In this paper, we refine the (almost) existentially optimal distributed Laplacian solver recently developed by Forster, Goranci, Liu, Peng, Sun, and Ye (FOCS '21) into an (almost) universally optimal distributed Laplacian solver. Specifically, when the topology is known (i.e., the Supported-CONGEST model), we show that any Laplacian system on an n-node graph with shortcut quality SQ(G) can be solved after no(1)SQ(G) log(1/ε) rounds, where ε is the required accuracy. This almost matches our lower bound that guarantees that any correct algorithm on G requires (Equation presented)(SQ(G)) rounds, even for a crude solution with ε ≤ 1/2. Several important implications hold in the unknown-topology (i.e., standard CONGEST) case: for excluded-minor ...
We provide universally-optimal distributed graph algorithms for (1+∊)-approximate shortest path prob...
This paper studies the fundamental task of establishing routing paths in distributed networks. We pr...
Solving Laplacian linear systems is an important task in a variety of practical and theoretical appl...
In this paper, we refine the (almost) existentially optimal distributed Laplacian solver of Forster,...
In this paper, we refine the (almost) \emph{existentially optimal} distributed Laplacian solver rece...
In this paper, we refine the (almost) existentially optimal distributed Laplacian solver recently de...
In this work we refine the analysis of the distributed Laplacian solver recently established by Fors...
We study distributed algorithms built around minor-based vertex sparsifiers, and give the first algo...
Many distributed optimization algorithms achieve existentially-optimal running times, meaning that t...
Many distributed optimization algorithms achieve an existentially-optimal round complexity (of (O?(?...
We prove that any n-node graph G with diameter D admits shortcuts with congestion O(δD log n) and di...
Distributed graph algorithms in the standard CONGEST model often exhibit the time-complexity lower b...
Abstract—We consider the problem of solving a Lapla-cian system of equations Lx = b in a distributed...
We present a universally-optimal distributed algorithm for the exact weighted min-cut. The algorithm...
Motivated by the increasing need for fast processing of large-scale graphs, we study a number of fun...
We provide universally-optimal distributed graph algorithms for (1+∊)-approximate shortest path prob...
This paper studies the fundamental task of establishing routing paths in distributed networks. We pr...
Solving Laplacian linear systems is an important task in a variety of practical and theoretical appl...
In this paper, we refine the (almost) existentially optimal distributed Laplacian solver of Forster,...
In this paper, we refine the (almost) \emph{existentially optimal} distributed Laplacian solver rece...
In this paper, we refine the (almost) existentially optimal distributed Laplacian solver recently de...
In this work we refine the analysis of the distributed Laplacian solver recently established by Fors...
We study distributed algorithms built around minor-based vertex sparsifiers, and give the first algo...
Many distributed optimization algorithms achieve existentially-optimal running times, meaning that t...
Many distributed optimization algorithms achieve an existentially-optimal round complexity (of (O?(?...
We prove that any n-node graph G with diameter D admits shortcuts with congestion O(δD log n) and di...
Distributed graph algorithms in the standard CONGEST model often exhibit the time-complexity lower b...
Abstract—We consider the problem of solving a Lapla-cian system of equations Lx = b in a distributed...
We present a universally-optimal distributed algorithm for the exact weighted min-cut. The algorithm...
Motivated by the increasing need for fast processing of large-scale graphs, we study a number of fun...
We provide universally-optimal distributed graph algorithms for (1+∊)-approximate shortest path prob...
This paper studies the fundamental task of establishing routing paths in distributed networks. We pr...
Solving Laplacian linear systems is an important task in a variety of practical and theoretical appl...