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A V -COHOMOLOGY WITH RESPECT TO COMPLEX LIOUVILLE DISTRIBUTION

Yıl 2012, Cilt: 5 Sayı: 1, 151 - 162, 30.04.2012

Adelina Manea Cristian Ida

Öz


Anahtar Kelimeler

Complex Finsler manifold Liouville distribution v–cohomology

Kaynakça

  • [1] Abate, M., Patrizio, G., Finsler metrics-A global approach, Lectures Notes in Math., 1591, Springer-Verlag, 1994.
  • [2] Aikou, T., The Chern-Finsler connection and Finsler-K¨ahler manifolds, Adv. Stud. in Pure Math. 48, (2007), 343-373.
  • [3] Bejancu, A., Farran, H. R., On The Vertical Bundle of a pseudo-Finsler Manifold, Int. J. Math. and Math. Sci. 22 no. 3, (1997), 637-642.
  • [4] Bejancu, A., Farran, H. R., Finsler Geometry and Natural Foliations on the Tangent Bundle, Rep. on Mathematical Physics 58 no. 1 (2006), 131-146.
  • [5] Kobayashi, S., Negative Vector Bundles and Complex Finsler Sructures, Nagoya Math. J. 57 (1975), 153-166.
  • [6] Kobayashi, S., Differential Geometry of Complex Vector Bundles, Iwanami Princeton Univ. Press, 1987.
  • [7] Kobayashi, S., Complex Finsler Vector Bundles, Contemporary Math., 196 (1996), 145-152.
  • [8] Manea, A., Some new types of vertical 2–jets on the tangent bundle of a Finsler manifold, U.P.B. Sci. Bull., Series A, Vol. 72, Iss. 1 (2010), 179-196.
  • [9] Manea, A., A de Rham theorem for a Liouville foliation on T M 0 over a Finsler manifold M , Differential Geometry - Dynamical Systems, 13, (2011), 169-178.
  • [10] Miron, R., Anastasiei, M., The Geometry of Lagrange Spaces. Theory and Applications, Kluwer Acad. Publ. 59, 1994.
  • [11] Munteanu, G., Complex spaces in Finsler, Lagrange and Hamilton Geometries, Kluwer Acad. Publ., 141 FTPH, 2004.
  • [12] Piti¸s, G., Munteanu, G., V-cohomology of complex Finsler manifolds, Studia Univ., Babe¸s- Bolyai, XLIII (3) (1998), 75-81.
  • [13] Vaisman, I., Vari´et´es riemanniene feuillet´ees, Czechoslovak Math. J., 21 (1971), 46-75.
  • [14] Vaisman, I., Sur la cohomologie des variet´es analytiques complexes feuillet´ees, C. R. Acad. Sc. Paris, t. 273 (1971), 1067-1070.
  • [15] Vaisman, I., Cohomology and differential forms, New York, M. Dekker Publ. House, 1973.

Yıl 2012, Cilt: 5 Sayı: 1, 151 - 162, 30.04.2012

Adelina Manea Cristian Ida

Öz

Kaynakça

  • [1] Abate, M., Patrizio, G., Finsler metrics-A global approach, Lectures Notes in Math., 1591, Springer-Verlag, 1994.
  • [2] Aikou, T., The Chern-Finsler connection and Finsler-K¨ahler manifolds, Adv. Stud. in Pure Math. 48, (2007), 343-373.
  • [3] Bejancu, A., Farran, H. R., On The Vertical Bundle of a pseudo-Finsler Manifold, Int. J. Math. and Math. Sci. 22 no. 3, (1997), 637-642.
  • [4] Bejancu, A., Farran, H. R., Finsler Geometry and Natural Foliations on the Tangent Bundle, Rep. on Mathematical Physics 58 no. 1 (2006), 131-146.
  • [5] Kobayashi, S., Negative Vector Bundles and Complex Finsler Sructures, Nagoya Math. J. 57 (1975), 153-166.
  • [6] Kobayashi, S., Differential Geometry of Complex Vector Bundles, Iwanami Princeton Univ. Press, 1987.
  • [7] Kobayashi, S., Complex Finsler Vector Bundles, Contemporary Math., 196 (1996), 145-152.
  • [8] Manea, A., Some new types of vertical 2–jets on the tangent bundle of a Finsler manifold, U.P.B. Sci. Bull., Series A, Vol. 72, Iss. 1 (2010), 179-196.
  • [9] Manea, A., A de Rham theorem for a Liouville foliation on T M 0 over a Finsler manifold M , Differential Geometry - Dynamical Systems, 13, (2011), 169-178.
  • [10] Miron, R., Anastasiei, M., The Geometry of Lagrange Spaces. Theory and Applications, Kluwer Acad. Publ. 59, 1994.
  • [11] Munteanu, G., Complex spaces in Finsler, Lagrange and Hamilton Geometries, Kluwer Acad. Publ., 141 FTPH, 2004.
  • [12] Piti¸s, G., Munteanu, G., V-cohomology of complex Finsler manifolds, Studia Univ., Babe¸s- Bolyai, XLIII (3) (1998), 75-81.
  • [13] Vaisman, I., Vari´et´es riemanniene feuillet´ees, Czechoslovak Math. J., 21 (1971), 46-75.
  • [14] Vaisman, I., Sur la cohomologie des variet´es analytiques complexes feuillet´ees, C. R. Acad. Sc. Paris, t. 273 (1971), 1067-1070.
  • [15] Vaisman, I., Cohomology and differential forms, New York, M. Dekker Publ. House, 1973.
Toplam 15 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Bölüm Araştırma Makalesi
Yazarlar

Adelina Manea Bu kişi benim

Cristian Ida Bu kişi benim

Yayımlanma Tarihi 30 Nisan 2012
Yayımlandığı Sayı Yıl 2012 Cilt: 5 Sayı: 1

Kaynak Göster

APA Manea, A., & Ida, C. (2012). A V -COHOMOLOGY WITH RESPECT TO COMPLEX LIOUVILLE DISTRIBUTION. International Electronic Journal of Geometry, 5(1), 151-162.
AMA Manea A, Ida C. A V -COHOMOLOGY WITH RESPECT TO COMPLEX LIOUVILLE DISTRIBUTION. Int. Electron. J. Geom. Nisan 2012;5(1):151-162.
Chicago Manea, Adelina, ve Cristian Ida. “A V -COHOMOLOGY WITH RESPECT TO COMPLEX LIOUVILLE DISTRIBUTION”. International Electronic Journal of Geometry 5, sy. 1 (Nisan 2012): 151-62.
EndNote Manea A, Ida C (01 Nisan 2012) A V -COHOMOLOGY WITH RESPECT TO COMPLEX LIOUVILLE DISTRIBUTION. International Electronic Journal of Geometry 5 1 151–162.
IEEE A. Manea ve C. Ida, “A V -COHOMOLOGY WITH RESPECT TO COMPLEX LIOUVILLE DISTRIBUTION”, Int. Electron. J. Geom., c. 5, sy. 1, ss. 151–162, 2012.
ISNAD Manea, Adelina - Ida, Cristian. “A V -COHOMOLOGY WITH RESPECT TO COMPLEX LIOUVILLE DISTRIBUTION”. International Electronic Journal of Geometry 5/1 (Nisan 2012), 151-162.
JAMA Manea A, Ida C. A V -COHOMOLOGY WITH RESPECT TO COMPLEX LIOUVILLE DISTRIBUTION. Int. Electron. J. Geom. 2012;5:151–162.
MLA Manea, Adelina ve Cristian Ida. “A V -COHOMOLOGY WITH RESPECT TO COMPLEX LIOUVILLE DISTRIBUTION”. International Electronic Journal of Geometry, c. 5, sy. 1, 2012, ss. 151-62.
Vancouver Manea A, Ida C. A V -COHOMOLOGY WITH RESPECT TO COMPLEX LIOUVILLE DISTRIBUTION. Int. Electron. J. Geom. 2012;5(1):151-62.