FURTHER GENERALISATIONS OF THE KUMMER-SCHWARZ EQUATION: ALGEBRAIC AND SINGULARITY PROPERTIES

Authors

DOI:

https://doi.org/10.14311/AP.2017.57.0467

Keywords:

Kummer-Schwarz, Symmetries, Singularities, Integrability

Abstract

The Kummer–Schwarz Equation, 2y'y'''− 3(y'')2 = 0, has a generalisation, (n − 1)y(n−2)y(n)ny(n−1)2 = 0, which shares many properties with the parent form in terms of symmetry and singularity. All equations of the class are integrable in closed form. Here we introduce a new class, (n+q−2)y(n−2)y(n) −(n+q−1)y(n−1)2 = 0, which has different integrability and singularity properties.

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Author Biographies

R Sinuvasan, Pondicherry University

Mathematics department Research scholar

K Krishnakumar, Pondicherry University

Mathematics department Research scholar

K M Tamizhmani, Pondicherry university

Mathematics Department, Professor & Dean

PGL Leach, University of Kwazulu-Natal

Mathematics Department, Professor emeritus

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Published

2017-12-30

How to Cite

Sinuvasan, R., Krishnakumar, K., Tamizhmani, K. M., & Leach, P. (2017). FURTHER GENERALISATIONS OF THE KUMMER-SCHWARZ EQUATION: ALGEBRAIC AND SINGULARITY PROPERTIES. Acta Polytechnica, 57(6), 467–469. https://doi.org/10.14311/AP.2017.57.0467

Issue

Vol. 57 No. 6 (2017)

Section

Articles