Height zeta functions of twisted products

Mathematical Research Letters

Volumn 4, Issue 2-3, 1997, Pages 273-282

  Strauch, Matthias ^a   Tschinkel, Yuri ^b  

^a UNIVERSITY OF BONN   (Germany)

^b UIC   (United States)

Author keywords

[No Author keywords available]

Indexed keywords

EID: 0031287208     PISSN: 10732780     EISSN: None     Source Type: Journal    
DOI: 10.4310/MRL.1997.v4.n2.a8     Document Type: Article

References (11)

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2. 2. V. Batyrev and Yu. Tschinkel, Rational points of bounded height on compactifications of anisotropic tori, Internat. Math. Res. Notices 12 (1995), 591-635.
3. 3. _, Manin's conjecture for toric varieties, J. Alg. Geom. (to appear).
4. 4. _, Height zeta functions of toric varieties, preprint, Ecole Norm. Sup., (1996).
5. 5. _, Rational points on some Fano cubic bundles, C. R. Acad. Sci. Paris Ser. I 323 (1996), 41-46.
6. 6. M. Brion, Variétes sphériques et théorie de Mori, Duke Math. J. 72 (1993), 369-404.
7. 7. J. Franke, Yu. I. Manin, and Yu. Tschinkel, Rational points of bounded height on Fano varieties, Invent. Math. 95 (1989), 321-235.
8. 8. F. Pauer, Normale Einbettungen von G/U, Math. Ann. 257 (1981), 371-396.
9. 9. E. Peyre, Hauteurs et nombres de Tamagawa sur les variétés de Fano, Duke Math. J. 79 (1995), 101-218.
10. 10. J. Silverman, The theory of height functions, in Arithmetic geometry, ed. G. Cornell, J. Silverman, Springer, New York, 1986.
11. 11. M. Strauch, Rational points of bounded height on twisted products of generalized flag varieties, in preparation.