Sequences of maps and convergence properties of first-order difference equations with variable coefficients

• Published in: Journal of difference equations and applications Vol. 23; no. 4; pp. 779 - 798
• Main Authors: Huang, Ying Sue, Knopf, Peter M.
• Format: Journal Article
• Language: English
• Published: Abingdon Taylor & Francis 03.04.2017; Taylor & Francis Ltd
• Subjects: Continuity (mathematics); Convergence; Difference equations; Iterative methods; Mathematical analysis; Nonlinear programming; Properties (attributes); Sequences; variable coefficients
• ISSN: 1023-6198; 1563-5120
• DOI: 10.1080/10236198.2017.1282952

We consider sequences of continuous functions on that converge to a continuous monotone limit function. We prove a convergence theorem for the iterative map This result is used to solve an open problem in the field concerning the convergence properties of first-order rational difference equations that are linear in numerator and denominator with variable coefficients. We also establish convergence properties for a certain class of systems of first-order difference equations.