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JOURNALS // Izvestiya Rossiiskoi Akademii Nauk. Seriya Matematicheskaya

Izv. Akad. Nauk SSSR Ser. Mat., 1964, Volume 28, Issue 6, Pages 1363–1390 (Mi im3058)

The Tate height of points on an Abelian variety, its variants and applications
Yu. I. Manin

This publication is cited in the following articles:
  1. Peter H. van der Kamp, “A New Class of Integrable Maps of the Plane: Manin Transformations with Involution Curves”, SIGMA, 17 (2021), 067, 14 pp.  mathnet  crossref
  2. Cogolludo-Agustin J.-I. Libgober A., “Mordell–Weil groups of elliptic threefolds and the Alexander module of plane curves”, J. Reine Angew. Math., 697 (2014), 15–55  crossref  isi
  3. V. G. Drinfeld, V. A. Iskovskikh, A. I. Kostrikin, A. N. Tyurin, I. R. Shafarevich, “Yurii Ivanovich Manin (on his 60th birthday)”, Russian Math. Surveys, 52:4 (1997), 863–873  mathnet  crossref  crossref  mathscinet  zmath  adsnasa  isi
  4. J. S. Cassels, “Explicit results on the arithmetic of curves of higher genus”, Russian Math. Surveys, 40:4 (1985), 43–48  mathnet  crossref  mathscinet  zmath  adsnasa  isi
  5. A. A. Berzin'sh, “On a $p$-adic analogue of Tate height”, Math. USSR-Izv., 21:2 (1983), 201–210  mathnet  crossref  mathscinet  zmath
  6. V. A. Dem'yanenko, “On Mordell's conjecture”, Math. USSR-Izv., 8:6 (1974), 1181–1189  mathnet  crossref  mathscinet  zmath
  7. Yu. I. Manin, “The refined structure of the Néron–Tate height”, Math. USSR-Sb., 12:3 (1970), 325–342  mathnet  crossref  mathscinet  zmath
  8. Yu. I. Manin, “The $p$-torsion of elliptic curves is uniformly bounded”, Math. USSR-Izv., 3:3 (1969), 433–438  mathnet  crossref  mathscinet  zmath
  9. V. A. Dem'yanenko, “Points of finite order on elliptic curves”, Math. USSR-Izv., 1:6 (1967), 1271–1284  mathnet  crossref  mathscinet  zmath


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