On the extension of analytic solutions of a class of first-order q-difference equations
Abstract
In this paper, we use the Banach fixed point theorem to examine the existence of meromorphic solutions to the following first-order q-difference equation aligndagger y(qz)=a1(z)y(z)+a2(z)y(z)2+…+ap(z)y(z)p1+b1(z)y(z)+·s +bt(z)y(z)t, align where q∈ C, a1(z), …, ap(z); b1(z), …, bt(z) are all meromorphic functions. We establish sufficient conditions ensuring the existence and uniqueness of meromorphic solutions that can be extended to the entire complex plane C. More precisely, we have the following result. If | q |≥ 3 and \[|a1(z)| = 1 j p |aj(z)| 1|z|, 1 k t |bk(z)| 1|z|, z ∈ \\, |(z)| > 0 \,\, \] and y(0) ∞, then we prove that~dagger admits a unique meromorphic solution in D(), which can be extended meromorphically to C. Moreover, if a1(z) 0, the conclusion still holds. Furthermore, if | q |≥ 6 and gather* |a1(z)| 1|q|, |aj(z)| |q||z| (2 j p), |bk(z)| |q||z| (1 k t), \\[4pt] z ∈ D(,σ) = \\, z : |(z)| ,\; |(z)| σ, \,\, >0,\,\, σ>0 \,\, gather* and y(0) ∞, then we prove that dagger admits a unique meromorphic solution in D(, σ), which can also be extended meromorphically to C. This conclusion remains valid in the case where a1(z) 0.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.