Title :
An Extended Euclid Algorithm for Rational Reconstruction
Author :
Yang, Jun-jian ; Wang, Yun
Author_Institution :
Sch. of Math. & Stat., Hainan Normal Univ., Haikou, China
Abstract :
Let n/d∈Q,m be a positive integer and Let u=n/d mod m. Thus u is the image of a rational number modulo m. The rational reconstruction problem is: given u and m find n/d. Classical Euclidean Algorithm outputs n/d when m>;2M2, where M=max(|n|,d). The rational reconstruction problem was generally solved by classical Euclidean algorithm. In this paper, we achieve an Extended Euclidean algorithm for rational, and obtain an solvability criterion, hence, the number of solutions. Its Computational complexity is O(mlog2mloglogm).
Keywords :
computability; computational complexity; rational functions; classical Euclidean algorithm; computational complexity; extended Euclidean algorithm; positive integer; rational function; rational reconstruction problem; solvability criterion; Silicon; Rational; implementate algorithm; senseour algorithm;
Conference_Titel :
Electrical & Electronics Engineering (EEESYM), 2012 IEEE Symposium on
Conference_Location :
Kuala Lumpur
Print_ISBN :
978-1-4673-2363-5
DOI :
10.1109/EEESym.2012.6258682
