Looks good to me except the note needs to be removed.
Also would it be possible to update the formula to
$B_{n,k}(x_1, x_2, \ldots, x_{n-k+1}) = \sum_{\sum{j_i}=k, \sum{i j_i}
=n} \frac{n!}{j_1!j_2!\ldots} \frac{x_1}{1!}^j_1 \frac{x_2}{2!}^j_2
\ldots$
Thanks
On Jan 27, 12:14 am, Mike Hansen <mhan...@gmail.com> wrote:
> Hi Blair,
>
> On Mon, Jan 26, 2009 at 3:36 PM, bsdz <blai...@googlemail.com> wrote:
> > Is there any where this could be added to the main distribution?
>
> I made a few modifications to your routine to match some of the style
> conventions used in Sage. Also, instead of passing in the variables,
> I'm creating a polynomial ring and returning a polynomial. If one
> wants to use different variables, then they can evaluate the
> polynomial at those variables.
>
> I put a patch up athttp://trac.sagemath.org/sage_trac/ticket/5109.
> Let me know if these changes are okay with you.
>
> --Mike
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