Construction of inversive congruential pseudorandom number generators with maximal period length
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Publication:1196875
DOI10.1016/0377-0427(92)90190-9zbMath0761.65001OpenAlexW2057648941MaRDI QIDQ1196875
Publication date: 16 January 1993
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0377-0427(92)90190-9
Random number generation in numerical analysis (65C10) Pseudo-random numbers; Monte Carlo methods (11K45)
Related Items (7)
The lattice structure of nonlinear congruential pseudorandom numbers ⋮ A brief and understandable guide to pseudo-random number generators and specific models for security ⋮ A search for good pseudo-random number generators: survey and empirical studies ⋮ On the autocorrelation structure of inversive congruential pseudorandom number sequences ⋮ A remark on the discrepancy of quadratic congruential pseudorandom numbers ⋮ Statistical Independence of a New Class of Inversive Congruential Pseudorandom Numbers ⋮ On the discrepancy of inversive congruential pseudorandom numbers with prime power modulus. II
Cites Work
- Unnamed Item
- On the discrepancy of inversive congruential pseudorandom numbers with prime power modulus
- On the discrepancy of quadratic congruential pseudorandom numbers
- On the lattice structure of a nonlinear generator with modulus \(2^{\alpha}\)
- On the period length of congruential pseudorandom number sequences generated by inversions
- On the structure of quadratic congruential sequences
- A multiple recursive nonlinear congruential pseudo random number generator
- Statistical independence of nonlinear congruential pseudorandom numbers
- Marsaglia's lattice test and non-linear congruential pseudo-random number generators
- Remarks on nonlinear congruential pseudorandom numbers
- Recent trends in random number and random vector generation
- Regularities in congruential random number generators
- Inversive Congruential Pseudorandom Numbers Avoid the Planes
- A Nonlinear Congruential Pseudorandom Number Generator with Power of Two Modulus
- Lower Bounds for the Discrepancy of Inversive Congruential Pseudorandom Numbers
- The Serial Test for Congruential Pseudorandom Numbers Generated by Inversions
- Lower Bounds for the Discrepancy of Inversive Congruential Pseudorandom Numbers with Power of Two Modulus
- RANDOM NUMBERS FALL MAINLY IN THE PLANES
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