Harold M. Stark
Affiliations: | University of California, San Diego, La Jolla, CA |
Area:
MathematicsGoogle:
"Harold Stark"Parents
Sign in to add mentorDerrick Henry Lehmer | grad student | 1964 | UC Berkeley | |
(An Extended Theory of Lucas Functions) |
Children
Sign in to add traineeMaruti Ram Pedaprolu Murty | grad student | 1980 | MIT |
Michael W. Mastropietro | grad student | 2000 | UCSD |
Stefan A. Erickson | grad student | 2005 | UCSD |
Amanda M. Beeson | grad student | 2009 | UCSD |
Kevin J. McGown | grad student | 2010 | UCSD |
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Publications
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Terras AA, Stark HM. (2007) Zeta functions of finite graphs and coverings, III Advances in Mathematics. 208: 467-489 |
Granville A, Stark HM. (2000) ABC implies no "Siegel zeros" for L-functions of characters with negative discriminant Inventiones Mathematicae. 139: 509-523 |
Stark HM, Terras AA. (2000) Zeta functions of finite graphs and coverings, part II Advances in Mathematics. 154: 132-195 |
Stark HM, Zagier D. (1980) A property of L-functions on the real line Journal of Number Theory. 12: 49-52 |
Stark HM. (1980) L-functions at s = 1. IV. First derivatives at s = 0 Advances in Mathematics. 35: 197-235 |
Stark HM. (1977) Hilbert's twelfth problem and L-series Bulletin of the American Mathematical Society. 83: 1072-1074 |
Stark HM. (1976) L-functions at s = 1. III. Totally real fields and Hilbert's twelfth problem Advances in Mathematics. 22: 64-84 |
Stark HM. (1975) L-functions at s = 1. II. Artin L-functions with rational characters Advances in Mathematics. 17: 60-92 |
Stark HM. (1974) Some effective cases of the Brauer-Siegel Theorem Inventiones Mathematicae. 23: 135-152 |
Stark HM. (1971) Values of L-Functions at s = 1 I. L-Functions for quadratic forms Advances in Mathematics. 7: 301-343 |