Holomorphic solutions of some functional equations related to nonlinear second orderq-difference equations which has only one characteristic value
DOI10.1080/10236198.2020.1822351zbMath1472.39045OpenAlexW3097910173MaRDI QIDQ4963890
Publication date: 24 February 2021
Published in: Journal of Difference Equations and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/10236198.2020.1822351
difference equationsfunctional equations\(q\)-difference equationsfixed point theoremgeneral solutionsanalytic solutions
Difference equations, scaling ((q)-differences) (39A13) Functional equations for complex functions (39B32) Difference equations in the complex domain (39A45)
Cites Work
- Unnamed Item
- Unnamed Item
- New existence results for nonlinear fractional differential equations with three-point integral boundary conditions
- An example of nonlinear \(q\)-difference equation
- Analytic general solutions of nonlinear difference equations
- About the growth of entire functions solutions of linear algebraic \(q\)- difference equations
- Meromorphic solutions of some functional equations
- Holomorphic solutions of some system of \(n\) functional equations with \(n\) variables related to difference systems
- Growth of meromorphic solutions of some functional equations I
- Existence of solutions for nonlinear second-order \(q\)-difference equations with first-order \(q\)-derivatives
- Existence of positive solutions for two-point boundary value problems of nonlinear fractional \(q\)-difference equation
- Holomorphic solutions of a functional equation and their applications to nonlinear second order difference equations
- Analytic solutions of a nonlinear two variables difference system whose eigenvalues are both 1
- Holomorphic solutions of some functional equations III
- ON EXISTENCE OF SOLUTIONS FOR NONLINEAR Q-DIFFERENCE EQUATIONS WITH NONLOCAL Q-INTEGRAL BOUNDARY CONDITIONS
This page was built for publication: Holomorphic solutions of some functional equations related to nonlinear second orderq-difference equations which has only one characteristic value
