Knot at Lunch on October 23 2008: Difference between revisions

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{{Dror}}.
{{Dror}}.


==The Gospel in Seven <math>Z</math>'s==
==The Gospel in <math>v</math>, <math>w</math> and Seven <math>Z</math>'s==


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*Fully extends algebraic knot theory!
*Fully extends algebraic knot theory!
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(Add the no for ordinary tangles, add a radical statement?)

Revision as of 06:57, 23 October 2008

Invitation

Dear Knot at Lunch People,

We will have our next lunch on Thursday October 23, at the (new and hopefully temporary) usual place, the seminar room on the 10th floor of 215 Huron St., at 12 noon.

As always, please bring brown-bag lunch and fresh ideas. I'm hoping to make a little map-handout, roughly showing the logical relations between all those things I am confused about. If the map will be ready by Thursday, we may talk about it. If not, we'll have to find something else to talk about.

Further information about this Knot at Lunch meeting may be posted later at https://drorbn.net/drorbn?title=Knot_at_Lunch_on_October_23_2008.

As always, if you know anyone I should add to this mailing list or if you wish to be removed from this mailing list please let me know. To prevent junk accumulation in mailboxes, I will actively remove inactive people unless they request otherwise.

Best,

Dror.

The Gospel in , and Seven 's

  • Classifies braids!
  • Detected by Lie algebras!
 1 
  • Related to metrized Lie algebras!
  • Related to Chern-Simons theory and configuration space integrals!
  • Has GPV formulas!
 2 
  • Enables "Algebraic Knot Theory"!
  • Finitely presented!
  • Related to Drinfel'd associators!
  • No-go theorems in bounded degrees.
  • Extremely challenging to compute.
  • Leads to "internal quotients"!
  • Still challenging to compute.
 3 
  • Ribbon tori in !
  • Flying rings in !
  • Easy formulas for !
  • Relates to !
  • Classifies w-braids!
 4 
  • Related to the Alexander polynomial!
  • Related to general Lie algebras!
  • Related to co-commutative Lie bi-algebras!
  • Related to BF theory!
 5 
  • A "circuit algebra" invariant!
  • Related (by other means) to free Lie algebras, derivations, traces!
 6 
  • Related to the Kashiwara-Vergne conjecture and the orbit method!
  • Via Alkseev-Torrosian, explicit tree-level formulas for associators!
 7 
  • Related to general Lie bialgebras, Etingof-Kazhdan and quantum groups in general!
  • Fully extends algebraic knot theory!

(Add the no for ordinary tangles, add a radical statement?)