tata < tate < tau

Facettes : Author.f AffPays.f AffOrg.f AffRegion.f AffVille.f

List of bibliographic references

Number of relevant bibliographic references: 60.
[0-20] [0 - 20][0 - 50][20-40]

Ident.	Authors (with country if any)	Title
000002 (1979)	Jean-Pierre Serre [France]	Theorems of Tate and Nakayama
000045 (2010)	Michael Harris [France]	Arithmetic applications of the Langlands program
000213 (2000)	Peter Symonds [Royaume-Uni] ; Thomas Weigel [Royaume-Uni]	Cohomology of p -adic Analytic Groups
000250 (1992)	G. Wüstholz	The Finiteness Theorems of Faltings
000430 (1983)	John Coates [France]	Infinite Descent on Elliptic Curves with Complex Multiplication
000441 (1987)	Christoph Klingenberg [Allemagne]	Survey of the Proof of the Tate Conjectures for Hilbert-Blumenthal Surfaces
000540 (2004)	A. C. Cojocaru [Canada] ; W. Duke [États-Unis]	Reductions of an elliptic curve and their Tate-Shafarevich groups
000741 (2005)	Ulf Kühn [Allemagne]	Néron-Tate heights on algebraic curves and subgroups of the modular group
000773 (2004)	Hoseog Yu [Corée du Sud]	On Tate-Shafarevich groups over galois extensions
000B17 (2011)	Tim Dokchitser [Royaume-Uni] ; Vladimir Dokchitser [Royaume-Uni]	Root numbers and parity of ranks of elliptic curves
000D24 (2003)	D. Burns [Royaume-Uni] ; C. Greither [Allemagne]	On the Equivariant Tamagawa number conjecture for Tate motives
000D31 (2001)	K. Hulek ; J. Spandaw ; B. Van Geemen ; D. Van Straten	The modularity of the Barth--Nieto quintic and its relatives
000F36 (2013)	Mingdeh Huang [États-Unis]	The discrete logarithm problem from a local duality perspective
001131 (2013)	Tim Dokchitser [Royaume-Uni]	Notes on the Parity Conjecture
001137 (1968)	J. S. Milne [Royaume-Uni]	The Tate-Šafarevič group of a constant abelian variety
001197 (2001)	G. Frey [États-Unis] ; E. Kani [États-Unis]	Projective p-adic representations of the K-rational geometric fundamental group
001296 (2013)	M. Ram Murty [Canada] ; V. Kumar Murty [Canada]	The Sato–Tate Conjecture for the Ramanujan τ -Function
001363 (2010)	David Burns [Royaume-Uni]	Congruences between derivatives of geometric L -functions
001423 (1992)	Norbert Schappacher	Tate’s Conjecture on the Endomorphisms of Abelian Varieties
001451 (1973)	M. Artin [États-Unis] ; H. P. F. Swinnerton-Dyer [Royaume-Uni]	The Shafarevich-Tate conjecture for pencils of elliptic curves on K 3 surfaces
001470 (2000)	S. David ; M. Hindry	Minoration de la hauteur de Néron-Tate sur les variétés abÉliennes de type C. M

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