|Title||CLASSIFICATION OF NONOSCILLATORY SOLUTIONS OF NONLINEAR DYNAMIC EQUATIONS ON TIME SCALES|
|Publication Type||Journal Article|
|Year of Publication||2016|
|Authors||ÖZTÜRK ÖZKAN, AKIN ELVAN|
|Journal||Dynamic Systems and Applications|
|AMS Subject Classification||39A10|
We study the asymptotic behavior of nonoscillatory solutions of nonlinear dynamic equations on time scales. More precisely, all eventually monotone solutions of nonlinear dynamic equations can be divided into several disjoint subsets by means of necessary and sufficient integral conditions. Examples are given to illustrate some of our main results.