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|| 11:00 ||<|2 #6666FF> Project Intros ||<|4> Tutorial: [[#Mark|Thiruvathukal+Albert]] ||<|4> Tutorial: [[#Tingley|Tingley + Peters]] ||<|4> Tutorial: [[#Lauve|Lauve]] ||<|4> Tutorial: open || | || 11:00 ||<|2 #6666FF> Project Intros ||<|4> Tutorial: [[#Mark|Thiruvathukal+Albert]] ||<|4> Tutorial: <<BR>>[[#Tingley|Tingley+Peters]] ||<|4> Tutorial: [[#Lauve|Lauve]] ||<|4> Tutorial: open || |
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* Resume coding basic algebraic structure for KLR-algebras, quantum shuffle algebras, etc (Im, Scrimshaw) | * Resume coding basic algebraic structure for KLR-algebras, quantum shuffle algebras, etc (Im, McNamara) |
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* Quiver representation for ''cyclic'' quivers (Gunawan, King). See [[http://trac.sagemath.org/ticket/18632|#18632]] | |
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* Get MV polytope code ready to include in sage (Tingley-Muthiah) * Weight lattice realization for crystals (see [[http://trac.sagemath.org/ticket/18453|#18453]]) (Schilling, Salisbury) * Implementation of Foata bijection on words [[http://trac.sagemath.org/ticket/18628|#18628]] (Schilling) * Learn some patterns for organizing research code and computations (Muthiah) * Come up with general framework for constructing sub-Hopf algebras of Malvenuto-Reutenauer that arise from lattice quotients on the weak order (see: Nathan Reading, ''Lattice congruences, fans and Hopf algebras'', [[http://arxiv.org/abs/math/0402063]]). (Dilks) |
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* Hugh Thomas (U New Brunswick, Canada) | |
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||<style="text-align: left; border-left:none; border-right:none;"> <<Anchor(Seelinger)>>'''George Seelinger''' ||<style="text-align: left; border-left:none; border-right:none;"> ''TBA'' || ||||<( style="border:none;"> ...<<BR>> || |
||<style="text-align: left; border-left:none; border-right:none;"> <<Anchor(Seelinger)>>'''George Seelinger''' ||<style="text-align: left; border-left:none; border-right:none;"> ''Orthogonal Idempotents in Semisimple Brauer Algebras'' || ||||<( style="border:none;"> I will describe my joint work with Doty and Lauve. Using Sage, we found a recursive description of primitive, pairwise orthogonal idempotents in a semisimple Brauer algebra. These are analogous to Young's seminormal idempotents for group algebras of the symmetric groups. <<BR>> || |
Sage Days 65 in Chicago
When and where?
June 8-12, 2015, at Loyola University Chicago, in Chicago, Ill., USA.
Specifically, IES Building (#38), Rooms 123 & 124.
Tentative Schedule
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Mon |
Tue |
Wed |
Thu |
Fri |
9:30 |
Coffee & Light Breakfast |
Coffee |
Coffee |
Coffee |
Coffee |
9:45 |
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10:00 |
open |
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10:15 |
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10:30 |
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10:45 |
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11:00 |
Project Intros |
Tutorial: Thiruvathukal+Albert |
Tutorial: |
Tutorial: Lauve |
Tutorial: open |
11:15 |
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11:30 |
Tutorial: Doty |
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11:45 |
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12:00 |
Lunch |
Lunch / Free Afternoon |
Lunch |
Final Progress Reports |
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12:15 |
Lunch |
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12:30 |
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12:45 |
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13:00 |
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13:15 |
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13:30 |
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13:45 |
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14:00 |
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14:15 |
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14:30 |
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14:45 |
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15:00 |
Coffee |
Coffee |
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15:15 |
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15:30 |
Coffee |
Small groups (coding/tutorials) |
Small groups (coding/tutorials) |
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15:45 |
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16:00 |
Small groups (coding/tutorials) |
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16:15 |
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16:30 |
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16:45 |
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17:00 |
Progress Reports |
Progress Reports |
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17:15 |
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17:30 |
Progress Reports |
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17:45 |
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18:00 |
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18:15 |
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18:30 |
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18:45 |
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19:00 |
Main Focci
- We develop code for SAGE support of MV-polytopes and affine crystals.
- We develop code for SAGE support of combinatorial Hopf algebras.
We get newcomers to SAGE as up to speed as possible in a week!
(Personal) Goals for the Week
Participants should feel free to add to this list in advance of the meeting. Anonymous contributions are okay.
- Develop code for Hopf monoids in species (Lauve)
- Learn how to use SAGE in my classroom
Resume coding basic algebraic structure for KLR-algebras, quantum shuffle algebras, etc (Im, McNamara)
Start a wiki for combinatorial Hopf algebras, in the format of FindStat (Pang)
- Crystals of tableaux for the Lie superalgebra gl(m|n) (Salisbury)
- improve NC-Grobner basis calculations, implement dual Quasi-Schur basis #18447 (Zabrocki)
- Non-commutative version of Faugere's F5 algorithm in Sage (King)
Quiver representation for cyclic quivers (Gunawan, King). See #18632
Code test for satisfaction of A_\infty-algebra relations (Fansler)
- Help Mike, improve my sage habilities (Nantel)
- Get MV polytope code ready to include in sage (Tingley-Muthiah)
Weight lattice realization for crystals (see #18453) (Schilling, Salisbury)
Implementation of Foata bijection on words #18628 (Schilling)
- Learn some patterns for organizing research code and computations (Muthiah)
Come up with general framework for constructing sub-Hopf algebras of Malvenuto-Reutenauer that arise from lattice quotients on the weak order (see: Nathan Reading, Lattice congruences, fans and Hopf algebras, http://arxiv.org/abs/math/0402063). (Dilks)
Participants
- Darlayne Addabbo (U Illinois)
- Mark V. Albert (Loyola Chicago)
- N. Bergeron (York U)
- Kevin Dilks (U Minnesota)
- Steve Doty (Loyola Chicago)
- Merv Fansler (Millersville U)
- Gabriel Feinberg (Haverford College)
- Emily Gunawan (U Minnesota)
- Christine Haught (Loyola Chicago)
- Mee Seong Im (U Illinois and USMA)
- Jonathan Judge (UConn)
WonGeun Kim (CUNY)
- Simon King (FSU Jena, Germany)
- Michael Kratochvil (Loyola Chicago)
- Jonathan Lamar (U Colorado)
- Aaron Lauve (Loyola Chicago)
- Jake Levinson (U Michigan)
- Megan Ly (U Colorado Boulder)
Peter McNamara (U Queensland, Australia)
- Dinakar Muthiah (U Toronto)
- Amy Pang (LaCIM, UQAM)
Kyle Petersen (DePaul U, tentative)
- Viviane Pons (LRI, U Paris-Sud)
- Anup Poudel (Loyola)
- Franco Saliola (UQAM)
- Ben Salisbury (Central Michigan U)
- Anne Schilling (UC Davis)
- Adam Schultze (Loyola Chicago and SUNY Albany)
- George H. Seelinger (Loyola Chicago)
- Mark Shimozono (Virginia Tech)
Bridget Tenner (DePaul U, tentative)
- George Thiruvathukal (Loyola Chicago)
- Peter Tingley (Loyola Chicago)
- Panupong Vichitkunakorn (U Illinois)
- Mike Zabrocki (York U)
Abstracts
Monday |
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Franco Saliola |
Let's Start Using Sage! |
A whirlwind tour of what Sage can and cannot do (and why you should care). |
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Stephen Doty |
Getting Started with the Sagemath Cloud |
Sagemath Cloud is a recent project to make Sage (and much more: e.g., Python, R, LaTeX, Terminal) available in any modern browser, without the need to install anything on the computer. This will be an introduction, with no prerequisites. |
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Dinakar Muthiah |
MV polytopes in finite and affine type |
MV polytopes provide a model for highest weight crystals in finite and affine type. Interest in MV polytopes comes from the variety of different contexts in which they appear: MV cycles in the affine Grassmannian, irreducible components in preprojective varieties, character-support for KLR modules, and PBW bases. They also can be constructed purely combinatorially. I will focus on the combinatorics of MV polytopes and briefly mention the other contexts in which they appear. I will also discuss the MV polytope code that we have already written and explain some of the tasks that remain. |
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Nantel Bergeron |
Homogeneous, Non-commutative Gröbner Bases |
Computing a non-commutative Gröbner basis takes an extremely long time. I will present the algorithm and indicate where it could be parallelized... |
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Tuesday |
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Anne Schilling |
Algebraic Combinatorics in Sage: How to use it, make it, and get it into Sage |
We will very briefly discuss the history of combinatorics in Sage and give some examples on how to use some features like crystals, permutations and words. We will then implement some new missing features together and see how to get them into Sage. |
|
Mark A. & George T. |
Code collaboration in SAGE and other open source projects |
We will have a brief introduction to the typical organizational structures and technologies used by large-scale open source projects and how one can contribute at various levels in each. This will be followed by a tutorial for working collaboratively on code to contribute directly to the SAGE environment. |
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Mike Zabrocki |
How to program a combinatorial Hopf algebra (with bases) |
I will review the structure of the code for combinatorial Hopf algebras (symmetric functions/partitions, quasi-symmetric functions/compositions, non-commutative symmetric functions/compositions, symmetric functions in non-commuting variables/set partitions) that are already in Sage and explain how to create a new combinatorial Hopf algebra on another set of combinatorial objects. I will also point out the ongoing work on open tickets to implement other combinatorial Hopf algebras (packed words #15611, FQSym, WQSym, PQSym #13793, PBT/Loday-Ronco #13855) |
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Wednesday |
|
Ben Salisbury |
Affine crystals in Sage |
I will give a brief overview of affine crystals (both irreducible highest weight affine crystals and affine Verma crytals) before discussing certain implementations of these crystals in Sage. I will also point to some current Sage work in this area as well as possible extensions beyond. |
|
Peter T. & Emily P. |
Linear Algebra in Sage |
We will lead a session on figuring out how to get sage to do something. This will mostly consist of participants working together to try and figure stuff out. That stuff will be from linear algebra and, if things go well, random matrix theory. |
|
Thursday |
|
Simon King |
An F5 algorithm for modules over path algebra quotients and the computation of Loewy layers |
The F5 algorithm is a signature based algorithm to compute Gröbner bases for modules over polynomial rings. The F5 signature allows to exploit commutativity relations in order to avoid redundant computations. When considering modules over path algebra quotients, one can instead exploit the quotient relations to avoid redundancies. |
|
Aaron Lauve |
Convolution Powers: step by step |
I share my personal story (I want to say "natural progression" but I'm sure it's nothing of the kind) from perceived gap in the Sage code for Hopf algebras to sage-trac ticket submission. |
|
George Seelinger |
Orthogonal Idempotents in Semisimple Brauer Algebras |
I will describe my joint work with Doty and Lauve. Using Sage, we found a recursive description of primitive, pairwise orthogonal idempotents in a semisimple Brauer algebra. These are analogous to Young's seminormal idempotents for group algebras of the symmetric groups. |
|
Jonathan Judge |
Root Multiplicities for Kac-Moody Algebras in Sage |
Root multiplicities are fundamental data in the structure theory of Kac-Moody algebras. We will give a brief survey on root multiplicities that highlights the differences between finite, affine, and indefinite types. Then we will describe the two main ways that these multiplicities are computed, namely Berman-Moody's formula and Peterson's recurrent formula. Lastly, we demonstrate an implementation of Peterson's recurrent formula in Sage. |
|
Friday |
|
open |
... |
Organizers
- ALBERT, Mark V. (Loyola Chicago -- Computer Science)
- LAUVE, Aaron (Loyola Chicago -- Mathematics)
- TINGLEY, Peter (Loyola Chicago -- Mathematics)
Web page
http://math.luc.edu/sagedays/ (with information about housing)