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Locally projective spaces which satisfy the Bundle Theorem

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Abstract

We give a complete and short proof of KAHN's Theorem that every locally projective space (M,M) with dim M≥3 satisfying the Bundle Theorem is embeddable in a projective space. The central tool of KAHN's proof is the fact that (M,M) is locally projective, while we use mainly the Bundle Theorem.

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References

  1. BETTEN, L. M.: Locally Generalized Projective Lattices Satisfying a Bundle Theorem. Geom. Dedicata22 (1987), 363–369

    Google Scholar 

  2. FRANK, R.: Projective Embedding of Certain Linear Spaces. J. Combin. Theory Ser. A48 (1988), 266–269

    Google Scholar 

  3. HERZER, A.: Projektiv darstellbare stark planare Geometrien vom Rang 4. Geom. Dedicata5 (1976), 467–484

    Google Scholar 

  4. HERZER, A.: Semimodular Locally Projective Lattices of Rank 4 from v. Staudt's Point of View. Nato Adv. Study Inst. Series C. Boston-London (1981), 373–400

  5. KAHN, J.: Locally Projective-Planar Lattices which Satisfy the Bundle Theorem. Math. Z.175 (1980), 219–247

    Google Scholar 

  6. KANTOR, W. M.: Dimension and Embedding Theorems for Geometric Lattices. J. Combin. Theory Ser. A17 (1974), 173–195

    Google Scholar 

  7. KARZEL H., SÖRENSEN, K. und WINDELBERG, D.: Einführung in die Geometrie. Göttingen 1973

  8. KREUZER, A.: Zur Einbettung von Inzidenzräumen und angeordneten Räumen. J. of Geometry35 (1989), 132–151

    Google Scholar 

  9. KREUZER, A.: Zur Theorie der Bündelräume. Beiträge zur Geometrie und Algebra22. TUM-Bericht M 9311 München 1993, 190 S.

  10. KREUZER, A.: Projektive Einbettung nicht lokal projektiver Räume. Geo. Ded.53, (1994), 163–186

    Google Scholar 

  11. MÄURER, H.: Ein axiomatischer Aufbau der mindestens 3- dimensionalen Möbiusgeometrie. Math. Z.103 (1968), 282–305

    Google Scholar 

  12. PASCH, M. und DEHN, M.: Vorlesungen über neuere Geometrie. Berlin 1926

  13. SÖRENSEN, K.: Projektive Einbettung angeordneter Räume. In: Beiträge zur Geometrie und Algebra15 TUM-Bericht M 8612 München 1986, 8–35.

  14. WILLE, R.: Verbandstheoretische Charakterisierung n-stufiger Geometrien. Arch. Math.18 (1967), 465–468

    Google Scholar 

  15. WILLE, R.: On Incidence Geometries of Grade n. Atti Conv. Geom. Combin. Appl. Perugia (1971), 421–426

  16. WINTERNITZ, A.: Zur Begründung der projektiven Geometrie: Einführung idealer Elemente unabhängig von der Anordnung. Ann of. Math. (Second Series)41 (1940), 365–390

    Google Scholar 

  17. WYLER, O.: Incidence Geometry. Duke Math. J.20 (1953), 601–610

    Google Scholar 

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  1. Mathematisches Institut, Technische Universität, Arcisstr. 21, 80333, München

    Alexander Kreuzer

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  1. Alexander Kreuzer
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Dedicated to Professor Dr. H. Mäurer on the occasion of his sixtieth birthday

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Kreuzer, A. Locally projective spaces which satisfy the Bundle Theorem. J Geom 56, 87–98 (1996). https://doi.org/10.1007/BF01222685

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  • DOI: https://doi.org/10.1007/BF01222685

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