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Ince equation

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In mathematics, the Ince equation, named for Edward Lindsay Ince, is the differential equation

w + ξ sin ( 2 z ) w + ( η p ξ cos ( 2 z ) ) w = 0. {\displaystyle w^{\prime \prime }+\xi \sin(2z)w^{\prime }+(\eta -p\xi \cos(2z))w=0.\,}

When p is a non-negative integer, it has polynomial solutions called Ince polynomials. In particular, when p = 1 , η ± ξ = 1 {\displaystyle p=1,\eta \pm \xi =1} , then it has a closed-form solution

w ( z ) = C e i z ( e 2 i z 1 ) {\displaystyle w(z)=Ce^{-iz}(e^{2iz}\mp 1)}

where C {\displaystyle C} is a constant.

See also

References

  1. Cheung, Tsz Yung. "Liouvillian solutions of Whittaker-Ince equation". Journal of Symbolic Computation. 115 (March-April 2023): 18–38. doi:10.1016/j.jsc.2022.07.002.
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