Comparison Theorem for Oscillation of Nonlinear Delay Partial Difference Equations

Guanghui LIU, Youwu GAO

Abstract


In this paper,we consider certain nonlinear partial difference equations
$${(aA_{m+1,n}+bA_{m,n+1}+cA_{m,n})}^k-{(dA_{m,n})}^k+\sum\limits_{i=1}^{u} p_{i}(m,n)A^k_{m-\sigma_{i},n-\tau_{i}}=0 $$
where $a,b,c,d \in(0,\infty )$, $d>c$, $k=q/p$, p, q are positive odd integers, $u$ is a positive integer, $p_{i}(m,n), (i=0,1,2,\cdots u)$ are positive real sequences. $\sigma_i,\tau_i\in N_{0}=\{1,2,\cdots \}, i=1,2,\cdots,u$. A new comparison theorem for oscillation of the above equation is obtained.

Keywords


Nonlinear partial difference equations; Comparison theorem; Eventually positive solutions

Full Text:

PDF


DOI: http://dx.doi.org/10.3968/j.pam.1925252820130501.266

DOI (PDF): http://dx.doi.org/10.3968/g3489

Refbacks

  • There are currently no refbacks.


Copyright (c)




Share us to:   


Reminder

If you have already registered in Journal A and plan to submit article(s) to Journal B, please click the "CATEGORIES", or "JOURNALS A-Z" on the right side of the "HOME".


We only use the follwoing mailboxes to deal with issues about paper acceptance, payment and submission of electronic versions of our journals to databases:
pam@cscanada.org
pam@cscanada.net

 Articles published in Progress in Applied Mathematics are licensed under Creative Commons Attribution 4.0 (CC-BY).

 ROGRESS IN APPLIED MATHEMATICS Editorial Office

Address: 1055 Rue Lucien-L'Allier, Unit #772, Montreal, QC H3G 3C4, Canada.

Telephone: 1-514-558 6138
Http://www.cscanada.net
Http://www.cscanada.org
E-mail:office@cscanada.net office@cscanada.org caooc@hotmail.com

Copyright © 2010 Canadian Research & Development Center of Sciences and Cultures