English

Existence Result for Difference Equations on Non-Uniform Grids via Upper and Lower Solution Method

General Mathematics 2025-08-08 v1

Abstract

This paper establishes an existence theory for discrete second-order boundary value problems on non-uniform time grids using the upper and lower solution method. We consider difference equations of the form uΔΔ(ti1)+f(ti,u(ti),uΔ(ti1))=0u^{\Delta\Delta}(t_{i-1}) + f(t_i, u(t_i), u^\Delta(t_{i-1})) = 0 on a non-uniform time grid t0,t1,,tn+2{t_0, t_1, \ldots, t_{n+2}} with mixed boundary conditions uΔ(t0)=0u^\Delta(t_0) = 0 and u(tn+2)=g(tn+2)u(t_{n+2}) = g(t_{n+2}). This extends previous work on homogeneous boundary conditions to the non-homogeneous case, requiring a sophisticated functional analytic framework to handle the resulting affine function spaces. Our approach employs a decomposition strategy that separates boundary effects from the differential structure, enabling the application of Brouwer's Fixed Point Theorem to establish existence with solutions bounded between upper and lower functions.

Keywords

Cite

@article{arxiv.2508.04706,
  title  = {Existence Result for Difference Equations on Non-Uniform Grids via Upper and Lower Solution Method},
  author = {Shalmali Bandyopadhyay and Kimser Lor},
  journal= {arXiv preprint arXiv:2508.04706},
  year   = {2025}
}
R2 v1 2026-07-01T04:37:51.132Z