where \tau(n) is the divisor function and 1 = d₁ < d₂ < ... < d_{\tau (n)} = n denotes the sequence of divisors of n. The function H was introduced by Erdös and has been recently investigated by P. Erdös and G. Tenenbaum [J. Number Theory 31, 285-311 (1989; Zbl 676.10030)]. In the present paper, the authors establish the upper bound

where D(x) = max_{n \leq x} \tau(n) and c = 5/3- (log 3)/(log 2), and conjecture that H(n) << \tau(n)^1-\delta holds for some absolute constant \delta > 0. They also show that for sufficiently large x

where log_kx denotes the k times iterated logarithm, thereby improving a result of P. Erdös and R. R. Hall [J. Aust. Math. Soc., Ser. A 25, 479-485 (1978; Zbl 393.10047)]. The proof of the second result depends on an estimate of independent interest, namely the bound

for max (2,x^{(8 log₃x)/(log₂x)}) \leq y \leq x, where P(n) denotes the largest prime factor of n and u = log x/ log y. This last result represents a quantitative version of a result of the reviewer [Proc. Am. Math. Soc. 95, 517-523 (1985; Zbl 597.10056)].
Reviewer:  A.Hildebrand (Urbana)
Classif.:  * 11N25 Distribution of integers with specified multiplicative constraints
                   11N37 Asymptotic results on arithmetic functions
Keywords:  consecutive divisors; divisor function; largest prime factor
Citations:  Zbl 711.00008; Zbl 676.10030; Zbl 393.10047; Zbl 597.10056

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