We consider nearest-neighbour ferromagnetic energies defined on a quasicrystal modeled following the so-called cut-and-project approach as a portion of a regular lattice contained in a possibly irrational stripe defined as a neighborhood of a k-dimensional subspace in an n-dimensional space. The overall properties of this system are described by an effective surface energy on a k-dimensional space obtained as Gamma-limit of the scaled discrete energies
Electronic properties of the Fibonacci chain, the Penrose tiling, and the three-dimensional Penrose ...
We study the homogenization of lattice energies related to Ising systems of the form E-epsilon(u) = ...
In this paper we construct and analyze a two-well Hamiltonian on a 2D atomic lattice. The two wells ...
We consider nearest-neighbour ferromagnetic energies defined on a quasicrystal modeled following the...
Studies performed on energy levels in Fermi surface in groupings showed that crystals have plans per...
We develop an explicit model for the interfacial energy in crystals that emphasizes the geometric or...
In this paper we prove a homogenization theorem for interfacial discrete energies defined on an a-pe...
We provide a general framework for the design of surface energies on lattices. We prove sharp bounds...
We consider Ising models in two and three dimensions with nearest neighbor ferromagnetic interaction...
We consider Ising models in d = 2 and d = 3 dimensions with nearest neighbor ferromagnetic and long-...
We consider Ising models in d = 2 and d = 3 dimensions with nearest neighbor ferromagnetic and long-...
We give an example of a one-dimensional scalar Ising-type energy with long-range interactions not sa...
We prove that by scaling nearest-neighbour ferromagnetic energies defined on Poisson random sets in ...
Electronic properties of the Fibonacci chain, the Penrose tiling, and the three-dimensional Penrose ...
We study the homogenization of lattice energies related to Ising systems of the form E-epsilon(u) = ...
In this paper we construct and analyze a two-well Hamiltonian on a 2D atomic lattice. The two wells ...
We consider nearest-neighbour ferromagnetic energies defined on a quasicrystal modeled following the...
Studies performed on energy levels in Fermi surface in groupings showed that crystals have plans per...
We develop an explicit model for the interfacial energy in crystals that emphasizes the geometric or...
In this paper we prove a homogenization theorem for interfacial discrete energies defined on an a-pe...
We provide a general framework for the design of surface energies on lattices. We prove sharp bounds...
We consider Ising models in two and three dimensions with nearest neighbor ferromagnetic interaction...
We consider Ising models in d = 2 and d = 3 dimensions with nearest neighbor ferromagnetic and long-...
We consider Ising models in d = 2 and d = 3 dimensions with nearest neighbor ferromagnetic and long-...
We give an example of a one-dimensional scalar Ising-type energy with long-range interactions not sa...
We prove that by scaling nearest-neighbour ferromagnetic energies defined on Poisson random sets in ...
Electronic properties of the Fibonacci chain, the Penrose tiling, and the three-dimensional Penrose ...
We study the homogenization of lattice energies related to Ising systems of the form E-epsilon(u) = ...
In this paper we construct and analyze a two-well Hamiltonian on a 2D atomic lattice. The two wells ...
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