AbstractUtilizing dynamic systems on time scales, the theory of monotone flows and fixed points is considered, which unifies the theory of continuous and discrete dynamic systems
Nonnegative and compartmental dynamical system models are widespread in biological, physiological, a...
Monotone systems are dynamical systems whose solutions preserve a partial order in initial condition...
The paper deals with Dichotomy, well conditioning of two-point boundary value problems on time scale...
AbstractUtilizing dynamic systems on time scales, the theory of monotone flows and fixed points is c...
AbstractBy using a notion of upper quasi-monotone nondecreasing, this paper presents a new compariso...
The model given purely by differential equations works well for continuous behavior such as populati...
International audienceThis survey article addresses the class of continuous-time systems where a sys...
The aim of this paper is to provide a brief review of the main results in the theory of discrete-tim...
Monotone systems constitute one of the most important classes of dynamical systems used in mathemati...
Dynamical systems are mathematical structures whose aim is to describe the evolution of an arbitrary...
We provide some properties for absolutely continuous functions in time scales. Then we consider a cl...
This chapter surveys a restricted but useful class of dynamical systems, namely, those enjoying a co...
Dynamic monopolies are investigated with discrete and continuous time scales by assuming general for...
Nonnegative and compartmental dynamical system models are widespread in biological, physiological, a...
The notions of mixed monotone decomposition of dynamical systems are introduced. The fundamental ide...
Nonnegative and compartmental dynamical system models are widespread in biological, physiological, a...
Monotone systems are dynamical systems whose solutions preserve a partial order in initial condition...
The paper deals with Dichotomy, well conditioning of two-point boundary value problems on time scale...
AbstractUtilizing dynamic systems on time scales, the theory of monotone flows and fixed points is c...
AbstractBy using a notion of upper quasi-monotone nondecreasing, this paper presents a new compariso...
The model given purely by differential equations works well for continuous behavior such as populati...
International audienceThis survey article addresses the class of continuous-time systems where a sys...
The aim of this paper is to provide a brief review of the main results in the theory of discrete-tim...
Monotone systems constitute one of the most important classes of dynamical systems used in mathemati...
Dynamical systems are mathematical structures whose aim is to describe the evolution of an arbitrary...
We provide some properties for absolutely continuous functions in time scales. Then we consider a cl...
This chapter surveys a restricted but useful class of dynamical systems, namely, those enjoying a co...
Dynamic monopolies are investigated with discrete and continuous time scales by assuming general for...
Nonnegative and compartmental dynamical system models are widespread in biological, physiological, a...
The notions of mixed monotone decomposition of dynamical systems are introduced. The fundamental ide...
Nonnegative and compartmental dynamical system models are widespread in biological, physiological, a...
Monotone systems are dynamical systems whose solutions preserve a partial order in initial condition...
The paper deals with Dichotomy, well conditioning of two-point boundary value problems on time scale...