The {\em $\lambda$-approximate compaction} problem is: given an input array of $n$ values, each either 0 or 1, place each value in an output array so that all the 1's are in the first $(1+\lambda)k$ array locations, where $k$ is the number of 1's in the input. $\lambda$ is an accuracy parameter. This problem is of fundamental importance in parallel computation because of its applications to processor allocation and approximate counting. When $\lambda$ is a constant, the problem is called {\em Linear Approximate Compaction} (LAC). On the CRCW PRAM model, %there is an algorithm that solves approximate compaction in $\order{(\log\log n)^3}$ time for $\lambda = \frac{1}{\log\log n}$, using $\frac{n}{(\log\log n)^3}$ processors. Our main result ...
The Longest Common Subsequence (LCS) is one of the most basic similarity measures and it captures im...
It is shown that the time to compute a monotone boolean function depending upon $n$ variables on a ...
The all nearest smaller values problem is defined as follows. Let A = (a 1 ; a 2 ; : : : ; an ) be n...
The {\em $\lambda$-approximate compaction} problem is: given an input array of $n$ values, each eith...
The A-approximate compaction problem is: given an input array of n values, each either 0 or 1, place...
The queue-read, queue-write (QRQW) parallel random access machine (PRAM) model is a shared memory mo...
Interval allocation has been suggested as a possible formalization for the PRAM of the (vaguely defi...
AbstractProperties of functions that are good measures of the CRCW PRAM complexity of computing them...
Padded-sorting is a task of placing input items in an array in a nondecreasing order, but with free ...
AbstractIt is shown that general time lower bounds do not exist for CRCW PRAMs. Suppose that g(n) is...
There are a number of fundamental problems in computational geometry for which work-optimal algorith...
We investigate properties of functions that are good measures of the CRCW PRAM complexity of computi...
Conventional parallel sorting requires the $n$ input keys to be output in an array of size $n$, and ...
The following problems are shown to be solvable in $O(\log^{\ast }\! n)$ time with optimal speedup w...
AbstractIn this paper, we consider the open problem of the complexity of the LLL algorithm in the ca...
The Longest Common Subsequence (LCS) is one of the most basic similarity measures and it captures im...
It is shown that the time to compute a monotone boolean function depending upon $n$ variables on a ...
The all nearest smaller values problem is defined as follows. Let A = (a 1 ; a 2 ; : : : ; an ) be n...
The {\em $\lambda$-approximate compaction} problem is: given an input array of $n$ values, each eith...
The A-approximate compaction problem is: given an input array of n values, each either 0 or 1, place...
The queue-read, queue-write (QRQW) parallel random access machine (PRAM) model is a shared memory mo...
Interval allocation has been suggested as a possible formalization for the PRAM of the (vaguely defi...
AbstractProperties of functions that are good measures of the CRCW PRAM complexity of computing them...
Padded-sorting is a task of placing input items in an array in a nondecreasing order, but with free ...
AbstractIt is shown that general time lower bounds do not exist for CRCW PRAMs. Suppose that g(n) is...
There are a number of fundamental problems in computational geometry for which work-optimal algorith...
We investigate properties of functions that are good measures of the CRCW PRAM complexity of computi...
Conventional parallel sorting requires the $n$ input keys to be output in an array of size $n$, and ...
The following problems are shown to be solvable in $O(\log^{\ast }\! n)$ time with optimal speedup w...
AbstractIn this paper, we consider the open problem of the complexity of the LLL algorithm in the ca...
The Longest Common Subsequence (LCS) is one of the most basic similarity measures and it captures im...
It is shown that the time to compute a monotone boolean function depending upon $n$ variables on a ...
The all nearest smaller values problem is defined as follows. Let A = (a 1 ; a 2 ; : : : ; an ) be n...