Turán type oscillation inequalities in $L^q$ norm on the boundary of convex polygonal domains

Polina Glazyrina, Szilárd Gy. Révész
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Abstract

In 1939 P\'al Tur\'an and J\'anos Er\H{o}d initiated the study of lower estimations of maximum norms of derivatives of polynomials, in terms of the maximum norms of the polynomials themselves, on convex domains of the complex plane. As a matter of normalization they considered the family $\mathcal{P}_n(K)$ of degree $n$ polynomials with all zeros lying in the given convex, compact subset $K\Subset {\mathbb C}$. While Tur\'an obtained the first results for the interval $I:=[-1,1]$ and the disk $D:=\{ z\in {\mathbb C}~:~ |z|\le 1\}$, Er\H{o}d extended investigations to other compact convex domains, too. The order of the optimal constant was found to be $\sqrt{n}$ for $I$ and $n$ for $D$. It took until 2006 to clarify that all compact convex \emph{domains} (with nonempty interior), follow the pattern of the disk, and admit an order $n$ inequality. For $L^q(\partial K)$ norms with any $1\le q <\infty$ we obtained order $n$ results for various classes of domains. Further, in the generality of all convex, compact domains we could show a $c n/\log n$ lower bound together with an $O(n)$ upper bound for the optimal constant. Also, we conjectured that all compact convex domains admit an order $n$ Tur\'an type inequality. Here we prove this for all \emph{polygonal} convex domains and any $0< q <\infty$.
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凸多边形域边界上的$L^q$规范中的图兰型振荡不等式
1939 年,P\'al Tur\'an 和 J\'anos Er\H{o}d 开始在复平面的凸域上研究用多项式本身的最大规范来降低多项式导数的最大规范。作为归一化的问题,他们考虑了所有零点都位于给定的凸紧凑子集 $K\Subset {\mathbb C}$ 的度 $n$ 多项式族 $\mathcal{P}_n(K)$。当 Tur\'an 在区间 $I:=[-1,1]$ 和圆盘 $D:=\{ z\in {\mathbb C}~:~|z|\le 1\}$ 得到第一个结果时,Er\H{o}d 也把研究扩展到了其他紧凑凸域。发现最优常数的阶数对于 $I$ 是 $\sqrt{n}$ ,对于 $D$ 是 $n$。直到 2006 年,我们才明确了所有紧凑凸域(内部非空)都遵循圆盘的模式,并包含阶数为 $n$ 的不等式。对于任意$1\le q <\infty$ 的$L^q(\partial K)$规范,我们得到了各类域的阶$n$结果。此外,在所有凸紧凑域的一般情况下,我们可以证明最优常数的$c n/\log n$下限和$O(n)$上限。此外,我们还猜想,所有紧凑凸域都包含一个阶 $n$ Tur\'an 型不等式。在此,我们针对所有 \emph{polygonal} 凸域和任意 $0< q <\infty$ 证明了这一点。
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