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Robert F. Coleman
Vectorial extensions of Jacobians
Annales de l'institut Fourier, 40 no. 4 (1990), p. 769-783, doi: 10.5802/aif.1234
Article PDF | Reviews MR 92e:14042 | Zbl 0739.14016
[C1] R. COLEMAN, The Universal Vectorial Bi-extension and p-adic Heights, to appear in Inventiones. Zbl 0763.14009
[C2] R. COLEMAN, Duality for the de Rham Cohomology of Abelian Schemes, to appear. Cedram | Zbl 0926.14008
[CG] R. COLEMAN, and B. GROSS, p-adic Heights on Curves, Advances in Math., 17 (1989), 73-81. MR 92d:11057 | Zbl 0758.14009
[C-C] C. CONTOU-CARRÈRE, La jacobienne généralisée d'une courbe relative, C.R. Acad. Sci., Paris, t. 289 (279), 203-206. MR 81g:14021 | Zbl 0447.14005
[G] A. GROTHENDIECK, Revêtement Étale et Groupe Fondamental (SGA I) SLN 224 (1971). Zbl 0234.14002
[MaMe] B. MAZUR and W. MESSING, Universal Extensions and One Dimensional Crystalline Cohomology, Springer Lecture Notes, 370, 1974. MR 51 #10350 | Zbl 0301.14016
[MaT] B. MAZUR and J. TATE, Canonical Height Pairings via Bi-extensions, Arithmetic and Geometry, Vol. I, Birkhauser, (1983), 195-237. MR 85j:14081 | Zbl 0574.14036
[O] H. ONSIPER, Rational Maps and Albanese Schemes, Thesis, University of California at Berkeley, (1984).
[S] J.-P. SERRE, Groupes Algébriques et Corps de Classes, Hermann, 1959. MR 21 #1973 | Zbl 0097.35604
Robert F. Coleman
Vectorial extensions of Jacobians
Annales de l'institut Fourier, 40 no. 4 (1990), p. 769-783, doi: 10.5802/aif.1234
Article PDF | Reviews MR 92e:14042 | Zbl 0739.14016
Résumé - Abstract
The universal vectorial extension of a curve is described in terms of the geometry of the curve.
Bibliography
© Annales de L'Institut Fourier - ISSN (électronique) : 1777-5310