In past years mathematical models of natural occurrences were either entirely continuous or discrete. These models worked well for continuous behavior such as population growth and biological phenomena, and for discrete behavior such as applications of Newton\u27s method and discretization of partial differential equations. However, these models are deficient when the behavior is sometimes continuous and sometimes discrete. The existence of both continuous and discrete behavior created the need for a different type of model. This is the concept behind dynamic equations on time scales. For example, dynamic equations can model insect populations that are continuous while in season, die out in, say, winter, while their eggs are incubating or d...
Difference equations and differential equations have been a focus of interest, because there is a ve...
Abstract. First we are concerned with properties of an exponential function for a dynamic equation o...
ABSTRACT. In this paper, we study the oscillation of second-order nonlinear perturbed delay dynamic ...
In past years mathematical models of natural occurrences were either entirely continuous or discrete...
In past years mathematical models of natural occurrences were either entirely continuous or discrete...
By means of Riccati transformation techniques, we establish some oscillation criteria for a second o...
The model given purely by differential equations works well for continuous behavior such as populati...
The theory of dynamic equations on time scales provides an important bridge between the fields of di...
AbstractThe study of dynamic equations on time scales has been created in order to unify the study o...
Until recently, mathematical models of natural occurrences were either exclusively continuous or dis...
During the past years, there has been an increasing interest in studying oscillation and nonoscillat...
The study of dynamic equations on time scales, which goes back to its founder Stefan Hilger (1988), ...
AbstractInterval oscillation criteria are established for a second-order nonlinear dynamic equation ...
AbstractThe study of dynamic equations on time scales, which goes back to its founder Stefan Hilger ...
The theory of time scales was introduced by Stefan Hilger in his 1988 PhD dissertation, [18]. The st...
Difference equations and differential equations have been a focus of interest, because there is a ve...
Abstract. First we are concerned with properties of an exponential function for a dynamic equation o...
ABSTRACT. In this paper, we study the oscillation of second-order nonlinear perturbed delay dynamic ...
In past years mathematical models of natural occurrences were either entirely continuous or discrete...
In past years mathematical models of natural occurrences were either entirely continuous or discrete...
By means of Riccati transformation techniques, we establish some oscillation criteria for a second o...
The model given purely by differential equations works well for continuous behavior such as populati...
The theory of dynamic equations on time scales provides an important bridge between the fields of di...
AbstractThe study of dynamic equations on time scales has been created in order to unify the study o...
Until recently, mathematical models of natural occurrences were either exclusively continuous or dis...
During the past years, there has been an increasing interest in studying oscillation and nonoscillat...
The study of dynamic equations on time scales, which goes back to its founder Stefan Hilger (1988), ...
AbstractInterval oscillation criteria are established for a second-order nonlinear dynamic equation ...
AbstractThe study of dynamic equations on time scales, which goes back to its founder Stefan Hilger ...
The theory of time scales was introduced by Stefan Hilger in his 1988 PhD dissertation, [18]. The st...
Difference equations and differential equations have been a focus of interest, because there is a ve...
Abstract. First we are concerned with properties of an exponential function for a dynamic equation o...
ABSTRACT. In this paper, we study the oscillation of second-order nonlinear perturbed delay dynamic ...