Call two sets, $A$ and $B$ close iff there exists a finite $k$ such that there are infinitely many pairs of elements $(a,b)$ with $a\in A$ and $b\in B$ where $|a-b|\le k$. If two sets are not close, call them far. If such a $k$ exists, call the smallest such one the radius of closeness of those sets.
Call two numbers, $c$ and $d$ close iff the sets $\{c^n|n\in \mathbb{N}\}$ and $\{d^n|n\in \mathbb{N}\}$ are close and far otherwise and their radius of closeness the same as that of those sets. Call two numbers trivially close iff one is a rational power of the other or both of them have an absolute value less than or equal to 1. Call two numbers trivially far iff one of the absolute values is greater than one, and the other not. If two numbers are close but not trivially close, we shall call them non-trivially close.
I have several questions:
- Are $2$ and $3$ close or far? If they are close, what is their radius of closeness?
- Are $e$ and $\pi$ close or far? If they are close, what is their radius of closeness?
- Are there any pairs of integer/rational/real/complex numbers which are non-trivially close?
- Is there an algorithm to determine if two numbers are close? If so, what is it?
- Is there a smallest radius of closeness for integer/rational/real/complex numbers? If so, what is it, and what are some pairs of numbers that have that radius of closeness? If not, what is the limit of the radius of closeness, and what pairs of numbers approach that limit?