Add to ORKGAlon and F\"uredi (European J. Combin. 1993) gave a tight bound for the following hyperplane covering problem: find the minimum number of hyperplanes required to cover all points of the n-dimensional hypercube {0,1}^n except the origin. Their proof is among the early instances of the polynomial method, which considers a natural polynomial (a product of linear factors) associated to the hyperplane arrangement, and gives a lower bound on its degree, whilst being oblivious to the (product) structure of the polynomial. Thus, their proof gives a lower bound for a weaker polynomial covering problem, and it turns out that this bound is tight for the stronger hyperplane covering problem. In a similar vein, solutions to some other hyperplane cover...
The Point Hyperplane Cover problem in $R d$ takes as input a set of $n$ points in $R d$ and a positi...
AbstractIt is a difficult theoretical and computational problem to describe explicitly the list of h...
AbstractA subset of the vertices in a hypergraph is a cover if it intersects every edge. Let τ(H) de...
Alon and F\"uredi (European J. Combin. 1993) gave a tight bound for the following hyperplane coverin...
Alon and Füredi (1993) showed that the number of hyperplanes required to cover {0,1}n∖{0} without co...
Alon and Füredi (1993) showed that the number of hyperplanes required to cover {0,1}n∖{0} without co...
Alon and Füredi (1993) showed that the number of hyperplanes required to cover without covering 0 i...
Note that the vertices of the $n$-dimensional cube $\{0, 1\}^n$ can be covered by two affine hyperpl...
This thesis explores several problems in discrete geometry, focusing on covering problems. We first ...
AbstractIn this paper, we show that a set of q+a hyperplanes, q>13, a≤(q−10)/4, that does not cover ...
AbstractOne can easily cover the vertices of the n-cube by 2 hyperplanes. Here it is proved that any...
AbstractOne can easily cover the vertices of the n-cube by 2 hyperplanes. Here it is proved that any...
AbstractIn this paper, we show that a set of q+a hyperplanes, q>13, a≤(q−10)/4, that does not cover ...
In this article we consider $S$ to be a set of points in $d$-space with the property that any $d$ po...
AbstractLet Qn be the n-dimensional hypercube: the graph with vertex set {0,1}n and edges between ve...
The Point Hyperplane Cover problem in $R d$ takes as input a set of $n$ points in $R d$ and a positi...
AbstractIt is a difficult theoretical and computational problem to describe explicitly the list of h...
AbstractA subset of the vertices in a hypergraph is a cover if it intersects every edge. Let τ(H) de...
Alon and F\"uredi (European J. Combin. 1993) gave a tight bound for the following hyperplane coverin...
Alon and Füredi (1993) showed that the number of hyperplanes required to cover {0,1}n∖{0} without co...
Alon and Füredi (1993) showed that the number of hyperplanes required to cover {0,1}n∖{0} without co...
Alon and Füredi (1993) showed that the number of hyperplanes required to cover without covering 0 i...
Note that the vertices of the $n$-dimensional cube $\{0, 1\}^n$ can be covered by two affine hyperpl...
This thesis explores several problems in discrete geometry, focusing on covering problems. We first ...
AbstractIn this paper, we show that a set of q+a hyperplanes, q>13, a≤(q−10)/4, that does not cover ...
AbstractOne can easily cover the vertices of the n-cube by 2 hyperplanes. Here it is proved that any...
AbstractOne can easily cover the vertices of the n-cube by 2 hyperplanes. Here it is proved that any...
AbstractIn this paper, we show that a set of q+a hyperplanes, q>13, a≤(q−10)/4, that does not cover ...
In this article we consider $S$ to be a set of points in $d$-space with the property that any $d$ po...
AbstractLet Qn be the n-dimensional hypercube: the graph with vertex set {0,1}n and edges between ve...
The Point Hyperplane Cover problem in $R d$ takes as input a set of $n$ points in $R d$ and a positi...
AbstractIt is a difficult theoretical and computational problem to describe explicitly the list of h...
AbstractA subset of the vertices in a hypergraph is a cover if it intersects every edge. Let τ(H) de...