A survey of applications of the circle method to rational points
Browning TD. 2015.A survey of applications of the circle method to rational points. In: Arithmetic and Geometry. , 89–113.
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Abstract
Given a number field k and a projective algebraic variety X defined over k, the question of whether X contains a k-rational point is both very natural and very difficult. In the event that the set X(k) of k-rational points is not empty, one can also ask how the points of X(k) are distributed. Are they dense in X under the Zariski topology? Are they dense in the set.
Publishing Year
Date Published
2015-08-01
Book Title
Arithmetic and Geometry
Publisher
Cambridge University Press
Page
89 - 113
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Cite this
Browning TD. A survey of applications of the circle method to rational points. In: Arithmetic and Geometry. Cambridge University Press; 2015:89-113. doi:10.1017/CBO9781316106877.009
Browning, T. D. (2015). A survey of applications of the circle method to rational points. In Arithmetic and Geometry (pp. 89–113). Cambridge University Press. https://doi.org/10.1017/CBO9781316106877.009
Browning, Timothy D. “A Survey of Applications of the Circle Method to Rational Points.” In Arithmetic and Geometry, 89–113. Cambridge University Press, 2015. https://doi.org/10.1017/CBO9781316106877.009.
T. D. Browning, “A survey of applications of the circle method to rational points,” in Arithmetic and Geometry, Cambridge University Press, 2015, pp. 89–113.
Browning TD. 2015.A survey of applications of the circle method to rational points. In: Arithmetic and Geometry. , 89–113.
Browning, Timothy D. “A Survey of Applications of the Circle Method to Rational Points.” Arithmetic and Geometry, Cambridge University Press, 2015, pp. 89–113, doi:10.1017/CBO9781316106877.009.