Add to ORKGProperties of many magnetic materials consisting of dipoles depend crucially on the nature of the dipole–dipole interaction. In the present work, we study systems of magnetic dipoles where the dipoles are arranged on various types of one-dimensional, two-dimensional and three-dimensional lattices. It is assumed that we are in the regime of strong dipole moments where a classical treatment is possible. We combine a new classical numerical approach in conjuncture with an ansatz for an energy decomposition method to study the energy stability of various magnetic configurations at zero temperature for systems of dipoles ranging from small to an infinite number of particles. A careful analysis of the data in the bulk limit allows us to identify ...
A two-dimensional (2D) system of classical dipoles free to rotate in a plane and fixed on an N × N s...
Computational study of magnetic materials has been crucial for the development of new technologies i...
In this work, we have constructed and experimentally investigated frustrated arrays of dipoles formi...
To investigate the influence of geometric frustration on the properties of low-energy configurations...
An infinite triangular lattice of classical dipolar spins is usually considered to have a ferromagne...
A system of nano sized modomain ferromagnetic particle arranged in two-dimensional lattice is theore...
We investigate the ground state energy of a finite classical system consisting of an arbitrary numbe...
We show that the ground state of a system of magnetic dipoles, with no electric charge, is a ferroma...
For most materials, electron spin coupling plays the dominant role in determining the arrangement of...
We obtain the best upper bound for the ground-state energy of a system of chargeless fermions of mas...
The geometric arrangement of interacting (magnetic) dipoles is a question of fundamental im-portance...
We present a first-principles approach for the computation of the magnetic Gibbs free energy of mate...
The phase diagram of binary mixtures of particles interacting via a pair potential of parallel dipol...
The geometric arrangement of interacting (magnetic) dipoles is a question of fundamental importance ...
We use different determinantal Hartree-Fock (HF) wave functions to calculate true variational upper ...
A two-dimensional (2D) system of classical dipoles free to rotate in a plane and fixed on an N × N s...
Computational study of magnetic materials has been crucial for the development of new technologies i...
In this work, we have constructed and experimentally investigated frustrated arrays of dipoles formi...
To investigate the influence of geometric frustration on the properties of low-energy configurations...
An infinite triangular lattice of classical dipolar spins is usually considered to have a ferromagne...
A system of nano sized modomain ferromagnetic particle arranged in two-dimensional lattice is theore...
We investigate the ground state energy of a finite classical system consisting of an arbitrary numbe...
We show that the ground state of a system of magnetic dipoles, with no electric charge, is a ferroma...
For most materials, electron spin coupling plays the dominant role in determining the arrangement of...
We obtain the best upper bound for the ground-state energy of a system of chargeless fermions of mas...
The geometric arrangement of interacting (magnetic) dipoles is a question of fundamental im-portance...
We present a first-principles approach for the computation of the magnetic Gibbs free energy of mate...
The phase diagram of binary mixtures of particles interacting via a pair potential of parallel dipol...
The geometric arrangement of interacting (magnetic) dipoles is a question of fundamental importance ...
We use different determinantal Hartree-Fock (HF) wave functions to calculate true variational upper ...
A two-dimensional (2D) system of classical dipoles free to rotate in a plane and fixed on an N × N s...
Computational study of magnetic materials has been crucial for the development of new technologies i...
In this work, we have constructed and experimentally investigated frustrated arrays of dipoles formi...