Hi Travis, Thanks. Yes, I will definitely continue to explore the SageMath system and repo, and contribute if I can.
If there are any particular issues that you have in mind, please feel free to link them and I’d be happy to check them out. Best, Jamie On Thursday, April 6, 2023 at 11:35:48 PM UTC-7 tcscrims wrote: > Dear Jamie, > No problem. I hope you will consider submitting some code to SageMath > when you have time, even if they are just small improvements or your own > code that you have found useful. (I found that writing code is a very > useful way to help understanding how certain computations are done.) I have > a number of other smaller things I would like to include that I haven't had > time yet to implement (i.e., smaller than a GSoC project, possibly an > afternoon or two). > > Best, > Travis > > > On Thursday, April 6, 2023 at 3:31:51 AM UTC+9 [email protected] wrote: > >> Hi, >> >> Just want to say that unfortunately I won't apply to GSOC this year as my >> course load is too high over the summer. >> >> It's been interesting to learn about SageMath, I'll keep an eye out for >> similar projects next year (and have studied more ring theory, ideally!) >> >> -Jamie >> On Thursday, March 23, 2023 at 10:43:36 AM UTC-7 Jamie Kai wrote: >> >>> Hi Travis, >>> >>> Thanks for the reply. I've got some good references (including the one >>> you linked) on Gröbner bases for exterior algebras and Gröbner basis >>> algorithms for now. >>> >>> I'm currently setting this up on my machine and exploring the code >>> mentioned in the issues. Hoping to have a project idea soon. >>> >>> Best, >>> Jamie >>> >>> On Wednesday, March 22, 2023 at 4:26:59 PM UTC-7 tcscrims wrote: >>> >>>> Dear Jamie, >>>> Thank you for your interest. There are no specific suggested >>>> references, but it is very easy to find the necessary background >>>> information on Groebner bases for polynomial rings through a Google >>>> search. >>>> It is also easy to find information regarding those for the exterior >>>> algebra (also somethings known as a skew-commutative polynomial ring or >>>> Grassmann algebra). For example, you would quickly find starting points >>>> such as >>>> >>>> http://www.reduce-algebra.com/reduce38-docs/xideal.pdf >>>> >>>> For the project itself, you are free to propose whatever you want to >>>> do. My dream would be to have a faster native version of graded >>>> commutative >>>> algebras within Sage that also implements fast GBs (relative to what >>>> plural >>>> does for us currently). However, if you want to focus specifically on >>>> getting the exterior case super quick, that is also fine. >>>> >>>> Best, >>>> Travis >>>> >>>> On Monday, March 20, 2023 at 1:22:58 PM UTC+9 [email protected] wrote: >>>> >>>>> Hello SageMath team, >>>>> >>>>> My name is Jamie Kai, I'm at the University of British Columbia in >>>>> Vancouver, Canada. I'm in year 1 of a 2-year Second Bachelor of Computer >>>>> Science program, and I have a previous BA in Math from McGill University. >>>>> >>>>> I have experience with Python and Cython programming for large-scale >>>>> statistical calculations, and several years of MATLAB and professional >>>>> full-stack experience. >>>>> >>>>> I've also taken several upper-year/grad math courses: advanced linear >>>>> algebra (tensor, exterior and symmetric algebras, topological vector >>>>> spaces), group theory, analysis (real, complex, harmonic). I have a >>>>> growing >>>>> interest in abstract algebra, so SageMath's list of project ideas this >>>>> year >>>>> is very exciting! >>>>> >>>>> I am quite interested in submitting a proposal for one of the project >>>>> ideas in computational algebra under Travis Scrimshaw, in particular: >>>>> *Improve >>>>> exterior algebra and Gröbner bases code and expand to graded commutative >>>>> algebras* >>>>> <https://wiki.sagemath.org/GSoC/2023#Improve_exterior_algebra_and_Gr.2BAPY-bner_bases_code_and_expand_to_graded_commutative_algebras> >>>>> >>>>> I have a couple of questions: >>>>> >>>>> Are there any suggested references (books, papers, websites) for >>>>> computational ring theory or commutative algebra that I can read to get >>>>> some theoretical background? >>>>> >>>>> Would the 175 hour version of the exterior algebra & Gröbner bases >>>>> project include just the first goal of improving performance with Gröbner >>>>> bases, or also some work on the case of general graded commutative >>>>> algebras? >>>>> >>>>> Cheers, >>>>> Jamie >>>>> >>>> -- You received this message because you are subscribed to the Google Groups "sage-gsoc" group. To unsubscribe from this group and stop receiving emails from it, send an email to [email protected]. To view this discussion on the web visit https://groups.google.com/d/msgid/sage-gsoc/3d6e81ac-42c4-4917-a2d5-6f69d511d4aen%40googlegroups.com.
