Publications of Paul Erdos

Zentralblatt MATH

Publications of (and about) Paul Erdös

Zbl.No: 154.29403
Autor: Erdös, Pál
Title: Remarks on number theory. I (In Hungarian)
Source: Mat. Lapok 12, 10-16, 161-168 (1961).
Review: I. Denote by n_k(p) the smallest positive k-th power non-residue (mod p). Mirsky asked the author to find an asymptotic formula for sum_{p \leq x} n_k (p). The author proves using the large sieve of Linnik if p₁ < p₂ < ··· is the sequence of consecutive primes that

sum_{p \leq x} n₂(p) = (1+o(1))sum_{k = 1}^oo {p_k \over 2^k} {x \over log x}.

It is very likely true that sum_{p < x} n_k(p) = (1+o(1)) {c_k x \over log x}.
II. Let \phi(n) = \phi₁ (n) be Euler's \phi function and put \phi_k(n) = \phi(\phi_k-1(n)). The author proves that if we neglect a sequence of density 0 then for k \geq 2

lim_{n ––> oo}{\phi_k(n) log log log n \over \phi_k-1(n)} = c^-c,

where C is Euler's constant. Several other problems and results are stated about the \phi function.
Classif.: * 11N69 Distribution of integers in special residue classes
11A25 Arithmetic functions, etc.
Index Words: number theory

Books Problems Set Theory Combinatorics Extremal Probl/Ramsey Th.

Graph Theory Add.Number Theory Mult.Number Theory Analysis Geometry

Probabability Personalia About Paul Erdös Publication Year Home Page

Books	Problems	Set Theory	Combinatorics	Extremal Probl/Ramsey Th.
Graph Theory	Add.Number Theory	Mult.Number Theory	Analysis	Geometry
Probabability	Personalia	About Paul Erdös	Publication Year	Home Page