We give a parallel algorithm for computing all row minima in a totally monotone $n\times n$ matrix which is simpler and more work efficient than previous polylog-time algorithms. It runs in $O(\lg n \lg\lg n)$ time doing $O(n\sqrt{\lg n})$ work on a {\sf CRCW}, in $O(\lg n (\lg\lg n)^2)$ time doing $O(n\sqrt{\lg n})$ work on a {\sf CREW}, and in $O(\lg n\sqrt{\lg n \lg\lg n})$ time doing $O(n\sqrt{\lg n\lg\lg n})$ work on an {\sf EREW}
AbstractThis paper presents results which improve the efficiency of parallel algorithms for computin...
We describe a deterministic parallel algorithm for linear programming in fixed dimension d that take...
AbstractThe complexity of performing matrix computations, such as solving a linear system, inverting...
We give a parallel algorithm for computing all row minima in a totally monotone $n\times n$ matrix w...
We give a parallel algorithm for the problem of computing the row minima of a totally monotone two-d...
This paper shows that finding the row minima (maxima) in an $n \times n$ totally monotone matrix in ...
A matrix A of size m \Theta n containing items from a totally ordered universe is termed monotone if...
This paper's main result is an O(({radical}{bar m}lgm)(n lg n) + mlg n)-time algorithm for computing...
We present parallel algorithms for geometric problems on coarse grained multicomputers. More specifi...
An m×n matrix A=(a<SUB>i, j</SUB>), 1≤i≤m and 1≤j≤n, is called a totally monotone matrix if for all ...
The all nearest smaller values problem is defined as follows. Let A = (a 1 ; a 2 ; : : : ; an ) be n...
AbstractThe main contribution of this paper is a novel technique for proving lower bounds in paralle...
AbstractThis paper gives output-sensitive parallel algorithms whose performance depends on the outpu...
An optimal O (log log n)* time parallel algorithm for string matching on CRCW-PRAM is presented. It ...
We present the first $m\,\text{polylog}(n)$ work, $\text{polylog}(n)$ time algorithm in the PRAM mod...
AbstractThis paper presents results which improve the efficiency of parallel algorithms for computin...
We describe a deterministic parallel algorithm for linear programming in fixed dimension d that take...
AbstractThe complexity of performing matrix computations, such as solving a linear system, inverting...
We give a parallel algorithm for computing all row minima in a totally monotone $n\times n$ matrix w...
We give a parallel algorithm for the problem of computing the row minima of a totally monotone two-d...
This paper shows that finding the row minima (maxima) in an $n \times n$ totally monotone matrix in ...
A matrix A of size m \Theta n containing items from a totally ordered universe is termed monotone if...
This paper's main result is an O(({radical}{bar m}lgm)(n lg n) + mlg n)-time algorithm for computing...
We present parallel algorithms for geometric problems on coarse grained multicomputers. More specifi...
An m×n matrix A=(a<SUB>i, j</SUB>), 1≤i≤m and 1≤j≤n, is called a totally monotone matrix if for all ...
The all nearest smaller values problem is defined as follows. Let A = (a 1 ; a 2 ; : : : ; an ) be n...
AbstractThe main contribution of this paper is a novel technique for proving lower bounds in paralle...
AbstractThis paper gives output-sensitive parallel algorithms whose performance depends on the outpu...
An optimal O (log log n)* time parallel algorithm for string matching on CRCW-PRAM is presented. It ...
We present the first $m\,\text{polylog}(n)$ work, $\text{polylog}(n)$ time algorithm in the PRAM mod...
AbstractThis paper presents results which improve the efficiency of parallel algorithms for computin...
We describe a deterministic parallel algorithm for linear programming in fixed dimension d that take...
AbstractThe complexity of performing matrix computations, such as solving a linear system, inverting...