An efficient reverse converter for the 4-moduli set [2/sup n/ - 1, 2/sup n, 2/sup n + 1, 2/sup 2n/ + 1] based on the new chinese remainder theorem
From MaRDI portal
Publication:5349706
DOI10.1109/TCSI.2003.817789zbMath1368.68019OpenAlexW2080580079MaRDI QIDQ5349706
Chip-Hong Chang, Thambipillai Srikanthan, Bin Cao
Publication date: 25 August 2017
Published in: IEEE Transactions on Circuits and Systems I: Fundamental Theory and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1109/tcsi.2003.817789
Mathematical problems of computer architecture (68M07) Numerical algorithms for computer arithmetic, etc. (65Y04)
Related Items (6)
Design of reverse converters for a new flexible RNS five-moduli set \(\{ 2^k, 2^n-1, 2^n+1, 2^{n+1}-1, 2^{n-1}-1 \}\) (\(n\) even) ⋮ A new high dynamic range moduli set with efficient reverse converter ⋮ An efficient design of residue to binary converter for four moduli set \((2^{n}-1,2^n + 1,2^{2n}-2,2^{2n+1}-3)\) based on New CRT II ⋮ Hierarchical residue number systems with small moduli and simple converters ⋮ Efficient reverse converters for 4-moduli sets \(\{2^{2n-1}-1, 2^n,2^n+1,2^n-1\}\) and \(\{2^{2n-1},2^{2n-1}-1, 2^n+1,2^n-1\}\) based on CRTs algorithm ⋮ Reverse converters for the moduli set \(\{2^n, 2^{n-1}-1,2^{n}-1, 2^{n+1}-1\}\) (\(n\) even)
This page was built for publication: An efficient reverse converter for the 4-moduli set [2/sup n/ - 1, 2/sup n, 2/sup n + 1, 2/sup 2n/ + 1] based on the new chinese remainder theorem
