We study distributed algorithms built around minor-based vertex sparsifiers, and give the first algorithm in the CONGEST model for solving linear systems in graph Laplacian matrices to high accuracy. Our Laplacian solver has a round complexity of $O(n^{o(1)}(\sqrt{n}+D))$, and thus almost matches the lower bound of $\widetilde{\Omega}(\sqrt{n}+D)$, where $n$ is the number of nodes in the network and $D$ is its diameter. We show that our distributed solver yields new sublinear round algorithms for several cornerstone problems in combinatorial optimization. This is achieved by leveraging the powerful algorithmic framework of Interior Point Methods (IPMs) and the Laplacian paradigm in the context of distributed graph algorithms, which entails ...
Discussions about different graph Laplacian, mainly normalized and unnormalized versions of graph La...
In this last lecture we will discuss graph sparsification: approximating a graph by weighted sub-gra...
Spectral graph sparsification aims to find an ultra-sparse subgraph whose Laplacian matrix can well ...
In this work we refine the analysis of the distributed Laplacian solver recently established by Fors...
In this paper, we refine the (almost) existentially optimal distributed Laplacian solver recently de...
In this paper, we refine the (almost) existentially optimal distributed Laplacian solver of Forster,...
<p>Spectral graph theory is the interplay between linear algebra and combinatorial graph theory. Lap...
In this paper, we refine the (almost) \emph{existentially optimal} distributed Laplacian solver rece...
Solving Laplacian linear systems is an important task in a variety of practical and theoretical appl...
In solving a linear system with iterative methods, one is usually confronted with the dilemma of hav...
In solving a linear system with iterative methods, one is usually confronted with the dilemma of hav...
Linear system solving is a main workhorse in applied mathematics. Recently, theoretical computer sci...
The Massively Parallel Computation (MPC) model is an emerging model which distills core aspects of ...
International audienceThe representation and learning benefits of methods based on graph Laplacians,...
This dissertation presents combinatorial and algebraic tools that enable the design of the first lin...
Discussions about different graph Laplacian, mainly normalized and unnormalized versions of graph La...
In this last lecture we will discuss graph sparsification: approximating a graph by weighted sub-gra...
Spectral graph sparsification aims to find an ultra-sparse subgraph whose Laplacian matrix can well ...
In this work we refine the analysis of the distributed Laplacian solver recently established by Fors...
In this paper, we refine the (almost) existentially optimal distributed Laplacian solver recently de...
In this paper, we refine the (almost) existentially optimal distributed Laplacian solver of Forster,...
<p>Spectral graph theory is the interplay between linear algebra and combinatorial graph theory. Lap...
In this paper, we refine the (almost) \emph{existentially optimal} distributed Laplacian solver rece...
Solving Laplacian linear systems is an important task in a variety of practical and theoretical appl...
In solving a linear system with iterative methods, one is usually confronted with the dilemma of hav...
In solving a linear system with iterative methods, one is usually confronted with the dilemma of hav...
Linear system solving is a main workhorse in applied mathematics. Recently, theoretical computer sci...
The Massively Parallel Computation (MPC) model is an emerging model which distills core aspects of ...
International audienceThe representation and learning benefits of methods based on graph Laplacians,...
This dissertation presents combinatorial and algebraic tools that enable the design of the first lin...
Discussions about different graph Laplacian, mainly normalized and unnormalized versions of graph La...
In this last lecture we will discuss graph sparsification: approximating a graph by weighted sub-gra...
Spectral graph sparsification aims to find an ultra-sparse subgraph whose Laplacian matrix can well ...