Legendre rational functions

In mathematics, the Legendre rational functions are a sequence of orthogonal functions on [0, ∞). They are obtained by composing the Cayley transform with Legendre polynomials.

Plot of the Legendre rational functions for n=0,1,2 and 3 for x between 0.01 and 100.

A rational Legendre function of degree n is defined as: where is a Legendre polynomial. These functions are eigenfunctions of the singular Sturm–Liouville problem: with eigenvalues

Properties

edit

Many properties can be derived from the properties of the Legendre polynomials of the first kind. Other properties are unique to the functions themselves.

Recursion

edit

  and  

Limiting behavior

edit
 
Plot of the seventh order (n=7) Legendre rational function multiplied by 1 x for x between 0.01 and 100. Note that there are n zeroes arranged symmetrically about x=1 and if x0 is a zero, then 1/x0 is a zero as well. These properties hold for all orders.

It can be shown that   and  

Orthogonality

edit

  where   is the Kronecker delta function.

Particular values

edit

 

References

edit
  • Zhong-Qing, Wang; Ben-Yu, Guo (2005). "A mixed spectral method for incompressible viscous fluid flow in an infinite strip". Computational & Applied Mathematics. 24 (3). Sociedade Brasileira de Matemática Aplicada e Computacional. doi:10.1590/S0101-82052005000300002.