On the affine-periodic solutions of discrete dynamical systems
Document Type
Article
Publication Date
1-1-2018
Abstract
Affine periodicity is a generalization of the notion of conventional periodicity and it is a symmetry property for classes of functions. This study is concerned with the existence of (Q; T) -affine periodic solutions of discrete dynamical systems. Sufficient conditions for the main results are proposed due to discrete exponential dichotomy and fixed point theory. Obtained results are also implemented for some economical and biological models. In particular cases, our results cover some existing results in the literature for periodic, antiperiodic, or quasiperiodic solutions of difference equations.
Recommended Citation
Koyuncuo?lu, Halis Can and Adivar, Murat, "On the affine-periodic solutions of discrete dynamical systems" (2018). College of Business and Economics. 343.
https://digitalcommons.uncfsu.edu/college_business_economics/343