I will discuss a family of recently developed stochastic techniques for linear algebra problems involving massive matrices. These methods can be used to, for example, solve linear systems, estimate eigenvalues/vectors, and apply a matrix exponential to a vector, even in cases where the desired solution vector is too large to store. The first incarnations of this idea appear for dominant eigenproblems arising in statistical physics and in quantum chemistry and were inspired by the real space diffusion Monte Carlo algorithm which has been used to compute chemical ground states for small systems since the 1970's. I will discuss our own general framework for fast randomized iterative linear algebra as well share a (very partial) explanation ...
In this dissertation, I present my original research in the development of algorithms for computing ...
The purpose of this text is to provide an accessible introduction to a set of recently developed alg...
Development of exponentially scaling methods has seen great progress in tackling larger systems than...
We review the basic outline of the highly successful diffusion Monte Carlo technique com-monly used ...
This dissertation is about computational tools based on randomized numerical linear algebra for hand...
This work explores how randomization can be exploited to deliver sophisticated algorithms with prova...
Conventional Quantum Monte Carlo methods, routinely used to compute properties of many-body quantum ...
Conventional Quantum Monte Carlo methods, routinely used to compute properties of many-body quantum ...
This survey describes probabilistic algorithms for linear algebraic computations, such as factorizin...
Participants at the workshop ranged over a number of different fields, ranging from theoretical phys...
In this lecture we present the theory and some results of applications of the stochastic diagonaliza...
AbstractWe present randomized algorithms for the solution of some numerical linear algebra problems....
International audienceWe present the first accelerated randomized algorithm for solving linear syste...
The present thesis focuses on the design and analysis of randomized algorithms for accelerating seve...
This paper serves to prove the thesis that a computational trick can open entirely new approaches to...
In this dissertation, I present my original research in the development of algorithms for computing ...
The purpose of this text is to provide an accessible introduction to a set of recently developed alg...
Development of exponentially scaling methods has seen great progress in tackling larger systems than...
We review the basic outline of the highly successful diffusion Monte Carlo technique com-monly used ...
This dissertation is about computational tools based on randomized numerical linear algebra for hand...
This work explores how randomization can be exploited to deliver sophisticated algorithms with prova...
Conventional Quantum Monte Carlo methods, routinely used to compute properties of many-body quantum ...
Conventional Quantum Monte Carlo methods, routinely used to compute properties of many-body quantum ...
This survey describes probabilistic algorithms for linear algebraic computations, such as factorizin...
Participants at the workshop ranged over a number of different fields, ranging from theoretical phys...
In this lecture we present the theory and some results of applications of the stochastic diagonaliza...
AbstractWe present randomized algorithms for the solution of some numerical linear algebra problems....
International audienceWe present the first accelerated randomized algorithm for solving linear syste...
The present thesis focuses on the design and analysis of randomized algorithms for accelerating seve...
This paper serves to prove the thesis that a computational trick can open entirely new approaches to...
In this dissertation, I present my original research in the development of algorithms for computing ...
The purpose of this text is to provide an accessible introduction to a set of recently developed alg...
Development of exponentially scaling methods has seen great progress in tackling larger systems than...