POSITIVE SOLUTIONS TO SINGULAR HIGHER ORDER BOUNDARY VALUE PROBLEMS ON PURELY DISCRETE TIME SCALES

TitlePOSITIVE SOLUTIONS TO SINGULAR HIGHER ORDER BOUNDARY VALUE PROBLEMS ON PURELY DISCRETE TIME SCALES
Publication TypeJournal Article
Year of Publication2015
AuthorsKUNKEL, CURTIS, MARTIN, ASHLEY
Volume19
Issue4
Start Page553
Pagination12
Date Published2015
ISSN1083-2564
AMS34B16, 34B18, 39A10
Abstract

We study singular discrete higher order boundary value problems with mixed boundary conditions of the form $${ u^{∆^n} (t_{i−(n−1)}) + f(t_i , u(t_i), . . . , u^{∆^{n−1}} (t_{i−(n−1)})) = 0,}$$  $${ u^{∆^{n−1}} (t_0) = u^{∆^{n−2}} (t_{N+1}) = u^{∆^{n−3}} (t_{N+2}) = · · · = u^∆(t_{N+n−2}) = u(t_{N+n−1}) = 0, }$$ over a finite discrete interval ${ \mathbb{T} = {t_0, t_1, . . ., t_{N+n−2}, t_{N+n−1}}.}$ We prove the existence of a positive solution by means of the lower and upper solutions method and the Brouwer fixed point theorem in conjunction with perturbation methods to approximate regular problems.

 

URLhttp://www.acadsol.eu/en/articles/19/4/7.pdf
Refereed DesignationRefereed
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