Author:
AOUGAB TARIK,GASTER JONAH
Abstract
AbstractWe show that any set of distinct homotopy classes of simple closed curves on the torus that pairwise intersect at most k times has size
$k+O(\sqrt k \log k)$
. Prior to this work, a lemma of Agol, together with the state of the art bounds for the size of prime gaps, implied the error term
$O(k^{21/40})$
, and in fact the assumption of the Riemann hypothesis improved this error term to the one we obtain
$O(\sqrt k\log k)$
. By contrast, our methods are elementary, combinatorial, and geometric.
Publisher
Cambridge University Press (CUP)
Reference30 articles.
1. Empirical verification of the even Goldbach conjecture and computation of prime gaps up to 4⋅10¹⁸
2. Systems of curves on surfaces;Juvan;J. Combin. Theory Ser. B,1996
3. [18] Hatcher, A. . Topology of numbers. Unpublished manuscript, in preparation, (2002).
4. Bounds on exceptional Dehn filling
5. [30] Walfisz, A. . Weylsche exponentialsummen in der neueren zahlentheorie. VEB Deutscher Verlag der Wissenschaften (1963).