We study several problems concerning convex polygons whose vertices lie in a Cartesian product of two sets of $n$ real numbers (for short, \emph{grid}). First, we prove that every such grid contains $\Omega(\log n)$ points in convex position and that this bound is tight up to a constant factor. We generalize this result to $d$ dimensions (for a fixed $d\in \mathbb{N}$), and obtain a tight lower bound of $\Omega(\log^{d-1}n)$ for the maximum number of points in convex position in a $d$-dimensional grid. Second, we present polynomial-time algorithms for computing the longest $x$- or $y$-monotone convex polygonal chain in a grid that contains no two points with the same $x$- or $y$-coordinate. We show that the maximum size of a convex polygon with such unique coordinates can be efficiently approximated up to a factor of $2$. Finally, we present exponential bounds on the maximum number of point sets in convex position in such grids, and for some restricted variants. These bounds are tight up to polynomial factors.
翻译:我们研究了一些关于 convex 多边形的问题,这些圆形的脊椎存在于两套美元实际数(短期,\emph{grid}})的碳酸盐产品中。首先,我们证明每一个这样的网格都含有在 convex 位置上的$\Omega(\log n) 美元( log n) 点, 并且这个网格紧凑到一个不变的系数。 我们将这一结果概括为美元维度( 固定的 $x- in\mathb{N} 美元), 并且对于在 $- d$- omathbb{N} 上方格中的最大点, 得到一小于$\ Omega( log ⁇ d- 1}n) 的紧紧紧的底线, 也就是在 $- 或 $y- monnonoone 的网格中的最大点, 我们提出多米时间算算算法, 在一个没有两点的网格中, 以 相同的 $- 或 $y$- coyo- councoun coconto coun coun coun coun coun counticle coun col 。我们提出在这种硬的极限的极限的矩定数组定在这种硬点上, 。
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