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Let $k_1,\dotsc,k_r$ be the even integers with even $2$-adic valuation in the range you want. For any polynomial $p$ meeting your condition, $p(x)-2^{n-1}$ has a root between $k_i-2$ and $k_i$, and a …

I'm probably making a stupid mistake, but is Conjecture 1 possibly rather easy? At $\ell=0$ we're assuming $$ p(x) = \frac{a_n}{n!} \left( \frac{n}{\frac{d}{dx} \log p(x)} \right)^n $$ Write $\frac{d} …

Here is an additional comment. Every homogeneous polynomial can be regarded as a symmetric tensor. Quadrics correspond to symmetric matrices; cubics correspond to order $3$ tensors; in general, a homo …