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* fix vector matrix multiplication for free module elements [[https://trac.sagemath.org/ticket/23576|#23576]] | * fix vector matrix multiplication for free module elements [[https://trac.sagemath.org/ticket/23576|#23576]] (David) |
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* implement QQ/ZZ , QQ/2ZZ or QQ/nZZ as abelian groups. This is where finite quadratic/bilinear forms have values [[https://trac.sagemath.org/ticket/23944|#23944]] | * allow the inner product of an ambient free ZZ-module to take rational values. [[https://trac.sagemath.org/ticket/23958|#23958]] |
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* a latex representation for the genus using the Conway Sloane genus symbols [[https://trac.sagemath.org/ticket/23916|#23916]] | |
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* port more of [[https://magma.maths.usyd.edu.au/magma/handbook/hypergeometric_motives|Magma's functionality]], like Euler factors at tame and wild primes | * port more of [[https://magma.maths.usyd.edu.au/magma/handbook/hypergeometric_motives|Magma's functionality]]; see [[https://trac.sagemath.org/ticket/23952|#23952]] |
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* implement a (rigorous, sane) test for Weil polynomials: [[https://trac.sagemath.org/ticket/23945|#23945]]. More ambitious: get [[https://github.com/kedlaya/root-unitary|this code]] for exhausting over Weil polynomials into Sage: [[https://trac.sagemath.org/ticket/23946|#23946]] | * Get [[https://github.com/kedlaya/root-unitary|this code]] for exhausting over Weil polynomials into Sage: [[https://trac.sagemath.org/ticket/23946|#23946]] |
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* Speedups for reflexive polytopes: [[https://trac.sagemath.org/ticket/22391|#22391]], [[https://trac.sagemath.org/ticket/22391|#22594]] * Reciprocal transfrom for polynomials [[https://trac.sagemath.org/ticket/23948|#23947]] * has_cyclotomic_factor for polynomials [[https://trac.sagemath.org/ticket/23948|#23948]] |
* a minor bugfix in the Genus class [[https://trac.sagemath.org/ticket/23955|#23955]] * a latex representation for the genus using the Conway Sloane genus symbols [[https://trac.sagemath.org/ticket/23916|#23916]] * Speedups for reflexive polytopes: [[https://trac.sagemath.org/ticket/22391|#22391]], [[https://trac.sagemath.org/ticket/22524|#22524]] * iterator for hypergeometric motives [[https://trac.sagemath.org/ticket/23953|#23953]] |
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* has_cyclotomic_factor for polynomials [[https://trac.sagemath.org/ticket/23948|#23948]] | |
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* Reciprocal transfrom for polynomials [[https://trac.sagemath.org/ticket/23947|#23947]] * implement a (rigorous, sane) test for Weil polynomials: [[https://trac.sagemath.org/ticket/23945|#23945]] * implement QQ/ZZ , QQ/2ZZ or QQ/nZZ as abelian groups. This is where finite quadratic/bilinear forms have values [[https://trac.sagemath.org/ticket/23944|#23944]] |
Sage Days 91: Open Source Computation and Algebraic Surfaces (Sept. 29 - Oct. 1, 2017)
Location: Banff International Research Station.
Schedule
https://www.birs.ca/events/2017/2-day-workshops/17w2677/schedule
Projects
Feel free to add suggestions
Please add "sd91" as a keyword to any tickets you are working on during this Sage Days so they show up in this list: sd91 Tickets
Lattice related projects
fix vector matrix multiplication for free module elements #23576 (David)
implement finite bilinear/quadratic forms and make sure that the discriminant group has one #23699 (Simon)
allow the inner product of an ambient free ZZ-module to take rational values. #23958
- implement a class for (subgroups of) the orthogonal group of a finite bilinear/quadratic form and an algorithm to compute it
- diagonalization and isomorphism testing for finite quadratic/bilinear forms
- create a genus from a signature pair and a finite quadratic form
- create a finite quadratic form from a genus
- a base class for the orthogonal group of a lattice
- a method to compute the orthogonal group of a positive definite lattice
expose more of Jeffery Hein's lattice code than is currently being used for modular forms 23342
Point counting and zeta function projects
- hypergeometric motives:
port more of Magma's functionality; see #23952
- find (or compute) the list of HGMs which are K3 surfaces
get Edgar Costa's code for zeta functions of projective hypersurfaces into Sage #23863
package Sebastian Pancratz's code for deformation computation of zeta functions #20265
Get this code for exhausting over Weil polynomials into Sage: #23946
Add Malcolm Kotok's code for zeta functions using the Sperber-Voight algorithm to Sage: #19865, http://hdl.handle.net/1802/30832
- implement the Cayley trick for converting toric complete intersections into toric hypersurfaces
Fix the IntegerVectors documentation to point to IntegerListsLex #23939
Tickets needing review
a minor bugfix in the Genus class #23955
a latex representation for the genus using the Conway Sloane genus symbols #23916
iterator for hypergeometric motives #23953
Positively Reviewed Tickets
has_cyclotomic_factor for polynomials #23948
bugfix for genera equality testing #23376
use the inner_product_matrix for module comparison #23915
a class for integral lattices #23634
fix .annihilator() for the trivial abelian group #22720
hypergeometric motives: Euler factors at good primes #23671
Reciprocal transfrom for polynomials #23947
implement a (rigorous, sane) test for Weil polynomials: #23945
implement QQ/ZZ , QQ/2ZZ or QQ/nZZ as abelian groups. This is where finite quadratic/bilinear forms have values #23944
To prepare for the workshop
Before the workshop, we recommend opening a Sage trac account and completing the Code Academy modules on Python and Git. If you like you may download and install the latest version of the source code of Sage, or use the k8s server described below.
The k8s server
William Stein has kindly provided a server for us to use during the workshop, with 48 CPUs and 256 GB of RAM. It is running CoCalc, so you can access it from your browser.
Creating an Account
You should create an account here. You will need a secret token, which will be e-mailed to participants (ask an organizer if you can't find it). Once you have an account, someone will have to add you to the Sage Days 91 project; anyone who is already part of the project can do so from the project settings page. At that point, you will be able to access the server at k8s.sagemath.org.
Git
If you will be doing Sage development, you need to set up a terminal that knows who you are (since we're all using the same user when we log in from the browser). This way we will be able to share Sage installations on the server.
If you provided your trac username to Simon, the setup has been done for you. Otherwise, open up a terminal (~/Terms/Admin.term exists for this purpose) and run the script setup_user (from anywhere). This will ask you some questions (name, e-mail, trac account info) and create a terminal for you (~/Terms/$TRAC_USERNAME.term). If you're ever interacting with git, you should use this terminal (or the ssh method described below) so that git knows who you are.
Trac Passwords
You have the option of storing your trac password (in a plain text file on the server, so don't do so if your trac password is sensitive). You can control how your trac password is handled by the scripts set_trac_password and unset_trac_password from your terminal. If you don't store your trac password in a file, you will be prompted for it when you open your terminal.
Editor
When you make a git commit, you can specify the commit message on the command line with the -m flag. Otherwise, git will open an editor for you to enter the commit message. The default editor is Vim. If you would rather use a different editor (such as emacs), you can set your editor by running the set_editor script in your terminal.
SSH
SSHing into the project
Instead of using the browser, you can also SSH into the project and work in a terminal on your laptop.
Once you add the public key from your laptop (generated by ssh-keygen and then copied from ~/.ssh/id_rsa.pub for example) to ~/authorized_keys in the browser, you will be able to SSH into the project using the following command.
ssh [email protected] -p 2222
At the beginning of your key in ~/authorized_keys on the server you should add command=".init_user roed" for example. You can look at the other keys there for examples.
Setting up SSH keys for trac
If you want to be able to push changes to trac, you need to upload your key from the k8s server to trac. You can find your ssh key by running show_ssh_key in your terminal.
Sage installations
If you provided your trac username to Simon, you should have a Sage install in ~/Src. If not, you can create a new Sage installation for yourself by running
new_sage
at your command prompt, or new_sage $YOUR_TRAC_USERNAME at any prompt (replacing $YOUR_TRAC_USERNAME with your trac username. Note that this will take a couple minutes.
The setup described above also means that the sage command in your terminal will be aliased to your copy of Sage, and anyone will be able to use your sage install from a Jupyter notebook by selecting the appropriate kernel.
Building and Large output
Avoid sending huge amounts of output in a terminal, as this slows the whole project down for everybody (proper output truncation isn’t sufficiently implemented). Here are some options to avoid this.
1. When building Sage, you can do
./sage -b > output 2>&1
rather than just sending a large amount of output to your terminal. You can check on output by typing
tail output
2. If you know tmux, do control+b, then c to make a new session, and leave the large-output session in a different session. You can switch back and forth with control+b then n.
3. If you've set up your terminal as described above, then
make build
in your sage folder will do the redirection for you, as well as automatically use many threads (so that the build goes much faster).
Possible Interest Groups
Lattices: Jen Berg, Simon Brandhorst, Amy Feaver, Andreas Malmendier, David Roe, Ichiro Shimada
Zeta functions (Monsky-Washnitzer cohomology/deformation): Jen Balakrishnan, Edgar Costa, Kiran Kedlaya
Zeta functions (Dwork cohomology): Heidi Goodson, Renate Scheidler, Mckenzie West, Ursula Whitcher
People of many interests: David Zureick-Brown, Lenny Taelman