Sign changes of Kloosterman sums with almost prime moduli
Abstract
We prove that the Kloosterman sum S(1,1;c) can change sign infinitely often as c runs over squarefree moduli with at most 10 prime factors, which improves the previous results of E. Fouvry and Ph. Michel, J. Sivak-Fischler and K. Matom\"aki, replacing 10 by 23, 18 and 15, respectively. The method combines the Selberg sieve, equidistribution of Kloosterman sums and spectral theory of automorphic forms.
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