Explicit bounds on exponential sums and the scarcity of squarefree binomial coefficients

“…Erdős made a number of conjectures quantifying these observations, one well-known conjecture being that the middle coefficient 2n n is not squarefree for any n > 4. Granville and Ramaré [190] proved this conjecture in 1996. The corresponding problem for q-binomial and, more generally, q-multinomial coefficients is much more complicated.…”

Artin's Primitive Root Conjecture – A Survey

“…Erdős made a number of conjectures quantifying these observations, one well-known conjecture being that the middle coefficient 2n n is not squarefree for any n > 4. Granville and Ramaré [190] proved this conjecture in 1996. The corresponding problem for q-binomial and, more generally, q-multinomial coefficients is much more complicated.…”

Artin's Primitive Root Conjecture – A Survey

“…Granville and Ramaré have verified this theorem for 2082 ≤ n ≤ 10 10 by using a direct consequence of Kummer's theorem, and for n ≥ 2 1617 by using bounds on exponential sums [2]. By using the following proposition of Granville and Ramaré, it becomes a practical computational problem to establish this theorem for 10 10 ≤ n ≤ 2 1617 .…”

Finding prime pairs with particular gaps

“…The best lower bound was recently established by Granville and Ramaré [5] who proved that there exists an absolute positive constant c such that g(k) > exp(c(log 3 k/ log log k)…”

Further tabulation of the Erdös-Selfridge function