On the packing of fourteen congruent spheres in a cube
From MaRDI portal
Publication:1027757
DOI10.1007/s10711-008-9308-3zbMath1228.52012OpenAlexW2073931801MaRDI QIDQ1027757
Publication date: 30 June 2009
Published in: Geometriae Dedicata (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10711-008-9308-3
Packing and covering in (n) dimensions (aspects of discrete geometry) (52C17) Lattice packing and covering (number-theoretic aspects) (11H31) Combinatorial aspects of packing and covering (05B40)
Related Items (3)
Optimal packings of 2,3, and 4 equal balls into a cubical flat 3-torus ⋮ A nonsmooth program for jamming hard spheres ⋮ On limits of dense packing of equal spheres in a cube
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Some progress in the packing of equal circles in a square
- Die dichteste Packung von 14 Kreisen in einem Quadrat. (On the densest packing of fourteen circles in a square)
- Die dichteste Packung von 36 Kreisen in einem Quadrat. (On the denest packing of 36 circles in a square)
- A better packing of ten equal circles in a square
- Kreispackung in Quadraten
- Packing up to 50 equal circles in a square
- Patterns and structures in disk packings
- Improving dense packings of equal disks in a square
- More optimal packings of equal circles in a square
- Dense packings of equal spheres in a cube
- New results in the packing of equal circles in a square
- Optimal packing of 28 equal circles in a unit square -- the first reliable solution
- Research Problems in Discrete Geometry
- On a Geometric Extremum Problem
- On the Densest Packing of Spheres in a Cube
- The Densest Packing of Five Spheres in a Cube
- The Densest Packing of Six Spheres in a Cube
- The Densest Packing of 9 Circles in a Square
- The Packing of Equal Circles in a Square
- On the Packing of Ten Equal Circles in a Square
- On the Densest Packing of Equal Spheres in a Cube
This page was built for publication: On the packing of fourteen congruent spheres in a cube
