Add to ORKGWe examine the randomness properties of the sequences generated by the multivariate polynomial iterations method proposed by Ostafe and Shparlinski, by using the six different choices of polynomials given by the same authors. Our analysis is based on two approaches: distributions of the periods and linear complexities of the produced vector sequences. We define the efficiency parameters, PE for “period efficiency” and LCE for “linear complexity efficiency”, so that the actual values of the period and linear complexity of a sequence can be easily compared with those of the ideal cases. For each polynomial choice, in order to obtain the period distribution of the generated vector sequences, we perform an exhaustive search for prime field sizes up ...
This paper proposes a new approach for generating pseudo random multi-valued (including binary-value...
AbstractA new version of Graeffe's algorithm for finding all the roots of univariate complex polynom...
A new version of the Graeffe algorithm for finding all the roots of univariate complex polynomials i...
A method is presented for generating random numbers with uniform distribution using linear recurrenc...
The goal of this talk is to present the state-of-the-art construction of pseudorandom number generat...
Solving systems of polynomial equations over finite fields is a fundamental problem in several areas...
Real polynomials have very often very few real roots, and when algorithms depend on the number of re...
A method is presented for generating random numbers with uniform distribution using linear recurren...
It is crucial in pseudorandomness cryptographic applications that the smaller key used as a seed can...
We present several generalisations of the Games–Chan algorithm. For a fixed monic irreducible polyno...
AbstractWe bound exponential sums along the orbits of essentially arbitrary multivariate polynomial ...
In recent years, many probabilistic algorithms (i.e., algorithms that can toss coins) that run in po...
This paper proposes a new approach for generating pseudo random multi-valued (including binary-value...
Flip a coin to select a random polynomial over F2. The sequence HTHHHTH, for example, corresponds to...
This paper proposes a new approach for generating pseudo random multi-valued (including binary-value...
This paper proposes a new approach for generating pseudo random multi-valued (including binary-value...
AbstractA new version of Graeffe's algorithm for finding all the roots of univariate complex polynom...
A new version of the Graeffe algorithm for finding all the roots of univariate complex polynomials i...
A method is presented for generating random numbers with uniform distribution using linear recurrenc...
The goal of this talk is to present the state-of-the-art construction of pseudorandom number generat...
Solving systems of polynomial equations over finite fields is a fundamental problem in several areas...
Real polynomials have very often very few real roots, and when algorithms depend on the number of re...
A method is presented for generating random numbers with uniform distribution using linear recurren...
It is crucial in pseudorandomness cryptographic applications that the smaller key used as a seed can...
We present several generalisations of the Games–Chan algorithm. For a fixed monic irreducible polyno...
AbstractWe bound exponential sums along the orbits of essentially arbitrary multivariate polynomial ...
In recent years, many probabilistic algorithms (i.e., algorithms that can toss coins) that run in po...
This paper proposes a new approach for generating pseudo random multi-valued (including binary-value...
Flip a coin to select a random polynomial over F2. The sequence HTHHHTH, for example, corresponds to...
This paper proposes a new approach for generating pseudo random multi-valued (including binary-value...
This paper proposes a new approach for generating pseudo random multi-valued (including binary-value...
AbstractA new version of Graeffe's algorithm for finding all the roots of univariate complex polynom...
A new version of the Graeffe algorithm for finding all the roots of univariate complex polynomials i...