Analysis of Additive Random Number Generators.

Abstract

This thesis presents an analysis of the distribution of residues generated by the kth power-order linear homogeneous recurrence y(n+k)=a(k-1)y(n+k-1)+ ... + a(0)y(n) mod p to the power alpha when x to the kth power - a(k-1) x to the (k-1) power - ... - a(0) is a primitive polynomial in z(p)(x). It is shown that for t < or = k the tuples of t consecutive residues are equidistributed in t dimensions in the limit as alpha goes to infinity, subject only to a much weaker condition on the distribution of the residues. When specialized to the absolute value of a(j) < or = 1, the recurrence is the basis, for a computer random number generator which can be efficiently implemented directly in floating-point arithmetic with no multiplication and little machine dependence. The results of empirical tests comparing generators of this type with standard linear congruential generators are also presented. (Author)

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Document Details

Document Type
Technical Report
Publication Date
Mar 01, 1977
Accession Number
ADA045652

Entities

People

  • John Fredrick Reiser

Organizations

  • Stanford University

Tags

Communities of Interest

  • Energy and Power Technologies

DTIC Thesaurus Topics

  • Additives (Chemicals)
  • Arithmetic
  • Computations
  • Computer Science
  • Computers
  • Corporations
  • Floating Point Operations
  • Military Research
  • Notation
  • Number Theory
  • Numbers
  • Numerical Analysis
  • Random Number Generators
  • Standards
  • Three Dimensional
  • Two Dimensional
  • United States

Fields of Study

  • Mathematics

Readers

  • Analytical Mechanics
  • Computer Programming and Software Development.
  • Graph Algorithms and Convex Optimization.