We study the persistence of a geometrically frustrated local order inside partially crystallized packings of equal-sized spheres. Measurements by x-ray tomography reveal previously unseen grain scale rearrangements occurring inside large three-dimensional packings as they crystallize. Three successive structural transitions are detected by a statistical description of the local volume fluctuations. These compaction regimes are related to the disappearance of densely packed tetrahedral patterns of beads. Amorphous packings of monodisperse spheres are saturated with these tetrahedral clusters at Bernal's limiting density (ϕ≈64%). But, no periodic lattice can be built upon these patterns; they are geometrically frustrated and are thus condemne...
Robust and sensitive tools to characterise local structure are essential for investigations of granu...
We investigate equal spheres packings generated from several experiments and from a large number of ...
The smallest maximum-kissing-number Voronoi polyhedron of three-dimensional (3D) Euclidean spheres i...
Uncovering grain-scale mechanisms that underlie the disorder–order transition in assemblies of dissi...
I study the structural organization and correlations in very large packings of equally sized spheres...
Here we present an experimental and numerical investigation on the grain-scale geometrical and mecha...
The mechanism of crystallisation in highly dissipative materials such as foams or granular materials...
We study grain-scale mechanical and geometrical features of partially crystallized packings of frict...
Bead packs of up to 150,000 mono-sized spheres with packing densities ranging from 0.58 to 0.64 have...
The local structure of disordered jammed packings of monodisperse spheres without friction, generate...
Investigating how tightly objects pack space is a long-standing problem, with relevance for many dis...
In this study we present numerical analysis performed on the experimental results of sphere packings...
The structural features of packings of similar hard spheres in the vicinity of Bernal density corres...
By pouring equal balls into a container one obtains disordered packings with fascinating properties ...
We present the results of an experimental investigation on the crystallography of the dimpled patter...
Robust and sensitive tools to characterise local structure are essential for investigations of granu...
We investigate equal spheres packings generated from several experiments and from a large number of ...
The smallest maximum-kissing-number Voronoi polyhedron of three-dimensional (3D) Euclidean spheres i...
Uncovering grain-scale mechanisms that underlie the disorder–order transition in assemblies of dissi...
I study the structural organization and correlations in very large packings of equally sized spheres...
Here we present an experimental and numerical investigation on the grain-scale geometrical and mecha...
The mechanism of crystallisation in highly dissipative materials such as foams or granular materials...
We study grain-scale mechanical and geometrical features of partially crystallized packings of frict...
Bead packs of up to 150,000 mono-sized spheres with packing densities ranging from 0.58 to 0.64 have...
The local structure of disordered jammed packings of monodisperse spheres without friction, generate...
Investigating how tightly objects pack space is a long-standing problem, with relevance for many dis...
In this study we present numerical analysis performed on the experimental results of sphere packings...
The structural features of packings of similar hard spheres in the vicinity of Bernal density corres...
By pouring equal balls into a container one obtains disordered packings with fascinating properties ...
We present the results of an experimental investigation on the crystallography of the dimpled patter...
Robust and sensitive tools to characterise local structure are essential for investigations of granu...
We investigate equal spheres packings generated from several experiments and from a large number of ...
The smallest maximum-kissing-number Voronoi polyhedron of three-dimensional (3D) Euclidean spheres i...