1. |
C.-Y. Chang and J. Yu,
Determination of algebraic relations among special zeta values in
positive characteristic, |
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Advances in Mathematics 216 (2007), 321-345. |
2. |
C.-Y. Chang, A note on a refined version of
Anderson-Brownawell-Papanikolas criterion, |
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Journal of Number Theory 129 (2009), 729-738. |
3. |
C.-Y. Chang, M. Papanikolas, D.
Thakur and J. Yu, Algebraic independence of arithmetic gamma values and
Carlitz zeta values, |
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Advances in Mathematics 223 (2010),
1137-1154. |
4. |
C.-Y. Chang, M. Papanikolas and J. Yu,
Geometric gamma values and zeta values in positive characteristic, |
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International Mathematics Research Notices
2010 (2010), 1432-1455. |
5. |
C.-Y. Chang and M. Papanikolas, Algebraic
relations among periods and logarithms of rank 2 Drinfeld modules,
|
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American Journal of Mathematics
133 (2011), 359-391. |
6. |
C.-Y Chang, M. Papanikolas and J. Yu, Frobenius difference equations and algebraic independence of zeta values
in positive equal characteristic, |
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Algebra & Number Theory 5 (2011),
111-129. |
7. |
C.-Y. Chang, Transcendence of special values
of quasi-modular forms, |
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Forum Mathematicum 24 (2012), 539-551.
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8. |
C.-Y. Chang, Special values of Drinfeld
modular forms and algebraic independence, |
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Mathematische Annalen 352 (2012), 189-204. |
9. |
C.-Y. Chang and M. Papanikolas, Algebraic
independence of periods and logarithms of Drinfeld modules. With an
appendix by B. Conrad, |
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Journal of the American Mathematical Society
25 (2012), 123-150. |
10. |
C.-Y. Chang, On periods of the third kind for
rank 2 Drinfeld modules, |
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Mathematische Zeitschrift 274 (2013),
921-933. |
11. |
C.-Y. Chang, Linear independence of monomials of multizeta values in
positive characteristic, |
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Compositio Mathematica 150 (2014), 1789-1808. |
12. |
C.-Y. Chang, M. Papanikolas and J. Yu, An effective criterion for Eulerian
multizeta values in positive characteristic, |
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arXiv:1411.0124, to appear in Journal of the European Mathematical
Society. |
13. |
C.-Y. Chang, Linear relations among double zeta values in positive
characteristic, |
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Cambridge Journal of Mathematics 4 (2016), No. 3, 289-331. |
14. |
C.-Y. Chang and Y. Mishiba, On
multiple polylogarithms in characteristic p: v-adic vanishing versus
∞-adic Eulerianness, |
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arXiv:1511.03490, to appear in International Mathematics Research
Notices. |
15. |
C.-Y. Chang and Y. Mishiba, On finite Carlitz multiple
polylogarithms, |
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arXiv:1611.02822, to appear in Journal de
Théorie des Nombres de Bordeaux. |
16. |
C.-Y. Chang, A. El-Guindy and M. Papanikolas, Log-algebraic
identities on Drinfeld modules and special L-values, |
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arXiv:1703.03368, to appear in Journal of the London Mathematical
Society. |
17. |
C.-Y. Chang and Y. Mishiba, Logarithmic interpretation of multiple
zeta values in positive characteristic, |
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submitted,
arXiv:1710.10849. |
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