The following pages link to Covering boxes by points (Q687139):
Displaying 25 items.
- Covering a set of points by two axis-parallel boxes (Q294806) (← links)
- Approximating hitting sets of axis-parallel rectangles intersecting a monotone curve (Q364848) (← links)
- Gallai-type results for multiple boxes and forests (Q583206) (← links)
- Piercing translates and homothets of a convex body (Q634671) (← links)
- Coloring the complements of intersection graphs of geometric figures (Q941403) (← links)
- Intersection of parallelepipeds in \(\mathbb R^d\) (Q948569) (← links)
- Construction of minimal bracketing covers for rectangles (Q1010822) (← links)
- Separating pairs of points of standard boxes (Q1075327) (← links)
- How many atoms can be defined by boxes ? (Q1079815) (← links)
- An extremal problem of orthants containing at most one point besides the origin (Q1336678) (← links)
- Minimal 2-fold coverings of \({\mathbf E}^ d\) (Q1360281) (← links)
- Fast stabbing of boxes in high dimensions (Q1583093) (← links)
- Piercing axis-parallel boxes (Q1753044) (← links)
- Containment problems in high-dimensional spaces (Q1906857) (← links)
- On point covers of multiple intervals and axis-parallel rectangles (Q1924491) (← links)
- On Wegner's inequality for axis-parallel rectangles (Q2005682) (← links)
- Piercing all translates of a set of axis-parallel rectangles (Q2115866) (← links)
- From a \((p, 2)\)-theorem to a tight \((p, q)\)-theorem (Q2189732) (← links)
- Covering the 3-dimensional unit cube by six rectangular boxes (Q2256991) (← links)
- Independent and hitting sets of rectangles intersecting a diagonal line: algorithms and complexity (Q2340410) (← links)
- Transversal numbers of translates of a convex body (Q2509292) (← links)
- From a $(p,2)$-Theorem to a Tight $(p,q)$-Theorem (Q5115819) (← links)
- On point covers of \(c-\)oriented polygons (Q5941498) (← links)
- Lower bounds for piercing and coloring boxes (Q6187716) (← links)
- Stabbing boxes with finitely many axis-parallel lines and flats (Q6646396) (← links)
