ive additional information about what the data
> represents. So rather than having a bunch of unrelated functions, they can
> become more tied together (of course, when this appropriate). It is wise to
> take advantage of this.
>
> Best,
> Travis
>
> On Sunday, June 12, 2
tored out to be used for purposes like this.
>
> Best,
> Travis
>
>
> On Thursday, May 26, 2022 at 4:12:41 PM UTC+9 Yingdong Li wrote:
>
>> Dear all,
>>
>> I have put my code in GitHub(with some explanation of it) so that you can
>> clearly see it.
>&
Dongulas/Dongulas>
Best wishes,
Li Yingdong
在2022年6月5日星期日 UTC+8 12:57:45 写道:
> Dear William,
>
> Thank you so much for your advice! I'll revise the code later.
>
> Best wishes,
> Li Yingdong
>
> 在2022年6月5日星期日 UTC+8 01:12:16 写道:
>
>> On Sat, Jun 4, 2022 at
Dear all,
Motivated by problems about modular forms, we want to find the ring
structure of Hecke algebra. Therefore, I have written some codes in Sage to
compute the finite-dimensional algebra by a list of commuting matrices and
I want to contribute it to Sage. Here is the idea of my codes.
1.
nt for sharing code, so it
>>> would be easier to share it with the community. Next, I think to contribute
>>> to SageMath it is better to start with small contribution. For example,
>>> review some tickets or fix some bugs. Then, it becomes easier to contribute
&
, it becomes easier to contribute
>> to bigger projects.
>>
>> Anyway, welcome to the community and good job on your research project!
>>
>> David Ayotte
>>
>> Le jeudi 12 mai 2022 à 05:45:53 UTC-4, Yingdong Li a écrit :
>>
>>> Dear all,
&
Dear all,
I have written some codes in Sage to compute the finite-dimensional algebra
by a list of commuting matrices and I want to contribute it to Sage. Here
is the idea of my codes.
1. We can construct the algebra as a quotient of a polynomial ring(by using
the homomorphism which sends each
