Tata institute < Tate < Tate category

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List of bibliographic references indexed by Tate

Number of relevant bibliographic references: 33.
[0-20] [0 - 20][0 - 33][20-32][20-40]

Ident.	Authors (with country if any)	Title
000328 (2011)	Peter O'Sullivan [Australie]	Algebraic cycles on an abelian variety
000B35 (2006)	Ken-Ichi Sugiyama [Japon]	On the Hodge conjecture and the Tate conjecture for the Hilbert schemes of an abelian surface
000D02 (2005)	David Harari ; Tamás Szamuely	Arithmetic Duality Theorems for 1-Motives
000E30 (2004)	J. Van Hamel	Lichtenbaum-Tate duality for varieties over p-adic fields
001048 (2002)		The arithmetic and geometry of a generic hypersurface section
001227 (2001)	S. Del Ba O	On the Chow motive of some moduli spaces
001396 (2000)		On the Brauer group
001727 (1998)		On Frobenius traces
001A60 (1996)	Yves André [France]	On the Shafarevich and Tate conjectures for hyperkähler varieties
001A68 (1996)	D. Burns [Royaume-Uni, États-Unis] ; M. Flach [Royaume-Uni, États-Unis]	Motivic L-functions and Galois module structures
001B19 (1996)	Yasuhiro Goto	Arithmetic of Weighted Diagonal Surfaces over Finite Fields
001C01 (1995)	Jan Neková [États-Unis]	On the p -adic height of Heegner cycles
001E53 (1993)	Ralph Greenberg [États-Unis] ; Glenn Stevens [États-Unis]	p -adic L -functions and p -adic periods of modular forms
001F57 (1992)	Chad Schoen [États-Unis]	Some examples of torsion in the Griffiths group
002019 (1992)	Henri Darmon [États-Unis]	A refined conjecture of Mazur-Tate type for Heegner points
002499 (1987)	V. Kumar Murty [Canada] ; Dinakar Ramakrishnan [États-Unis]	Period relations and the Tate conjecture for Hilbert modular surfaces
002775 (1984)		ON CYCLES ON ABELIAN VARIETIES OF PRIME DIMENSION OVER FINITE OR NUMBER FIELDS
002794 (1984)	B. Mazur [États-Unis] ; A. Wiles [États-Unis]	Class fields of abelian extensions of Q
002828 (1983)	N. O. Nygaard [États-Unis]	The Tate conjecture for ordinary K3 surfaces over finite fields
002C40 (1978)	Nicholas M. Katz [États-Unis]	p -Adic L -functions for CM fields
002C67 (1978)		ON PAIRINGS IN ELLIPTIC CURVES OVER GLOBAL FIELDS

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