[1] |
ErbeLH, ZhangBG. Oscillation of discrete analogues of delay equations. Differ Integral Equ. 1989;2:300‐309. · Zbl 0723.39004 |
[2] |
LadasG, PhilosCG, SficasYG. Sharp conditions for the oscillation of delay difference equations. J Appl Math Simul. 1989;2:101‐111. · Zbl 0685.39004 |
[3] |
PhilosCG. On oscillations of some difference equations. Funkc Ekvacioj. 1991;34:157‐172. · Zbl 0734.39004 |
[4] |
ZhangBG, TianCJ. Oscillation criteria for difference equations with unbounded delay. Comput Math Appl. 1998;35(4):19‐26. · Zbl 0907.39016 |
[5] |
ZhangBG, TianCJ. Nonexistence and existence of positive solutions for difference equations with unbounded delay. Comput Math Appl. 1998;36(1):1‐8. · Zbl 0932.39007 |
[6] |
YanW, MengQ, YanJ. Oscillation criteria for difference equation of variable delays. Dyn Contin Discret Impuls Syst Ser A Math Anal. 2006;13A:641‐647. Part 2, suppl. |
[7] |
BravermanE, KarpuzB. On oscillation of differential and difference equations with non‐monotone delays. Appl Math Comput. 2011;218(7):3880‐3887. · Zbl 1256.39013 |
[8] |
StavroulakisIP. Oscillation criteria for delay and difference equations with non‐monotone arguments. Appl Math Comput. 2014;226:661‐672. · Zbl 1354.34120 |
[9] |
ÖcalanÖ. An improved oscillation criterion for first order difference equations. Bulletin Mathé,matique de la Société des Sciences Mathématiques de Roumanie. 2016:65‐73. · Zbl 1363.39015 |
[10] |
ChatzarakisGE, JadlovskáI. Oscillations of deviating difference equations using an iterative method. Mediterr J Math. 2019;16(1):1‐20. · Zbl 1408.39009 |
[11] |
ChatzarakisGE, KoplatadzeR, StavroulakisIP. Oscillation criteria of first order linear difference equations with delay argument. Nonlinear Anal. 2008;68:994‐1005. · Zbl 1144.39003 |
[12] |
ChatzarakisGE, KoplatadzeR, StavroulakisIP. Optimal oscillation criteria for first order difference equations with delay argument. Pac J Math. 2008;235:15‐33. · Zbl 1153.39010 |
[13] |
ÖcalanÖ, ÖzkanUM, YldzM. Oscillation analysis for nonlinear difference equation with non‐monotone arguments. Adv Difference Equ, Paper. 2018;166:1‐11. · Zbl 1446.39013 |
[14] |
ÖcalanA, ÖcalanÖ, ÖzkanUM. Oscillatory behaviour for nonlinear delay difference equation with non‐monotone arguments. Dyn Syst Appl. 2021;31(1):53‐62. |
[15] |
BerezanskyL, BravermanE. On existence of positive solutions for linear difference equations with several delays. Adv Dyn Syst Appl. 2006;1:29‐47. · Zbl 1124.39002 |
[16] |
ChatzarakisGE, PaŝićM. Improved iterative oscillation tests in difference equations with several arguments. J Difference Equ Appl. 2019;25(1):64‐83. · Zbl 1407.39001 |
[17] |
ChatzarakisGE, GraceSR, JadlovskáI. Oscillation tests for linear difference equations with nonmonotone arguments. Tatra Mountains Math Publ. 2020;2020:1‐14. |
[18] |
ChenMP, YuJS. Oscillations of delay difference equations with variable coefficients. In: Inproceedings of the First International Conference on Difference Equations, Gordon and Breach London; 1994:105‐114. · Zbl 0860.39022 |
[19] |
GyöriI, LadasG. Oscillation Theory of Delay Differential Equations With Applications. Oxford: Clarendon Press; 1991. · Zbl 0780.34048 |
[20] |
JiangJC, TangXH. Oscillation of nonlinear delay difference equations. J Comput Appl Math. 2002;146:395‐404. · Zbl 1020.39006 |
[21] |
TangXH, YuJS. Oscillation of nonlinear delay difference equations. J Math Anal Appl. 2000;249:476‐490. · Zbl 0963.39021 |