On the construction of solutions of the Mathieu equation by Frobenius-Latysheva method
Keywords:
normal solutions, subnormal solutions, normal-regular solutions, rank, sub-rank, anti-rank, anti-sub-rankAbstract
The possibilities of building normal, subnormal and normal - regular solutions of Mathieu algebraic equation by using Frobenius-Latysheva method are studied. The products of Mathieu subnormal series are considered. It is established a second order partial differential equation the solutions of which are the products of Mathieu subnormal series. It is also shown that this subnormal solutions a solution of the initial Mathieu equation with periodic coefficients.
Downloads
Published
2016-09-30
How to Cite
Tasmambetov, Z. (2016). On the construction of solutions of the Mathieu equation by Frobenius-Latysheva method. Bulletin of the Karaganda University. Mathematics Series, 83(3), 76–86. Retrieved from https://mts.buketov.edu.kz/index.php/mathematics-vestnik/article/view/112
Issue
Section
MATHEMATICS
