For given $n$, consider a polynomial $\sum_{k=0}^na_kz^k$ with all coefficients $a_k\in\{\pm1\}$. I am interested in the following:
How big can the modulus of a non-real root of such a polynomial be?
Wlog we can assume $a_n=1,a_{n-1}=-1$. Then a systematic search for small $n$, looking each time at the 10 or so extremal polynomials, exhibits a clear pattern for the highest coefficients: they come in groups of $3$ or $4$ consecutive +1's or -1's, starting with $z^n-z^{n-1}+++----+++---++++\cdots$. More precisely, the group sizes are displayed here (first line +1's, second line -1's)
1 3 3 4 3 3 3 4 3 3 3 4 3 3 4 4 3 3 4 4 3 3 4 4 3 3 4 . . .
1 4 3 3 4 4 3 3 4 4 3 3 4 3 3 3 4 3 3 3 4 3 3 3 4 3 . . .
Note that there are never two adjacent groups of size 4 or three of size 3, so the pattern is rather regular, as may be expected.
As $n$ grows, the extremal root $z_0$ (and $\bar z_0$) of the extremal polynomials does not at all jump around, but converges quite rapidly towards $0.93757749648487973269811306454355 \pm 1.2634174429011374851417570421775\; i$, e.g. we have
$n=20\implies z_0\approx 0.937537 \pm 1.26337\;i$
$n=40\implies z_0\approx 0.9375774916 \pm 1.263417437\;i$
$n=60\implies z_0\approx 0.9375774964839 \pm 1.26341744290078\;i$.
$n=80\implies z_0\approx 0.93757749648487963 \pm 1.263417442901137422\;i$.
$n=100\implies z_0\approx 0.937577496484879732688 \pm 1.263417442901137485132\;i$.
The obvious questions:
- Can the above 3-4-sequences be characterized? E.g. are they periodic? or self-similar?
- What can be said about the limit value of $z_0$? Is there a (closed form or whatever) formula for $z_0$?
Although the problem is not directly related to Garsia numbers (see the article mentioned here), it naturally leads again to the question of limit points of zeros of such polynomials, given that $z_0$ visibly yields one of those:
- Are there only countably many non-real limit points of zeros of $\pm1$-polynomials?
