On the sizes of the maximal prime powers divisors of factorials
Abstract
Let p be any prime, and p(p(n!)) the maximal power of p dividing n!. It is proved that there exists a positive integer n0, which depends only on p, such that q(q(n!)) < p(p(n!)) for all n n0 and all primes q > p. For twin primes p and q = p + 2 it is proved that the minimal n0 satisfying q(q(n!)) < p(p(n!)) for all n n0 is given by n0 = (p2+p)/2.
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