Add to ORKGWe numerically study the ground states of particles interacting via a repulsive Yukawa potential on two rigid substrates shaped as isolated and periodically arranged bumps characterized by a spatially varying Gaussian curvature. Below a critical aspect ratio that describes the substrate deformation, the lattice is frustrated, but defect free. A further increase of the aspect ratio triggers defect unbinding transitions that lower the total potential energy by introducing dislocations either in isolation or within grain boundaries. In the presence of very strong deformations, isolated disclinations are nucleated. We show that the character and spatial distribution of defects observed in the ground state reflect the symmetries and periodicity ...
International audienceWe investigate the influence of curvature and topology on crystalline dimpled ...
The “melting” of self-formed rigid structures made of a small number of interacting classi...
The energetically optimal position of lattice defects on intrinsically curved surfaces is a complex ...
We numerically study the ground states of particles interacting via a repulsive Yukawa potential on ...
To explore the interaction between topological defects and curvature in materials with orientational...
We report the status of a high-statistics Monte Carlo simulation of non-self-avoiding crystalline su...
The crystallography of two-dimensional particle packings on flexible surfaces of spherical topology ...
Crystalline surfaces model important experimental and biological systems. With the insight provided ...
In this thesis we explore the rich physics of defect formation and dynamics in both spherical crysta...
We study the phase structure of a surface model by using the canonical Monte Carlo simulation techni...
In this paper we use computer simulations to examine point defects in systems of "soft"colloidal par...
We report a comprehensive analysis of the ground-state properties of axisymmetric toroidal crystals ...
We propose and analyze an effective free energy describing the physics of disclination defects in pa...
We study the orientational ordering on the surface of a sphere using Monte Carlo and Brownian dynami...
Many systems in nature and the synthetic world involve ordered arrangements of units on two-dimensio...
International audienceWe investigate the influence of curvature and topology on crystalline dimpled ...
The “melting” of self-formed rigid structures made of a small number of interacting classi...
The energetically optimal position of lattice defects on intrinsically curved surfaces is a complex ...
We numerically study the ground states of particles interacting via a repulsive Yukawa potential on ...
To explore the interaction between topological defects and curvature in materials with orientational...
We report the status of a high-statistics Monte Carlo simulation of non-self-avoiding crystalline su...
The crystallography of two-dimensional particle packings on flexible surfaces of spherical topology ...
Crystalline surfaces model important experimental and biological systems. With the insight provided ...
In this thesis we explore the rich physics of defect formation and dynamics in both spherical crysta...
We study the phase structure of a surface model by using the canonical Monte Carlo simulation techni...
In this paper we use computer simulations to examine point defects in systems of "soft"colloidal par...
We report a comprehensive analysis of the ground-state properties of axisymmetric toroidal crystals ...
We propose and analyze an effective free energy describing the physics of disclination defects in pa...
We study the orientational ordering on the surface of a sphere using Monte Carlo and Brownian dynami...
Many systems in nature and the synthetic world involve ordered arrangements of units on two-dimensio...
International audienceWe investigate the influence of curvature and topology on crystalline dimpled ...
The “melting” of self-formed rigid structures made of a small number of interacting classi...
The energetically optimal position of lattice defects on intrinsically curved surfaces is a complex ...