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Ten most cited papers from the scholar.google.com.
1.
(with H. Niederreiter), Low-Discrepancy
Sequences and Global Function Fields with Many Rational Places, Finite
Fields and Their Applications Volume 2, Issue 3(1996), 241-273.
2.
(with A. G. Garcia and H. Stichtenoth), On subfields
of the Hermitian function fields, Compositio Mathematica,
Vol. 120 (2): (2000), 137-170.
3. (with
H. Niederreiter), Quasirandom
points and global function fields,
Finite Fields and Applications (S. D. Cohen and H.
Niederreiter, eds.), London Math. Soc. Lecture Note Series 233, 269-296, Cambridge University Press, Cambridge,
1996.
4.
(with H. Niederreiter), Nets,(t,
s)-sequences, and algebraic geometry, in: Random and
Quasi-Random Point Sets, 1998, Springer.
5.
(with
H. Stichtenoth), The genus of
maximal function fields over finite fields, Manuscripta
Math.,Vol.86(1995), 217-224.
6.
(with
H. Niederreiter), A construction
of low-discrepancy sequences using global function fields, Acta Arith., Vol.73(1995), 87-102.
7.
(with H. Niederreiter) , The
algebraic-geometry approach to low-discrepancy sequences,
Monte Carlo and Quasi-Monte Carlo Methods'96 (H. Niederreiter et al.,
eds.), Lecture Notes in Statistics,
Vol. 127, 139-160, Springer, New York, 1997.
8.
(with H. Niederreiter), Towers of
global function fields with asymptotically many rational places and an
improvement on the Gilbert-Varshamov bound, Math. Nachr.,
195, 171-186 (1998).
9.
(with H. Niederreiter and K. Y. Lam), A
generalization of algebraic geometry codes, IEEE Trans. on
Inform. Theory, Vol. 45 (1999), 2498-2501.
10. (with
H. Niederreiter), Cyclotomic
function fields, Hilbert class fields, and global function fields with
many rational places, Acta Arith., 79(1997), 59-76.
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