The Duffin-Schaeffer type conjectures in various local fields

Abstract

This paper discovers a new phenomenon about the Duffin-Schaeffer conjecture, which claims that λ(m=1∞n=m∞ En)=1 if and only if Σnλ( En)=∞, where λ denotes the Lebesgue measure on R/Z, \[ En= En()=m=1 (m,n)=1n(m-(n)n,m+(n)n), \] is any non-negative arithmetical function. Instead of studying m=1∞n=m∞ En we introduce an even fundamental object n=1∞ En and conjecture there exists a universal constant C>0 such that \[λ(n=1∞ En)≥ C\Σn=1∞λ( En),1\.\] It is shown that this conjecture is equivalent to the Duffin-Schaeffer conjecture. Similar phenomena are found in the fields of p-adic numbers and formal Laurent series. As a byproduct, we answer conditionally a question of Haynes by showing that one can always use the quasi-independence on average method to deduce λ(m=1∞n=m∞ En)=1 as long as the Duffin-Schaeffer conjecture is true. We also show among several others that two conjectures of Haynes, Pollington and Velani are equivalent to the Duffin-Schaeffer conjecture, and introduce for the first time a weighted version of the second Borel-Cantelli lemma to the study of the Duffin-Schaeffer conjecture.