On 22/02/2020 03:25, N A via Boost-users wrote:
> Hi
>
> The Legendre polynomials (Lp) of degree n=5 and x=0.2 is 0.30752 and
> according to Boost article, the Legendre-Stieltjes polynomials (LSp)
> of degree n=5 and x=0.2 is 0.53239.
>
> So if I want to compute the LSp for n=6, how do I do it? What is the
> formula you are using to be able to calculate the LSp for any nth degree?
>
> If a recurrence relation is not possible, then is there a closed form
> mathematical representation to calculate any nth degree LSp?
Please see Patterson, TNL. "The optimum addition of points to quadrature
formulae." Mathematics of Computation 22.104 (1968): 847-856
John.
>
> Thanks
>
>
>
>
> On Friday, February 21, 2020, 06:54:27 PM GMT+4, Nick Thompson via
>
>
> What precisely are you trying to compute? Are you trying to find the
> coefficients of the polynomials in the standard basis? Are you trying
> to evaluate them at a point?
>
> Note that the Legendre-Stieltjes polynomials do not satisfy three-term
> recurrence relations, and so recursive rules (depending on what
> precisely you mean by that) are not available.
>
> Nick
>
>
>
>
> ‐‐‐‐‐‐‐ Original Message ‐‐‐‐‐‐‐
> On Wednesday, February 19, 2020 12:07 PM, N A via Boost-users
>
>> Hi,
>>
>> With regard to the article on Boost:
>> Legendre-Stieltjes Polynomials - 1.66.0
>>
>>
>>
>>
>>
>> Legendre-Stieltjes Polynomials - 1.66.0
>>
>>
>>
>>
>> Can anyone help me to compute the stieltjes polynomials please? I'm
>> coding in VBA and I'm looking for some recursive rules to calculate same.
>>
>> Thanks
>> Vick
>>
>>
>
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