In this thesis, the dynamical system is used as a function on afinite group, to show how states change. We investigate the'numberof cycles' and 'length of cycle' under finite groups. Using grouptheory, fixed point, periodic points and some examples, formulas tofind 'number of cycles' and 'length of cycle' are derived. Theexamples used are on finite cyclic group Z_6 with respectto binary operation '+'. Generalization using finite groups ismade. At the end, I compared the dynamical system over finite cyclic groups with the finite non-cyclic groups and then prove the general formulas to find 'number of cycles' and 'length of cycle' for both cyclic and non-cyclic groups
We say that a finite asynchronous cellular automaton (or more generally, any sequential dynamical sy...
The investigation of local bifurcations of the codimensionality 1 and 2 in families of ordinary diff...
This document formulates and solves a number of problems associated with reachability for polynomial...
Aiming at a better understanding of finite groups as finite dynamical systems, we show that by a ver...
AbstractWe study the principal dynamical aspects of the cyclic automata on finite graphs.We give bou...
We study the principal dynamical aspects of the cyclic automata on finite graphs. We give bounds in ...
Iteration of an endofunction f on a finite set X defines cycles of f. To a given set L of lengths an...
We describe the functional graph of the multiplication-by-$n$ map in a cycle group and use this to o...
AbstractWe study and develop a very new object introduced by V.I. Arnold: a monad is a triple consis...
AbstractWe study the dynamics of the evolution of Ducci sequences and the Martin–Odlyzko–Wolfram cel...
This paper surveys some recent and classical investigations of geometric progressions of residues th...
AbstractLet K be the two-dimensional grid. Let q be an integer greater than 1 and let Q={0,…,q−1}. L...
Let K be the two-dimensional grid. Let q be an integer greater than 1 and let Q={0;:::;q−1}. Let s: ...
In this article, we present a coherent, though not exhaustive, account of some well-known and some r...
Polynomial algebraic techniques have always played a central role in linear systems theory and also ...
We say that a finite asynchronous cellular automaton (or more generally, any sequential dynamical sy...
The investigation of local bifurcations of the codimensionality 1 and 2 in families of ordinary diff...
This document formulates and solves a number of problems associated with reachability for polynomial...
Aiming at a better understanding of finite groups as finite dynamical systems, we show that by a ver...
AbstractWe study the principal dynamical aspects of the cyclic automata on finite graphs.We give bou...
We study the principal dynamical aspects of the cyclic automata on finite graphs. We give bounds in ...
Iteration of an endofunction f on a finite set X defines cycles of f. To a given set L of lengths an...
We describe the functional graph of the multiplication-by-$n$ map in a cycle group and use this to o...
AbstractWe study and develop a very new object introduced by V.I. Arnold: a monad is a triple consis...
AbstractWe study the dynamics of the evolution of Ducci sequences and the Martin–Odlyzko–Wolfram cel...
This paper surveys some recent and classical investigations of geometric progressions of residues th...
AbstractLet K be the two-dimensional grid. Let q be an integer greater than 1 and let Q={0,…,q−1}. L...
Let K be the two-dimensional grid. Let q be an integer greater than 1 and let Q={0;:::;q−1}. Let s: ...
In this article, we present a coherent, though not exhaustive, account of some well-known and some r...
Polynomial algebraic techniques have always played a central role in linear systems theory and also ...
We say that a finite asynchronous cellular automaton (or more generally, any sequential dynamical sy...
The investigation of local bifurcations of the codimensionality 1 and 2 in families of ordinary diff...
This document formulates and solves a number of problems associated with reachability for polynomial...