Landau's function for one million billions

Abstract

Let Sn denote the symmetric group with n letters, and g(n) the maximal order of an element of Sn. If the standard factorization of M into primes is M=q11q22... qkk, we define (M) to be q11+q22+... +qkk; one century ago, E. Landau proved that g(n)=(M) n M and that, when n goes to infinity, g(n) n(n). There exists a basic algorithm to compute g(n) for 1 n N; its running time is (N3/2/ N) and the needed memory is (N); it allows computing g(n) up to, say, one million. We describe an algorithm to calculate g(n) for n up to 1015. The main idea is to use the so-called -superchampion numbers. Similar numbers, the superior highly composite numbers, were introduced by S. Ramanujan to study large values of the divisor function τ(n)=Σd n 1.