论文信息 - On the Number of Order Types in Integer Grids of Small Size

On the Number of Order Types in Integer Grids of Small Size

Let $\{p_1,\dots,p_n\}$ and $\{q_1,\dots,q_n\}$ be two sets of $n$ labeled points in general position in the plane. We say that these two point sets have the same order type if for every triple of indices $(i,j,k)$, $p_k$ is above the directed line from $p_i$ to $p_j$ if and only if $q_k$ is above the directed line from $q_i$ to $q_j$. In this paper we give the first non-trivial lower bounds on the number of different order types of $n$ points that can be realized in integer grids of polynomial

[1] Richard Pollack,et al. Multidimensional Sorting , 1983, SIAM J. Comput..

[2] Henry Ernest Dudeney. Amusements in Mathematics , 1917, Nature.

[3] J. Pintz,et al. The Difference Between Consecutive Primes, II , 2001 .

[4] R. Pollack,et al. The Intrinsic Spread of a Configuration in R d , 1990 .

[5] Bernd Sturmfels,et al. Coordinate representation of order types requires exponential storage , 1989, STOC '89.

[6] Franz Aurenhammer,et al. Enumerating Order Types for Small Point Sets with Applications , 2002, Order.

[7] K. F. Roth. On a Problem of Heilbronn , 1951 .

[8] H. Warren. Lower bounds for approximation by nonlinear manifolds , 1968 .

[9] Oswin Aichholzer,et al. Abstract Order Type Extension and New Results on the Rectilinear Crossing Number - Extended Abstract , 2005 .

[10] T. Zaslavsky. Facing Up to Arrangements: Face-Count Formulas for Partitions of Space by Hyperplanes , 1975 .

[11] János Pach,et al. Research problems in discrete geometry , 2005 .

[12] Richard Pollack,et al. Upper bounds for configurations and polytopes inRd , 1986, Discret. Comput. Geom..