Littlewood conjecture


Littlewood conjecture

[′lid·əl‚wu̇d kən‚jek·chər] (mathematics) The statement that there exists a number C such that, whenever n1, n2, … , nN are N distinct integers, the integral over x from -π to π of the absolute value of the sum from k = 1 to k = N of the exponential functions of ink x is greater than 2π C log N.