[27] ( with
H. Moon )
The non-existence of certain mod 2 Galois
representations of some small quadratic fields,
( Proc. Japan Acad. 84 ( 2008 ), 63--67 )
[26] ( with
T. Hiranouchi )
Extensions of truncated discrete valuation rings,
( Pure and Applied Mathematics Quarterly 4:
Jean-Pierre Serre special issue ( 2008 ), 1205--1214, )
[25] ( with
H. Moon )
l-adic properties of certain modular forms,
( Proc. Japan Acad. 82 ( 2006 ), 83--86 )
[24] ( with
K. Ono )
2-adic properties of certain modular forms
and their applications to arithmetic functions,
( International Journal of Number Theory 1 ( 2005 ), 75--101 )
[23] ( with
Y. Choie )
A simple proof of the modular identity for theta series,
( Proc. A.M.S. 133 ( 2005 ), 1935--1939 )
[22]
A relation between some finiteness conjectures on Galois representations
--- a brief introduction to the Fontaine-Mazur Conjectures,
( Proceedings of the Number Theory Camp held at
Pohang Unversity of Science and Technology, January, 2004, pp.34--43 )
[21]
On the finiteness of various Galois representations,
( Proceedings of the JAMI Conference ``Primes and Knots", 2003,
T. Kohno and M. Morisita (eds.),
Contemp. Math. 416 ( 2006 ), pp.249--261, Amer. Math. Soc. )
[20] ( with
H. Moon )
Refinement of Tate's discriminant bound and non-existence theorems
for mod p Galois representations,
( Documenta Math. Extra Volume:
Kazuya Kato's Fiftieth Birthday ( 2003 ), 641--654 )
[19]
On potentially abelian geometric representations,
( The Ramanujan Journal 7 (2003), 477-483 )
[18] ( with
T. Satoh and
B. Skjernaa )
Fast computation of canonical lifts of elliptic curves and
its application to point counting,
( Finite Fields and Their Applications 9 ( 2003 ), 89-101 )
[17] ( with
T. Satoh )
Computing zeta functions for ordinary formal groups over finite fields,
( Discrete Applied Mathematics 130 ( 2003 ), 51--60 )
[16]
Induction formula for the Artin conductors of
mod $\ell$ Galois representations,
( Proc.A.M.S. 130 (2002), 2865--2869 )
[15]
Discriminants and finiteness theorems in number theory
( Proceedings of the first joint symposium
between Hokkaido Univeristy and Yeungnam University,
August 20--21, 1999, pp.155--158 )
[14] ( with
H. Moon )
Mod p Galois representations of solvable image
( Proc. A.M.S. 129(2001), 2529--2534 )
[13]
Finiteness of an isogeny class of Drinfeld modules
-- Correction to a previous paper
(J. Number Theory 74 (1999), 337--348)
[12] ( with
D. Wan )
Entireness of L-functions of $\varphi$-sheaves
on affine complete intersections
( J. Number Theory 63 (1997), 170--179 )
[11]
On $\varphi$-modules
(J. Number Theory 60 (1996), 124--141)
[10] ( with
D. Wan )
L-functions of $\varphi$-sheaves and Drinfeld modules
( J. AMS 9 (1996), 755--781 )
[9]
$\varphi$-modules and adjoint operators
Appendix (pp.182--187) to:
"The adjoint of the Carlitz module and Fermat's Last Theorem"
by D. Goss
( Finite Fields and their Applications 1 (1995), 165--188 )
[8]
The Tate conjecture for $t$-motives
( Proc. AMS 123 (1995), 3285--3287 )
[7]
Regular singularity of Drinfeld modules
( Intl. J. Math. 5 (1994), 595--608 )
[6]
On the $\pi$-adic theory --- Galois cohomology
( Proc. Japan Acad. 68A (1992), 214--218 )
[5]
A duality for finite $t$-modules
( J. Math. Sci. Univ. Tokyo 2 (1995), 563--588 )
[4]
Ramifications arising from Drinfeld modules
( in: The Arithmetic of Function Fields,
(D. Goss, D. Hayes, and M. Rosen, eds.),
Proceedings of a workshop at Ohio State University,
June 17--26, 1991,
de Gruyter, Berlin-New York (1992), pp.171-187 )
[3] ( with Y. Nakkajima )
A generalization of the Chowla-Selberg formula
( J. reine angew. Math. 419 (1991), 119--124 )
[2]
Semisimplicity of the Galois representations attached to
Drinfeld modules over fields of ``infinite characteristics''
( J. Number Theory 44 (1993), 292--314 )
[1]
Semisimplicity of the Galois representations attached to
Drinfeld modules over fields of ``finite characteristics''
( Duke Math. J. 62 (1991), 593--599 )