvature and generalized PHG.s

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