Search Results

Choosing $N$ at random and checking should work. Put $e(t)=e^{2\pi i t/m}$. Then we have \begin{eqnarray*} \sum_{N=1}^m\sum_{k=1}^K\left|\sum_{i=1}^ne(k N a_i)\right|^2 & = & \sum_{N=1}^m\sum_{k=1}^K\ …

Checking whether an integer $n$ has a divisor in a given interval is essentially equivalent to factorization. Factoring is essentially equivalent to finding the smallest prime factor. So suppose that …

Let $p_k$ be the $k$-th prime number, and pick a sequence of primes $q_k$, such that $q_k\sim p_k^{3/2}$. Let $G$ be the arithmetic semigroup consisting of all integers not divisible by one of the $q_ …