AbstractSelf-similarity properties of the coefficient patterns of the so-called m-Carlitz sequences of polynomials are considered. These properties are coded in an associated fractal set – the rescaled evolution set. We extend previous results on linear cellular automata with states in a finite field. Applications are given for the sequence of Legendre polynomials and sequences associated with the zero Bessel function
Jorgensen and Pedersen have proven that a certain fractal measure v has no infinite set of complex e...
AbstractWe study the dynamics of the evolution of Ducci sequences and the Martin–Odlyzko–Wolfram cel...
Jeffrey proposed a graphic representation of DNA sequences using Barnsley's iterative function syste...
AbstractSelf-similarity properties of the coefficient patterns of the so-called m-Carlitz sequences ...
Random multiplication of a given set of s polynomials with coefficients in a finite field following ...
AbstractSpace-time patterns of linear cellular automata are studied. Existence of the limit of a ser...
Random multiplication of a given set of s polynomials with coefficients in a finite field following ...
AbstractBy defining the mth graphical representation of a (U,r)-Carlitz sequence of polynomials, we ...
Abstract. We examine the behavior of the coefficients of powers of polynomials over a finite field o...
A new mathematical concept of abstract similarity is introduced and is illustrated in the space of i...
It is well-known that the spacetime diagrams of some cel-lular automata have a fractal structure: fo...
The study of cellular automata (CA) was motivated recently by their application to systems whose com...
The Chaos Game is an algorithm that can allow one to produce pictures of fractal structures. Conside...
AbstractWe first generalize the Schur congruence for Legendre polynomials to sequences of polynomial...
The use of Chaos Game Representation (CGR) or its generalization, Universal Sequence Maps (USM), to ...
Jorgensen and Pedersen have proven that a certain fractal measure v has no infinite set of complex e...
AbstractWe study the dynamics of the evolution of Ducci sequences and the Martin–Odlyzko–Wolfram cel...
Jeffrey proposed a graphic representation of DNA sequences using Barnsley's iterative function syste...
AbstractSelf-similarity properties of the coefficient patterns of the so-called m-Carlitz sequences ...
Random multiplication of a given set of s polynomials with coefficients in a finite field following ...
AbstractSpace-time patterns of linear cellular automata are studied. Existence of the limit of a ser...
Random multiplication of a given set of s polynomials with coefficients in a finite field following ...
AbstractBy defining the mth graphical representation of a (U,r)-Carlitz sequence of polynomials, we ...
Abstract. We examine the behavior of the coefficients of powers of polynomials over a finite field o...
A new mathematical concept of abstract similarity is introduced and is illustrated in the space of i...
It is well-known that the spacetime diagrams of some cel-lular automata have a fractal structure: fo...
The study of cellular automata (CA) was motivated recently by their application to systems whose com...
The Chaos Game is an algorithm that can allow one to produce pictures of fractal structures. Conside...
AbstractWe first generalize the Schur congruence for Legendre polynomials to sequences of polynomial...
The use of Chaos Game Representation (CGR) or its generalization, Universal Sequence Maps (USM), to ...
Jorgensen and Pedersen have proven that a certain fractal measure v has no infinite set of complex e...
AbstractWe study the dynamics of the evolution of Ducci sequences and the Martin–Odlyzko–Wolfram cel...
Jeffrey proposed a graphic representation of DNA sequences using Barnsley's iterative function syste...