Notes on Irregular Singular Points of Wronskian and Second-Order Linear Differential Equations
DOI:
https://doi.org/10.15381/pesquimat.v25i2.20942Keywords:
analytic functions, singular points, wronskianAbstract
We present a classification of irregular singular points and infinity of second-order linear differential equations; Furthermore, we show some Wronskian results of the solutions and their derivatives for those equations. We use the bibliographic reference of Butkov and Krantz for the development of the theoretical framework, Sabbah focuses the case on complex manifolds and Scardua-León on second and third order differential equations. To achieve the results we repeatedly use the inductive-deductive method and the handling of the indices for the series.
Downloads
Published
Issue
Section
License
Copyright (c) 2022 Jos´e Luis Condori Condori
This work is licensed under a Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International License.
THE AUTHORS RETAIN THEIR RIGHTS:
a) The authors retain their trademark and patent rights, and also on any process or procedure described in the article.
b) The authors retain the right to share, copy, distribute, execute and publicly communicate the article published in Pesquimat magazine (for example, place it in an institutional repository or publish it in a book), with recognition of its initial publication in the Pesquimat magazine.
c) The authors retain the right to make a later publication of their work, to use the article or any part of it (for example: a compilation of their works, notes for conferences, thesis, or for a book), provided that they indicate the source of publication (authors of the work, magazine, volume, number and date).
