Martin Widmer
Published 2013-09-08, updated 2015-08-17Version 2
By Northcott's Theorem there are only finitely many algebraic points in affine $n$-space of fixed degree over a given number field and of height at most $X$. For large $X$ the asymptotics of these cardinalities have been investigated by Schanuel, Schmidt, Gao, Masser and Vaaler, and the author. In this paper we study the case where the coordinates of the points are restricted to algebraic integers, and we derive the analogues of Schanuel's, Schmidt's, Gao's and the author's results.
Comments: to appear in Int. Math. Res. Notices
Counting points of fixed degree and bounded height
Algebraic $S$-integers of fixed degree and bounded height
On the distribution of points of bounded height on equivariant compactifications of vector groups
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