Several parallel algorithms for Fock matrix construction are described. The algorithms calculate only the unique integrals, distribute the Fock and density matrices over the processors of a massively parallel computer, use blocking techniques to construct the distributed data structures, and use clustering techniques on each processor to maximize data reuse. Algorithms based on both square and row blocked distributions of the Fock and density matrices are described and evaluated. Variants of the algorithms are discussed that use either triple-sort or canonical ordering of integrals, and dynamic or static task clustering schemes. The algorithms are shown to adapt to screening, with communication volume scaling down with computation costs. Mo...
This thesis, whose topic is quantum chemistry algorithms, is made in the context of the change in pa...
The solution of dense systems of linear equations is at the heart of numerical computations. Such sy...
Matrix-matrix multiplication is one of the core computations in many algorithms from scientific comp...
Several parallel algorithms for Fock matrix construction are described. The algorithms calculate onl...
Recently, early onset linear scaling computation of the exchange-correlation matrix has been achieve...
We have implemented a parallel divide-and-conquer method for semiempirical quantum mechanical calcul...
The aim of electronic structure calculations is to simulate behavior of complex materials by resolvi...
Our experimental results showed that block based algorithms for numerically intensive applications a...
Efficient and accurate methods for computing the density matrix are necessary to be able to perform ...
We present a GPGPU implementation of the construction of the Fock matrix in the molecular orbital ba...
Hierarchical cubature is a new method for achieving linear scaling computation of the exchange-corre...
We propose a new complete memory-distributed algorithm, which significantly improves the parallel im...
A new method for the multipole evaluation of contracted Cartesian Gaussian-based electron repulsion ...
International audienceWe present an algorithm and its parallel implementation for solving a self con...
A hierarchic sparse matrix data structure for Hartree-Fock/Kohn-Sham calculations is presented. The ...
This thesis, whose topic is quantum chemistry algorithms, is made in the context of the change in pa...
The solution of dense systems of linear equations is at the heart of numerical computations. Such sy...
Matrix-matrix multiplication is one of the core computations in many algorithms from scientific comp...
Several parallel algorithms for Fock matrix construction are described. The algorithms calculate onl...
Recently, early onset linear scaling computation of the exchange-correlation matrix has been achieve...
We have implemented a parallel divide-and-conquer method for semiempirical quantum mechanical calcul...
The aim of electronic structure calculations is to simulate behavior of complex materials by resolvi...
Our experimental results showed that block based algorithms for numerically intensive applications a...
Efficient and accurate methods for computing the density matrix are necessary to be able to perform ...
We present a GPGPU implementation of the construction of the Fock matrix in the molecular orbital ba...
Hierarchical cubature is a new method for achieving linear scaling computation of the exchange-corre...
We propose a new complete memory-distributed algorithm, which significantly improves the parallel im...
A new method for the multipole evaluation of contracted Cartesian Gaussian-based electron repulsion ...
International audienceWe present an algorithm and its parallel implementation for solving a self con...
A hierarchic sparse matrix data structure for Hartree-Fock/Kohn-Sham calculations is presented. The ...
This thesis, whose topic is quantum chemistry algorithms, is made in the context of the change in pa...
The solution of dense systems of linear equations is at the heart of numerical computations. Such sy...
Matrix-matrix multiplication is one of the core computations in many algorithms from scientific comp...