AbstractWe establish non-trivial lower bounds for several prefix problems in the CRCW PRAM model. The chaining problem is, given a binary input, for each 1 in the input, to find the index of the nearest 1 to its left. Our main result is that for an input ofnbits, solving the chaining problem usingO(n) processors requires inverse-Ackerman time. This matches the previously known upper bound. We also give a reduction to show that the same lower bound applies to a parenthesis matching problem, again matching the previously known upper bound. We also give reductions to show that similar lower bounds hold for the prefix maxima and the range maxima problem
AbstractAn O(log log m) time n log mlog log m-processor CRCW-PRAM algorithm for the string prefix-ma...
AbstractAn O(logn log log n) CRCW PRAM algorithm using O(nlog n) processors for computing the unique...
We define a natural and realistic model of parallel computation called the PRAM model without bit op...
We show non-trivial lower bounds for several prefix problems in the CRCW PRAM model. Our main result...
AbstractWe establish non-trivial lower bounds for several prefix problems in the CRCW PRAM model. Th...
We show non-trivial lower bounds for several prefix problems in the CRCW PRAM model. Our main result...
AbstractThe first result presented in this paper is a lower bound of Ω(log n) for the computation ti...
AbstractBoppana (1989) proves a lower bound separating the PRIORITY and the COMMON PRAM models that ...
AbstractWe present a parallel prefix algorithm which uses (2(p + 1)p (p + 1) + 2)n − 1 arithmetic an...
AbstractWe present a parallel algorithm for the prefix sums problem which runs in timeO( logn/log lo...
The chaining problem is defined as follows. Given values a 1 ; :::; an ; a i = 0 or 1, 1 i n, comp...
AbstractWe show that any CRCW PRAM which recognizes k-cliques in n-node graphs in time T requires at...
The all nearest smaller values problem is defined as follows. Let A = (a 1 ; a 2 ; : : : ; an ) be n...
Conventional parallel sorting requires the $n$ input keys to be output in an array of size $n$, and ...
Parallel prefix computation is perhaps the most frequently used subroutine in parallel algorithms to...
AbstractAn O(log log m) time n log mlog log m-processor CRCW-PRAM algorithm for the string prefix-ma...
AbstractAn O(logn log log n) CRCW PRAM algorithm using O(nlog n) processors for computing the unique...
We define a natural and realistic model of parallel computation called the PRAM model without bit op...
We show non-trivial lower bounds for several prefix problems in the CRCW PRAM model. Our main result...
AbstractWe establish non-trivial lower bounds for several prefix problems in the CRCW PRAM model. Th...
We show non-trivial lower bounds for several prefix problems in the CRCW PRAM model. Our main result...
AbstractThe first result presented in this paper is a lower bound of Ω(log n) for the computation ti...
AbstractBoppana (1989) proves a lower bound separating the PRIORITY and the COMMON PRAM models that ...
AbstractWe present a parallel prefix algorithm which uses (2(p + 1)p (p + 1) + 2)n − 1 arithmetic an...
AbstractWe present a parallel algorithm for the prefix sums problem which runs in timeO( logn/log lo...
The chaining problem is defined as follows. Given values a 1 ; :::; an ; a i = 0 or 1, 1 i n, comp...
AbstractWe show that any CRCW PRAM which recognizes k-cliques in n-node graphs in time T requires at...
The all nearest smaller values problem is defined as follows. Let A = (a 1 ; a 2 ; : : : ; an ) be n...
Conventional parallel sorting requires the $n$ input keys to be output in an array of size $n$, and ...
Parallel prefix computation is perhaps the most frequently used subroutine in parallel algorithms to...
AbstractAn O(log log m) time n log mlog log m-processor CRCW-PRAM algorithm for the string prefix-ma...
AbstractAn O(logn log log n) CRCW PRAM algorithm using O(nlog n) processors for computing the unique...
We define a natural and realistic model of parallel computation called the PRAM model without bit op...