tao < tate < taubes

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List of bibliographic references indexed by tate

Number of relevant bibliographic references: 31.
[0-20] [0 - 20][0 - 31][20-30][20-40]

Ident.	Authors (with country if any)	Title
000038 (2013)	M. Ram Murty [Canada] ; V. Kumar Murty [Canada]	The Sato–Tate Conjecture for the Ramanujan τ -Function
000122 (2012)	François Charles [France]	The Tate conjecture for K 3 surfaces over finite fields
000929 (2007)	Christian Wuthrich [Suisse]	The fine Tate–Shafarevich group
000B35 (2006)	Ken-Ichi Sugiyama [Japon]	On the Hodge conjecture and the Tate conjecture for the Hilbert schemes of an abelian surface
000C56 (2005)	Ulf Kühn [Allemagne]	Néron-Tate heights on algebraic curves and subgroups of the modular group
000D12 (2005)	Hendrik Kasten [Allemagne]	A Stickelberger index for the Tate–Shafarevich group
000D83 (2004)	Stephen S. Kudla	Tate’s Thesis
000E01 (2004)	A. C. Cojocaru [Canada] ; W. Duke [États-Unis]	Reductions of an elliptic curve and their Tate-Shafarevich groups
000E10 (2004)	Hoseog Yu [Corée du Sud]	On Tate-Shafarevich groups over galois extensions
000E30 (2004)	J. Van Hamel	Lichtenbaum-Tate duality for varieties over p-adic fields
000E55 (2004)	Frédéric Paugam [France]	Galois representations, Mumford-Tate groups and good reduction of abelian varieties
000E61 (2004)	Takeshi Tsuji	Explicit reciprocity law and formal moduli for Lubin-Tate formal groups
000F50 (2003)	D. Burns [Royaume-Uni] ; C. Greither [Allemagne]	On the Equivariant Tamagawa number conjecture for Tate motives
001410 (2000)	S. David ; M. Hindry	Minoration de la hauteur de Néron-Tate sur les variétés abÉliennes de type C. M
001549 (1999)	Michael Spie [États-Unis]	Proof of the Tate conjecture for products of elliptic curves over finite fields
001800 (1998)	Chad Schoen [États-Unis]	An integral analog of the Tate conjecture for one dimensional cycles on varieties over finite fields
001A60 (1996)	Yves André [France]	On the Shafarevich and Tate conjectures for hyperkähler varieties
001A64 (1996)	S. G. Tankeev	On the Mumford-Tate conjecture for abelian varieties
001B75 (1995)		Surfaces of type K3 over number fields and the Mumford-Tate conjecture. II
001F54 (1992)	Norbert Schappacher	Tate’s Conjecture on the Endomorphisms of Abelian Varieties
002019 (1992)	Henri Darmon [États-Unis]	A refined conjecture of Mazur-Tate type for Heegner points

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