© 2018 ACM. We say an algorithm on n × n matrices with integer entries in [-M,M] (or n-node graphs with edge weights from [-M,M]) is truly subcubic if it runs in O(n3 - δ · poly(log M)) time for some δ > 0. We define a notion of subcubic reducibility and show that many important problems on graphs and matrices solvable in O(n3) time are equivalent under subcubic reductions. Namely, the following weighted problems either all have truly subcubic algorithms, or none of them do: •The all-pairs shortest paths problem on weighted digraphs (APSP). •Detecting if a weighted graph has a triangle of negative total edge weight. •Listing up to n2.99 negative triangles in an edge-weighted graph. •Finding a minimum weight cycle in a graph of non-negative ...
For vertices $u$ and $v$ of an $n$-vertex graph $G$, a $uv$-trail of $G$ is an induced $uv$-path of ...
In the bounded-leg shortest path (BLSP) problem, we are given a weighted graph G with nonnegative ed...
© Andrea Lincoln, Adam Polak, and Virginia Vassilevska Williams. The most studied linear algebraic o...
We say an algorithm on n × n matrices with entries in [−M,M] (or n-node graphs with edge weights fro...
Copyright © 2020 by SIAM The All-Pairs Shortest Paths (APSP) problem is one of the most basic proble...
The All-Pairs Shortest Paths (APSP) problem is one of the most basic problems in computer science. T...
Finding the largest triangle in an n-nodes edge-weighted graph belongs to a set of problems all equi...
Let NDTIME(f(n),g(n)) denote the class of problems solvable in O(g(n)) time by a multi-tape Turing m...
We show that for any ε > 0, a maximum-weight triangle in an undirected graph with n vertices and rea...
We show that a maximum-weight triangle in an undirected graph with n vertices and real weights assig...
We show that for any 0, a maximum-weight triangle in an undirected graph with n vertices and real we...
We study the traveling salesman problem (TSP) on the metric completion of cubic and subcubic graphs,...
AbstractIn this paper, we consider the problem of finding a maximum weight 2-matching containing no ...
We revisit the fundamental Boolean Matrix Multiplication (BMM) problem. With the invention of algebr...
This thesis consists of five papers within the design and analysis of efficient algorithms.In the fi...
For vertices $u$ and $v$ of an $n$-vertex graph $G$, a $uv$-trail of $G$ is an induced $uv$-path of ...
In the bounded-leg shortest path (BLSP) problem, we are given a weighted graph G with nonnegative ed...
© Andrea Lincoln, Adam Polak, and Virginia Vassilevska Williams. The most studied linear algebraic o...
We say an algorithm on n × n matrices with entries in [−M,M] (or n-node graphs with edge weights fro...
Copyright © 2020 by SIAM The All-Pairs Shortest Paths (APSP) problem is one of the most basic proble...
The All-Pairs Shortest Paths (APSP) problem is one of the most basic problems in computer science. T...
Finding the largest triangle in an n-nodes edge-weighted graph belongs to a set of problems all equi...
Let NDTIME(f(n),g(n)) denote the class of problems solvable in O(g(n)) time by a multi-tape Turing m...
We show that for any ε > 0, a maximum-weight triangle in an undirected graph with n vertices and rea...
We show that a maximum-weight triangle in an undirected graph with n vertices and real weights assig...
We show that for any 0, a maximum-weight triangle in an undirected graph with n vertices and real we...
We study the traveling salesman problem (TSP) on the metric completion of cubic and subcubic graphs,...
AbstractIn this paper, we consider the problem of finding a maximum weight 2-matching containing no ...
We revisit the fundamental Boolean Matrix Multiplication (BMM) problem. With the invention of algebr...
This thesis consists of five papers within the design and analysis of efficient algorithms.In the fi...
For vertices $u$ and $v$ of an $n$-vertex graph $G$, a $uv$-trail of $G$ is an induced $uv$-path of ...
In the bounded-leg shortest path (BLSP) problem, we are given a weighted graph G with nonnegative ed...
© Andrea Lincoln, Adam Polak, and Virginia Vassilevska Williams. The most studied linear algebraic o...