I am not a mathematician, and corrections are welcome (including tags).
Background:
For the last few days, i have been interested in the problem of placing points along a line segment (of length $1$, for simplicity), such that no matter how many points are added, the points are still relatively evenly spaced.
This is somewhat vague, so let's look at one specific sequence based on the golden ratio, which seems to fit the description:
$p_n = \left\{n\phi\right\}$
By $\{\cdot\}$, I mean the fractional part function. Here is one example of how this sequence is interesting (middle column).
The question:
Given the sequence defined above of length $s$ and a freely chosen point $x$ between $0$ and $1$, how can I find the point $p_n$ closest to $x$, where $n \leq s$?