Add to ORKG[[abstract]]We discuss a new general phenomenon pertaining to tiling models of quasicrystal growth. It is known that with Penrose tiles no (deterministic) local matching rules exist which guarantee defect-free tiling for regions of arbitrary large size. We prove that this property holds quite generally: namely, that the emergence of defects in quasicrystal growth is unavoidable for all aperiodic tiling models in the plane with local matching rules, and for many models inR 3 satisfying certain conditions
The density of states of the ideal three-dimensional Penrose tiling, a quasicrystalline model, is ca...
Self-assembly is the process in which the components of a system, whether molecules, polymers, or ma...
In this thesis, I will show a fundamentally new way to understand and construct quasicrystal tilings...
[[abstract]]We discuss a new general phenomenon pertaining to tiling models of quasicrystal growth. ...
Icosahedral quasicrystals (IQCs) with extremely high degrees of translational order have been produc...
The problem of local definition of general projected quasicrystals (QC) in two and three dimensions ...
Monte Carlo (MC) simulation of a model quasicrystal (2D Penrose rhomb tiling) shows that the kinds o...
AbstractWe prove that quasiperiodic tilings of Rk, obtained by the strip projection method when the ...
Understanding the growth of quasicrystals poses a challenging problem, not the least because the qua...
Planar tilings with n-fold rotational symmetry are commonly used to model the long range order of qu...
In order to generate normal Penrose tilings by inflation/deflation, decisions have to be made regard...
In order to generate normal Penrose tilings by inflation/deflation, decisions have to be made regard...
The problem of mistakes in Penrose tilings will be investigated. Specifically, we will consider the...
In this thesis, I will show a fundamentally new way to understand and construct quasicrystal tilings...
A general method is presented which proves that an appropriately chosen set of matching rules for a ...
The density of states of the ideal three-dimensional Penrose tiling, a quasicrystalline model, is ca...
Self-assembly is the process in which the components of a system, whether molecules, polymers, or ma...
In this thesis, I will show a fundamentally new way to understand and construct quasicrystal tilings...
[[abstract]]We discuss a new general phenomenon pertaining to tiling models of quasicrystal growth. ...
Icosahedral quasicrystals (IQCs) with extremely high degrees of translational order have been produc...
The problem of local definition of general projected quasicrystals (QC) in two and three dimensions ...
Monte Carlo (MC) simulation of a model quasicrystal (2D Penrose rhomb tiling) shows that the kinds o...
AbstractWe prove that quasiperiodic tilings of Rk, obtained by the strip projection method when the ...
Understanding the growth of quasicrystals poses a challenging problem, not the least because the qua...
Planar tilings with n-fold rotational symmetry are commonly used to model the long range order of qu...
In order to generate normal Penrose tilings by inflation/deflation, decisions have to be made regard...
In order to generate normal Penrose tilings by inflation/deflation, decisions have to be made regard...
The problem of mistakes in Penrose tilings will be investigated. Specifically, we will consider the...
In this thesis, I will show a fundamentally new way to understand and construct quasicrystal tilings...
A general method is presented which proves that an appropriately chosen set of matching rules for a ...
The density of states of the ideal three-dimensional Penrose tiling, a quasicrystalline model, is ca...
Self-assembly is the process in which the components of a system, whether molecules, polymers, or ma...
In this thesis, I will show a fundamentally new way to understand and construct quasicrystal tilings...