A new part-metric-related inequality chain and an application
From MaRDI portal
Publication:936997
DOI10.1155/2008/193872zbMath1151.26316OpenAlexW2047428676WikidataQ58644446 ScholiaQ58644446MaRDI QIDQ936997
Fangkuan Sun, Xiaofan Yang, Yuan Yan Tang
Publication date: 20 August 2008
Published in: Discrete Dynamics in Nature and Society (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/129424
Lua error in Module:PublicationMSCList at line 37: attempt to index local 'msc_result' (a nil value).
Related Items (7)
On a generalized max-type difference equation from automatic control theory ⋮ A Prešić type contractive condition and its applications ⋮ Part-metric and its applications to cyclic discrete dynamic systems ⋮ Eventually constant solutions of a rational difference equation ⋮ On the global asymptotic stability of a second-order system of difference equations ⋮ On a conjecture for a higher-order rational difference equation ⋮ Stability of certain nonautonomous difference equations
Cites Work
- Global asymptotic stability and oscillation of a family of difference equations
- Global stability and asymptotics of some classes of rational difference equations
- The global attractivity of a higher order rational difference equation
- Global asymptotic stability in some discrete dynamical systems
- Positive nonlinear difference equations: Some results and applications.
- Existence of nontrivial solutions of a rational difference equation
- The global attractivity of the rational difference equation \(y_n = \frac{y_{n-k}+y_{n-m}}{1+y_{n-k}y_{n-m}}\)
- A part-metric-related inequality chain and application to the stability analysis of difference equation
- Global asymptotic stability in a class of generalized Putnam equations
- Global asymptotic stability in a class of Putnam-type equations
- On Certain Contraction Mappings in a Partially Ordered Vector Space
- Global asymptotic stability of a family of difference equations
This page was built for publication: A new part-metric-related inequality chain and an application
