Article ID Journal Published Year Pages File Type
4595495 Journal of Number Theory 2007 11 Pages PDF
Abstract

Let p, q be primes and m be a positive integer. For a positive integer n, let ep(n) be the nonnegative integer with pep(n)|n and pep(n)+1∤n. The following results are proved: (1) For any positive integer m, any prime p and any ε∈Zm, there are infinitely many positive integers n such that ; (2) For any positive integer m, there exists a constant D(m) such that if ε,δ∈Zm and p, q are two distinct primes with max{p,q}⩾D(m), then there exist infinitely many positive integers n such that , . Finally we pose four open problems.

Related Topics
Physical Sciences and Engineering Mathematics Algebra and Number Theory