Asymptotic Properties of Solutions to Discrete Sturm-Liouville Monotone Type Equations

We investigate the discrete equations of the form $Δ (r_{n} Δ x_{n}) = a_{n} f (x_{σ (n)}) + b_{n} .$ \Delta \left( {{r_n}\Delta {x_n}} \right) = {a_n}f\left( {{x_{\sigma \left( n \right)}}} \right) + {b_n}. Using the Knaster-Tarski fixed point theorem, we study solutions with prescribed asymptotic behaviour. Our technique allows us to control the degree of approximation. In particular, we present the results concerning harmonic and geometric approximations of solutions.

eISSN:: 1338-9750
Langue:: Anglais

Périodicité:: 3 fois par an
Sujets de la revue:: Mathematics, General Mathematics

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Asymptotic Properties of Solutions to Discrete Sturm-Liouville Monotone Type Equations

Publié en ligne: 28 juin 2023

Pages: 35 - 44

Reçu: 14 nov. 2022

DOI: https://doi.org/10.2478/tmmp-2023-0014

Mots clésSturm-Liouville difference equation, prescribed asymptotic behaviour, convergent solution, asymptotically periodic solution, degree of approximation

© 2023 Janusz Migda et al., published by Sciendo

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Mots clés
Sturm-Liouville difference equation, prescribed asymptotic behaviour, convergent solution, asymptotically periodic solution, degree of approximation