M. C. Pike
Supplemental Material
Available for Download
pseudo-random numbers
- 1 BEHRENZ, P. G. Algorithm 133, Random. Comm. ACM 5 (Nov. 1962), 553. Google Scholar
Digital Library
- 2 COVEYOU, R. R. Serial correlation in the generation of Pseudorandom numbers. J. ACM 7(1960), 72-74. Google ScholarDigital Library
- 3 GREENBERGER, M. An a priori determination of serial correlation in computer generated random numbers. Math. Comput. 15 (1961), 383-389. correlation in Math. Comput 16(1962), 126.Google ScholarCross Ref
- 4 KENDALL, M. G., AND BABINGTON SMITH, B. Randomness and random sampling numbers. J. Royal Statist. Soc. 101 (1938), 147-166.Google ScholarCross Ref
Index Terms
- Algorithm 266: pseudo-random numbers [G5]
Recommendations
A new class of pseudo-random sequences from Mersenne numbers
A new class of pseudo random sequences is proposed that can be constructed from modulo-2 (mod 2) operations of two different maximal length sequences (m-sequences) where the period of the input sequences are Mersenne numbers. It is shown that the output ...
Centroid Ratio for a Pairwise Random Swap Clustering Algorithm
Clustering algorithm and cluster validity are two highly correlated parts in cluster analysis. In this paper, a novel idea for cluster validity and a clustering algorithm based on the validity index are introduced. A Centroid Ratio is firstly introduced ...
Pseudo-Random Number Generator Based on Binary and Quinary Maximal-Length Sequences
A new pseudo-random generator for decimal numbers is presented. A sequence of decimal digits is obtained by combining a binary and a quinary maximal-length sequence generated by feedback shift-register circuits. The autocorrelation sequence (ACS) of the ...
Comments