公表論文

1. [10a]   S. Saito and K. Sato, A finite theorem for zero-cycles over p-adic fields,
   to appear in Annals of Mathematics (2010)
|PDF|
2. [10b]   S. Saito and K. Sato, A p-adic regulator map and finiteness results for arithmetic schemes,
   to appear in Documenta of Math. (2010)
|PDF|
3. [08a]   M. Asakura and S. Saito, Maximal components of Noether-Lefschetz locus for Beilinson-Hodge cycles,
   Math. Annalen 341 (2008), 169--199
|PDF|
4. [08b]   M. Asakura and S. Saito, Surfaces over a p-adic field with infinite torsion in the Chow group of 0-cycles,
   Algebra and Number Theory 1 (2008), 163--181
|PDF|
5. [07a]   J. Lewis and S. Saito, Algebraic cycles and Mumford-Griffiths invariants,
   Amer. J. Math. 129 (2007), 1449-
|PDF|
6. [07b]   M. Asakura and S. Saito, Beilinson's Hodge conjecture with coefficient for open complete intersections,
   in: Algebraic cycles and Motives Volume 2 (for J. Murre's 75--th Birthday)

London Math. Society Lecture Note Series 344 (2007), 3--37 |PDF|
7. [06a]   M. Asakura and S. Saito, Noether-Lefschetz locus for Beilinson-Hodge cycles I,
   Math. Zeit. 252 (2006), 251--237
8. [06b]   M. Asakura and S. Saito, Generalized Jacobian rings for open complete intersections,
   Math. Nachr. 279 (2006), 251--237
9. [04]   S. Saito, Beilinson's Hodge and Tate conjectures, in: Transcendental Aspects of Algebraic Cycles,
   London Math. Society Lecture Note Series 313 (2004), 276--289
10. [03a]   S. M"uller-Stach and S. Saito, On K_1 and K_2 of algebraic surfaces,
    K-Theory 30 (2003), 37--69
11. [03b]   U. Jannsen and S. Saito, Kato homology of arithmetic schemes and higher class field theory over local fields,
    Documenta Math. Extra Volume: Kazuya Kato's Fiftieth Birthday, (2003), 479--538
12. [02a]   S. Saito, Higher normal functions and Griffiths groups,
    J. of Algebraic Geometry 11 (2002), 161-201
13. [02b]   S. Saito, Infinitesimal logarithmic Torelli problem for degenerating hypersurfaces in P^n, in: Algebraic Geometry 2000, Azumino,
    Advanced Studies in Pure Math. 36 (2002), 401--434
14. [00a]   S. Saito, Motives, Algebraic Cycles and Hodge theory, in: The Arithmetic and Geometry of Algebraic Cycles,
    CRM Proceedings and Lecture Notes 24 (2000), 235--253, American Mathematical Society
15. [00b]   S. Saito, Motives and Filtrations on Chow groups, II, in: The Arithmetic and Geometry of Algebraic Cycles,
    NATO Science Series 548 (2000), 321--346, Kluwer Academic Publishers
16. [96a]   S. Saito, Motives and Filtrations on Chow groups,
    Invent. Math. 125 (1996), 149--196
17. [96b]   A. Langer and S. Saito, Torsion zero-cycles on the self-product of a modular elliptic curve,
    Duke Math. J. 85 (1996), 315--357
18. [96c]   J.-L. Colliot-Th'el`ene and S. Saito, Z'ero-cycles sur les vari'et'es p-adiques et groupe de Brauer,
    Internatinal Math. Research Notices 4 (1996), 151--160
19. [95]   S. Saito and R. Sujatha, A finiteness theorem for cohomology of surfaces over p-adic fields and an application to Witt groups,
    Proceedings of Symposia in Pure Math. 58 Part II (1994), 403--416, AMS
20. [94]   S. Saito, Cohomological Hasse principle for a threefold over a finite field, in: Algebraic K-theory and Algebraic Topology,
    NATO ASI Series, 407 (1994), 229--241, Kluwer Academic Publishers
21. [93]   S. Saito, A global duality theorem for varieties over global fields, in: Algebraic K-theory: Connections with Geometry and Topology,
    NATO ASI Series, 279 (1993), 425--444, Kluwer Academic Publishers
22. [91a]   S. Saito, Torsion zero-cycles and etale homology of singular schemes,
    Duke Math. J. 64 (1991), 71-83
23. [91b]   S. Saito, On the cycle map for torsion algebraic cycles of codimension two,
    Invent. Math. 106 (1991), 443--460
24. [89a]   S. Saito, Arithmetic theory on an arithmetic surface,
    Ann. of Math. 129 (1989), 547--589
25. [89b]   S. Saito, Some observations on motivic cohomologies of arithmetic schemes,
    Invent. Math. 98 (1989), 371--414
26. [87a]   K. Kato, S. Saito and T. Saito, General fixed point formula for an algebraic surface
    and the theory of Swan representations for two-dimensional local rings,
    Amer. J. Math. 109 (1987), 1009--1042
27. [87b]   K. Kato, S. Saito and T. Saito, Artin Characters for algebraic surfaces,
    Amer. J. Math. 109 (1987), 49--76
28. [87c]   K. Kato, S. Saito and T. Saito, Class field theory for two dimensional local rings, in: Galois Representations and Arithmetic Geometry,
    Advanced Studies in Pure Math. 12 (1987), 343-373
29. [86a]   S. Saito, Arithmetic on two dimensional local rings,
    Invent. Math. 85 (1986), 379--414
30. [86b]   K. Kato and S. Saito, Global class field theory of arithmetic schemes,
    Contemporary Math. 55 (1986), 255--331
31. [85a]   S. Saito, Unramified class field theory of arithmetical schemes,
    Ann. of Math. 121 (1985), 251--281
32. [85b]   S. Saito, Class field theory for curves over local fields,
    Journal Number Theory 21 (1985), 44--80
33. [85c]   K. Kato and S. Saito, Unramified class field theory of arithmetical surfaces,
    Ann. of Math. 118 (1985), 241--275
34. [84]   S. Saito, Functional equations of L-functions of varieties over finite fields,
    J. Fac. Sci. Univ. of Tokyo, Sec. IA 31 (1984), 287--296
35. [83]   K. Kato and S. Saito, Two dimensional class field theory, in: Galois groups and Their Representations,
    Advanced Studies in Pure Math. 2 (1983), 103--152

論説

• [1]   代数幾何と数論，数理科学１９９４年３月号， 別冊数理科学・数論の歩み(未解決問題への挑戦)
• [2]   モチーフ(グロタンディックの見果てぬ夢)，数理科学１９９５年８月号， 別冊数理科学・数論の歩み(未解決問題への挑戦)
• [3]   代数的サイクルとホッヂ理論，数学第４９巻２号１９９７年４月春季号
• [4]   ゼータ関数の特殊値とベイリンソン予想(フェルマー最終定理以後の数論)， 数学のたのしみ，２０００年２月
• [5]   新谷卓郎と総実代数体のL-関数の特殊値(新谷卓郎の数学)， 数学のたのしみ，２００５年冬