COMPLEXITY OF PUISEUX SOLUTIONS OF DIFFERENTIAL AND q-DIFFERENCE EQUATIONS OF ORDER AND DEGREE ONE

J. Cano Torres; P. Fortuny Ayuso; J. Ribón

doi:10.5565/PUBLMAT6822401

Abstract

We relate the complexity of both differential and $q$ -difference equations of order one and degree one and their solutions. Our point of view is to show that if the solutions are complicated, the initial equation is complicated too. In this spirit, we bound from below an invariant of the differential or $q$ -difference equation, the height of its Newton polygon, in terms of the characteristic factors of a solution. The differential and the $q$ -difference cases are treated in a unified way.

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J. Cano Torres. P. Fortuny Ayuso. J. Ribón. "COMPLEXITY OF PUISEUX SOLUTIONS OF DIFFERENTIAL AND $q$ -DIFFERENCE EQUATIONS OF ORDER AND DEGREE ONE." Publ. Mat. 68 (2) 331 - 358, 2024. https://doi.org/10.5565/PUBLMAT6822401

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Received: 17 June 2022; Accepted: 24 May 2023; Published: 2024

First available in Project Euclid: 20 June 2024

Digital Object Identifier: 10.5565/PUBLMAT6822401

Subjects:

Primary: 32S65 , 34M35 , 39A13 , 39A45

Keywords: holomorphic foliation , Newton–Puiseux polygon , power series solution , q-difference equation

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