# zbMATH — the first resource for mathematics

## Hung, David C.

Compute Distance To:
 Author ID: hung.david-c Published as: Hung, D. C.; Hung, David C.
 Documents Indexed: 7 Publications since 1983

#### Co-Authors

 2 single-authored 5 Hsia, John Sollion 2 Earnest, Andrew G. 1 Benham, J. W.
all top 5

#### Serials

 2 Journal of the London Mathematical Society. Second Series 1 Mathematics of Computation 1 Acta Arithmetica 1 Inventiones Mathematicae 1 Journal of Number Theory 1 Mathematische Annalen

#### Fields

 7 Number theory (11-XX)

#### Citations contained in zbMATH

7 Publications have been cited 28 times in 23 Documents Cited by Year
Primitive representations by spinor genera of ternary quadratic forms. Zbl 0805.11032
Earnest, A. G.; Hsia, J. S.; Hung, D. C.
1994
Spinor regular positive ternary quadratic forms. Zbl 0686.10014
Benham, J. W.; Earnest, A. G.; Hsia, J. S.; Hung, D. C.
1990
Theta series of quaternary quadratic forms over $${\mathbb{Z}}$$ and $${\mathbb{Z}}[(1+\sqrt{p})/2]$$. Zbl 0556.10011
Hsia, J. S.; Hung, D. C.
1985
Theta series of ternary and quaternary quadratic forms. Zbl 0513.10021
Hsia, J. S.; Hung, D. C.
1983
Even unimodular 8-dimensional quadratic forms over $${\mathbb{Q}}(\sqrt{2})$$. Zbl 0643.10013
Hsia, J. S.; Hung, D. C.
1989
Even positive definite unimodular quadratic forms over $${\mathbb{Q}}(\sqrt{3})$$. Zbl 0731.11024
Hung, David C.
1991
Theta series of ternary quadratic forms. Zbl 0605.10013
Hung, D. C.
1987
Primitive representations by spinor genera of ternary quadratic forms. Zbl 0805.11032
Earnest, A. G.; Hsia, J. S.; Hung, D. C.
1994
Even positive definite unimodular quadratic forms over $${\mathbb{Q}}(\sqrt{3})$$. Zbl 0731.11024
Hung, David C.
1991
Spinor regular positive ternary quadratic forms. Zbl 0686.10014
Benham, J. W.; Earnest, A. G.; Hsia, J. S.; Hung, D. C.
1990
Even unimodular 8-dimensional quadratic forms over $${\mathbb{Q}}(\sqrt{2})$$. Zbl 0643.10013
Hsia, J. S.; Hung, D. C.
1989
Theta series of ternary quadratic forms. Zbl 0605.10013
Hung, D. C.
1987
Theta series of quaternary quadratic forms over $${\mathbb{Z}}$$ and $${\mathbb{Z}}[(1+\sqrt{p})/2]$$. Zbl 0556.10011
Hsia, J. S.; Hung, D. C.
1985
Theta series of ternary and quaternary quadratic forms. Zbl 0513.10021
Hsia, J. S.; Hung, D. C.
1983
all top 5

#### Cited by 19 Authors

 5 Oh, Byeong-Kweon 4 Haensch, Anna 4 Kane, Ben 3 Chan, Wai Kiu 2 Schulze-Pillot, Rainer 2 Sun, Zhi-Wei 2 Wu, Hai-Liang 1 Berkovich, Alexander 1 Costello, Patrick J. 1 Hsia, John Sollion 1 Hung, David C. 1 Ju, Jangwon 1 Kim, Kyoungmin 1 Kim, Myung-Hwan 1 Kramer, Jürg 1 Oishi-Tomiyasu, Ryoko 1 Scharlau, Rudolf 1 Sun, Zhi-Wei 1 Takada, Ichiro
all top 5

#### Cited in 11 Serials

 8 Journal of Number Theory 3 International Journal of Number Theory 2 Mathematische Annalen 2 Transactions of the American Mathematical Society 1 Acta Arithmetica 1 Advances in Mathematics 1 Duke Mathematical Journal 1 Mathematische Zeitschrift 1 Proceedings of the American Mathematical Society 1 Journal de Théorie des Nombres de Bordeaux 1 Research in Number Theory

#### Cited in 3 Fields

 23 Number theory (11-XX) 2 Combinatorics (05-XX) 1 Nonassociative rings and algebras (17-XX)