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Mathematics of Computation
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Calculation of fibonacci polynomials for gfsr sequences with low discrepancies

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Abstract

Fibonacci polynomials are defined in the context of the two-dimensional discrepancy of Tausworthe pseudorandom sequences as an analogue to Fibonacci numbers, which give the best figure of merit for the two-dimensional discrepancy of linear congruential sequences. We conduct an exhaustive search for the Fibonacci polynomials of degree less than 32 whose associated Tausworthe sequences can be easily implemented and very quickly generated. © 1993 American Mathematical Society.

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Mathematics of Computation

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