We propose an efficient algorithm for density fitting of Bloch waves for Hamiltonian operators with periodic potential. The algorithm is based on column selection and random Fourier projection of the orbital functions. The computational cost of the algorithm scales as $\mathcal{O}\bigl(N_{\text{grid}} N^2 + N_{\text{grid}} NK \log (NK)\bigr)$, where $N_{\text{grid}}$ is number of spatial grid points, $K$ is the number of sampling $k$-points in first Brillouin zone, and $N$ is the number of bands under consideration. We validate the algorithm by numerical examples in both two and three dimensions
International audienceWe study the homogenization and localization of high frequency waves in a loca...
The classical problem of homogenization deals with elliptic operators in periodically oscillating me...
AbstractWe describe how a previously developed constrained minimization algorithm can be adapted to ...
This paper presents a numerical method for “time upscaling ” wave equations, i.e., performing time s...
Abstract. We present a new numerical method for accurate computations of solutions to (linear) one d...
Abstract. We present a new numerical method for accurate computations of solutions to (linear) one d...
We present a systematically improvable density fitting scheme designed for accurate Coulomb potentia...
We present a systematically improvable density fitting scheme designed for accurate Coulomb potentia...
We present a method to construct an efficient approximation to the bare exchange andscreened direct ...
The Fourier Transform is one of the basic concepts in the mathematical analysis of partial different...
We report methodological and computational details of our Kohn-Sham density functional method with G...
Bloch waves of Bose-Einstein condensates (BEC) ill optical lattices are extremum nonlinear eigenstat...
This paper deals with a numerical study of classical homogenization of elliptic linear operators wi...
International audienceBootstrap methods, initially developed for solving statistical and quantum fie...
This paper deals with a numerical study of classical homogenization of elliptic linear operators wit...
International audienceWe study the homogenization and localization of high frequency waves in a loca...
The classical problem of homogenization deals with elliptic operators in periodically oscillating me...
AbstractWe describe how a previously developed constrained minimization algorithm can be adapted to ...
This paper presents a numerical method for “time upscaling ” wave equations, i.e., performing time s...
Abstract. We present a new numerical method for accurate computations of solutions to (linear) one d...
Abstract. We present a new numerical method for accurate computations of solutions to (linear) one d...
We present a systematically improvable density fitting scheme designed for accurate Coulomb potentia...
We present a systematically improvable density fitting scheme designed for accurate Coulomb potentia...
We present a method to construct an efficient approximation to the bare exchange andscreened direct ...
The Fourier Transform is one of the basic concepts in the mathematical analysis of partial different...
We report methodological and computational details of our Kohn-Sham density functional method with G...
Bloch waves of Bose-Einstein condensates (BEC) ill optical lattices are extremum nonlinear eigenstat...
This paper deals with a numerical study of classical homogenization of elliptic linear operators wi...
International audienceBootstrap methods, initially developed for solving statistical and quantum fie...
This paper deals with a numerical study of classical homogenization of elliptic linear operators wit...
International audienceWe study the homogenization and localization of high frequency waves in a loca...
The classical problem of homogenization deals with elliptic operators in periodically oscillating me...
AbstractWe describe how a previously developed constrained minimization algorithm can be adapted to ...