Study of error control capability for the new moduli set \({2^{2n+1}+2^{n}-1, 2^{2n+1}-1, 2^{n}-1, 2^{3n},2^{3n+1}-1}\)

In this paper, a new 3-moduli set {2 2n+1 +2 n -1, 2 2n+1 -1, 2 n -1} with an efficient residue-to-binary converter using mixed radix conversion algorithm is presented. Moreover, by adding two redundant modulus {2 3n , 2 3n+1 -1}, a new moduli set in redundant residue number system is provided that can correct up to (2n+2) error bits. Simulation results of the error control algorithm's functionality with C++ programming language for 10'000 different error bits states show that the average percent of error detection capability using the proposed moduli set by setting n=2 is equal to 77.97%.