AbstractAn N × N matrix product can be evaluated with precision E > 0 in O(Ns+ϵ log (M/E) log log (M/E) log log log (M/E)) bit-operations, ϵ > 0 arbitrary, M the maximum absolute value of the entries of given matrices, O(ns) the arithmetic complexity of n × n matrix multiplication, s < 2.496. The shortest path problem for a graph with N vertices whose edges have non-negative integer costs and all shortest distances are bounded by H can be solved in O(Nsϵ+H) bit-operations
textThe shortest path and minimum spanning tree problems are two of the classic textbook problems i...
We show that the shortest path problem cannot be solved in o(log n) time on an unbounded fan-in PRAM...
The All-Pairs Shortest Paths (APSP) problem is one of the most basic problems in computer science. T...
AbstractAn N × N matrix product can be evaluated with precision E > 0 in O(Ns+ϵ log (M/E) log log (M...
The upper bound on the exponent, ω, of matrix multiplication over a ring that was three in 1968 has ...
AbstractThe upper bound on the exponent,ω, of matrix multiplication over a ring that was three in 19...
The problem of finding all shortest paths in a non-negatively weighted directed graph is addressed, ...
We design a faster algorithm for the all-pairs shortest path problem under the conventional RAM mod...
We provide a formal mathematical definition of the Shortest Paths for All Flows (SP-AF) problem and ...
AbstractThe numbers of bit operations (bt) required for matrix multiplication (MM), matrix inversion...
Via novel path-routing techniques we prove a lower bound on the I/O-complexity of all recursive matr...
Copyright © 2020 by SIAM The All-Pairs Shortest Paths (APSP) problem is one of the most basic proble...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
AbstractWe present an algorithm, APD, that solves the distance version of the all-pairs-shortest-pat...
The linear complexity of a matrix is a measure of the number of additions, subtractions, and scalar ...
textThe shortest path and minimum spanning tree problems are two of the classic textbook problems i...
We show that the shortest path problem cannot be solved in o(log n) time on an unbounded fan-in PRAM...
The All-Pairs Shortest Paths (APSP) problem is one of the most basic problems in computer science. T...
AbstractAn N × N matrix product can be evaluated with precision E > 0 in O(Ns+ϵ log (M/E) log log (M...
The upper bound on the exponent, ω, of matrix multiplication over a ring that was three in 1968 has ...
AbstractThe upper bound on the exponent,ω, of matrix multiplication over a ring that was three in 19...
The problem of finding all shortest paths in a non-negatively weighted directed graph is addressed, ...
We design a faster algorithm for the all-pairs shortest path problem under the conventional RAM mod...
We provide a formal mathematical definition of the Shortest Paths for All Flows (SP-AF) problem and ...
AbstractThe numbers of bit operations (bt) required for matrix multiplication (MM), matrix inversion...
Via novel path-routing techniques we prove a lower bound on the I/O-complexity of all recursive matr...
Copyright © 2020 by SIAM The All-Pairs Shortest Paths (APSP) problem is one of the most basic proble...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
AbstractWe present an algorithm, APD, that solves the distance version of the all-pairs-shortest-pat...
The linear complexity of a matrix is a measure of the number of additions, subtractions, and scalar ...
textThe shortest path and minimum spanning tree problems are two of the classic textbook problems i...
We show that the shortest path problem cannot be solved in o(log n) time on an unbounded fan-in PRAM...
The All-Pairs Shortest Paths (APSP) problem is one of the most basic problems in computer science. T...