Craig V. Spencer, Ph.D.
Affiliations: | 2008 | University of Michigan, Ann Arbor, Ann Arbor, MI |
Area:
MathematicsGoogle:
"Craig Spencer"Parents
Sign in to add mentorTrevor Wooley | grad student | 2008 | University of Michigan | |
(Analytic methods for Diophantine problems.) |
BETA: Related publications
See more...
Publications
You can help our author matching system! If you notice any publications incorrectly attributed to this author, please sign in and mark matches as correct or incorrect. |
Bilyk D, Ma X, Pipher J, et al. (2016) Diophantine approximations and directional discrepancy of rotated lattices Transactions of the American Mathematical Society. 368: 3871-3897 |
Cochrane T, Dissanayake RMS, Donohoue N, et al. (2016) Minimal Mahler Measure in Real Quadratic Fields Experimental Mathematics. 25: 107-115 |
Cochrane T, Spencer CV, Yang HS. (2014) Rational linear spaces on hypersurfaces over quasi-algebraically closed fields Rocky Mountain Journal of Mathematics. 44: 1805-1816 |
Lê TH, Spencer CV. (2014) Intersective polynomials and diophantine approximation International Mathematics Research Notices. 2014: 1153-1173 |
Lê TH, Spencer CV. (2014) Intersective polynomials and Diophantine approximation, II Monatshefte FüR Mathematik |
Spencer CV, Wooley TD. (2012) Diophantine inequalities and quasi-algebraically closed fields Israel Journal of Mathematics. 191: 721-738 |
Bilyk D, Ma X, Pipher J, et al. (2011) Directional discrepancy in two dimensions Bulletin of the London Mathematical Society. 43: 1151-1166 |
Lê TH, Spencer CV. (2011) Difference sets and the irreducibles in function fields Bulletin of the London Mathematical Society. 43: 347-358 |
Liu YR, Spencer CV, Zhao X. (2011) A generalization of Meshulam's theorem on subsets of finite abelian groups with no 3-term arithmetic progression (II) European Journal of Combinatorics. 32: 258-264 |
Liu YR, Spencer CV, Zhao X. (2010) Roth's theorem on systems of linear forms in function fields Acta Arithmetica. 142: 377-386 |