Zbl.No: 488.10045
Autor: Erdös, Paul; Nicolas, Jean-Louis
Title: Grandes valeurs d'une fonction liée au produit d'entiers consecutifs. (Large values of a function related to the product of consecutive integers.) (In French)
Source: Ann. Fac. Sci. Toulouse, V. Ser., Math. 3, 173-199 (1981).
Review: Define f(n) to be the largest integer k for which there is an m such that n|(m+1)...(m+k) but n\not|(m+j) for 1 \leq j \leq k. The authors prove that sumn \leq xf(n) ~ x log log x and that maxn \leq xf(n) = \frac{e\gamma/2 log x}{2(log log x) ½}+\frac{\gamma e\gamma log x}{4 log log x}(1+o(1)), where \gamma is Euler's constant. Define n to be f-highly aboundant if for every n' < n, f(n') < f(n). The authors make a detailed study of the prime factors of f-highly aboundant numbers. The results show similarity with the highly composite numbers of Ramanujan, but there are some differences. For example, there are large gaps in the factorization of f-highly aboundant numbers.
Reviewer: S.W..Graham
Classif.: * 11N37 Asymptotic results on arithmetic functions 11N05 Distribution of primes
Keywords: large values of functions; product of consecutive integers; prime factors of f-highly abundant numbers
