Zbl.No: 574.10012
Autor: Erdös, Paul; Sárközy, A.; Pomerance, C.
Title: On locally repeated values of certain arithmetic functions. I. (In English)
Source: J. Number Theory 21, 319-332 (1985).
Review: It is shown that, for certain integer-valued arithmetic functions f, the equation n+f(n) = m+f(m) has infinitely many solutions with n\ne m. Let \nu(n) denote the number of distinct prime factors of n. Then, for f = \nu, a lower bound for the number of solutions n,m \leq x is given.
Reviewer: L.Lucht
Classif.: * 11A25 Arithmetic functions, etc. 11A25 Arithmetic functions, etc. 11N30 Turan theory
Keywords: arithmetic functions; number of distinct prime factors; lower bound; number of solutions
