{"paper":{"title":"Minimizing GCD sums and applications to non-vanishing of theta functions and to Burgess' inequality","license":"http://arxiv.org/licenses/nonexclusive-distrib/1.0/","headline":"","cross_cats":[],"primary_cat":"math.NT","authors_text":"Marc Munsch, R\\'egis de la Bret\\`eche","submitted_at":"2018-12-10T13:40:14Z","abstract_excerpt":"In recent years the question of maximizing GCD sums regained interest due to its firm link with large values of $L$-functions. In the present paper we initiate the study of minimizing for positive weights~$w$ of normalized $L^1$- norm the sum $\\sum_{m_1 , m_2 \\leqslant N} w({m_1})w({m_2})\\frac{(m_1,m_2)}{\\sqrt{m_1m_2}} $. We consider as well the intertwined question of minimizing a weighted version of the usual multiplicative energy. We give three applications of our results. Firstly we obtain a logarithmic refinement of Burgess' bound on character sums $\\displaystyle{\\sum_{M