We consider the dynamical system (A,T), where A is a class of differentiable real functions defined on some interval and T:A→A is an operator Tφ:= foφ, where f is a function on the real line. In this work we introduce and develop some techniques of symbolic dynamics for the dynamical system (A,T). We analyze in detail the case in which T arises from a differentiable m-modal map f. In this case we obtain a combinatorial description of the orbits of (A,T) which depends on the combinatorial description of the orbits of one dimensional dynamical system induced by f on the interval
AbstractWe study the number of periodic points in symbolic dynamical systems; we prove the following...
We present a deterministic discrete dynamical system, which is used to produce and classify a variet...
We discuss implicit systems of ordinary linear differential equations with (time-) variable coeffici...
We consider the dynamical system A, T , where A is a class of differentiable functions defined on s...
We consider the discrete dynamical system (A,T), where A is a class of smooth real functions defined...
We consider the dynamical system (A,T), where A is a class of differentiable functions defined on so...
We consider dynamical systems defined by a particular class of differentiable functions, as fixed st...
We consider the dynamical system (A,Tf), where A is a class of differentiable real functions defined...
Dynamics is a branch of mathematics that studies how systems change with time, and this can be done ...
We consider the dynamical system (, Tf), where is a class of differential rea...
In this paper we introduce the idea of multiple valued iteration theory. For a set X and family of f...
We consider dynamical systems defined by a particular class of differentiable functions, as fixed state...
We consider a linear hyperbolic system with constant coe cients with nonlinear boundary conditions a...
A discrete dynamical system on a metric space M is a sequence (fn) of iterations of a function f: M!...
Iterations of odd piecewise continuous maps with two discontinuities, i.e., symmetric discontinuous ...
AbstractWe study the number of periodic points in symbolic dynamical systems; we prove the following...
We present a deterministic discrete dynamical system, which is used to produce and classify a variet...
We discuss implicit systems of ordinary linear differential equations with (time-) variable coeffici...
We consider the dynamical system A, T , where A is a class of differentiable functions defined on s...
We consider the discrete dynamical system (A,T), where A is a class of smooth real functions defined...
We consider the dynamical system (A,T), where A is a class of differentiable functions defined on so...
We consider dynamical systems defined by a particular class of differentiable functions, as fixed st...
We consider the dynamical system (A,Tf), where A is a class of differentiable real functions defined...
Dynamics is a branch of mathematics that studies how systems change with time, and this can be done ...
We consider the dynamical system (, Tf), where is a class of differential rea...
In this paper we introduce the idea of multiple valued iteration theory. For a set X and family of f...
We consider dynamical systems defined by a particular class of differentiable functions, as fixed state...
We consider a linear hyperbolic system with constant coe cients with nonlinear boundary conditions a...
A discrete dynamical system on a metric space M is a sequence (fn) of iterations of a function f: M!...
Iterations of odd piecewise continuous maps with two discontinuities, i.e., symmetric discontinuous ...
AbstractWe study the number of periodic points in symbolic dynamical systems; we prove the following...
We present a deterministic discrete dynamical system, which is used to produce and classify a variet...
We discuss implicit systems of ordinary linear differential equations with (time-) variable coeffici...