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=Finite Type Invariants of W-Knotted Objects: From Alexander to Kashiwara and Vergne=
==Finite Type Invariants of W-Knotted Objects: From Alexander to Kashiwara and Vergne==


<center>Joint with [http://www.math.toronto.edu/zsuzsi/ Zsuzsanna Dancso]</center>
Joint with [http://www.math.toronto.edu/zsuzsi/ Zsuzsanna Dancso]


<span style="color:red">This paper was split in two and became the first two parts of a four-part series ({{Home link|LOP.html#WKO1|WKO1}}, {{Home link|LOP.html#WKO2|WKO2}}, {{Pensieve link|Projects/WKO3/|WKO3}}, {{Pensieve link|Projects/WKO4/|WKO4}}). The remaining relevance of this page is due to the series of videotaped lectures (wClips) that are linked here.</span>
<center>{{Home Link|papers/WKO/WKO.pdf|WKO.pdf}}: last updated January 8, 2012. first edition: Not yet.</center>

<span style="color:red"><b>Download</b></span> [http://www.math.toronto.edu/~drorbn/papers/WKO/WKO.pdf WKO.pdf]: last updated &ge; May 5, 2014. first edition: September 27, 2013. The {{arXiv|1309.7155}} edition may be older.


'''Abstract.''' w-Knots, and more generally, w-knotted objects (w-braids, w-tangles, etc.) make a class of knotted objects which is <u>w</u>ider but <u>w</u>eaker than their "<u>u</u>sual" counterparts. To get (say) w-knots from u-knots, one has to allow non-planar "virtual" knot diagrams, hence enlarging the the base set of knots. But then one imposes a new relation, the "overcrossings commute" relation, further beyond the ordinary collection of Reidemeister moves, making w-knotted objects a bit weaker once again.
'''Abstract.''' w-Knots, and more generally, w-knotted objects (w-braids, w-tangles, etc.) make a class of knotted objects which is <u>w</u>ider but <u>w</u>eaker than their "<u>u</u>sual" counterparts. To get (say) w-knots from u-knots, one has to allow non-planar "virtual" knot diagrams, hence enlarging the the base set of knots. But then one imposes a new relation, the "overcrossings commute" relation, further beyond the ordinary collection of Reidemeister moves, making w-knotted objects a bit weaker once again.
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The group of w-braids was studied (under the name "<u>w</u>elded braids") by Fenn, Rimanyi and Rourke {{ref|FRR}} and was shown to be isomorphic to the McCool group {{ref|Mc}} of "basis-conjugating" automorphisms of a free group <math>F_n</math> - the smallest subgroup of <math>\operatorname{Aut}(F_n)</math> that contains both braids and permutations. Brendle and Hatcher {{ref|BH}}, in work that traces back to Goldsmith {{ref|Gol}}, have shown this group to be a group of movies of flying rings in <math>{\mathbb R}^3</math>. Satoh {{ref|Sa}} studied several classes of w-knotted objects (under the name "<u>w</u>eakly-virtual") and has shown them to be closely related to certain classes of knotted surfaces in <math>{\mathbb R}^4</math>. So w-knotted objects are algebraically and topologically interesting.
The group of w-braids was studied (under the name "<u>w</u>elded braids") by Fenn, Rimanyi and Rourke {{ref|FRR}} and was shown to be isomorphic to the McCool group {{ref|Mc}} of "basis-conjugating" automorphisms of a free group <math>F_n</math> - the smallest subgroup of <math>\operatorname{Aut}(F_n)</math> that contains both braids and permutations. Brendle and Hatcher {{ref|BH}}, in work that traces back to Goldsmith {{ref|Gol}}, have shown this group to be a group of movies of flying rings in <math>{\mathbb R}^3</math>. Satoh {{ref|Sa}} studied several classes of w-knotted objects (under the name "<u>w</u>eakly-virtual") and has shown them to be closely related to certain classes of knotted surfaces in <math>{\mathbb R}^4</math>. So w-knotted objects are algebraically and topologically interesting.


In this article we study finite type invariants of several classes of w-knotted objects. Following Berceanu and Papadima {{ref|BP}}, we construct a homomorphic universal finite type invariant of w-braids, and hence show that the McCool group of automorphisms is "1-formal". We also construct a homomorphic universal finite type invariant of w-tangles. We find that the universal finite type invariant of w-knots is more or less the Alexander polynomial (details inside).
In this article we study finite type invariants of several classes of w-knotted objects. Following Berceanu and Papadima {{ref|BP}}, we construct homomorphic universal finite type invariants of w-braids and of w-tangles. We find that the universal finite type invariant of w-knots is more or less the Alexander polynomial (details inside).


Much as the spaces <math>{\mathcal A}</math> of chord diagrams for ordinary knotted objects are related to metrized Lie algebras, we find that the spaces <math>{\mathcal A}^w</math> of "arrow diagrams" for w-knotted objects are related to not-necessarily-metrized Lie algebras. Many questions concerning w-knotted objects turn out to be equivalent to questions about Lie algebras. Most notably we find that a homomorphic universal finite type invariant of w-knotted trivalent graphs is essentially the same as a solution of the Kashiwara-Vergne {{ref|KV}} conjecture and much of the Alekseev-Torrosian {{ref|AT}} work on Drinfel'd associators and Kashiwara-Vergne can be re-interpreted as a study of w-knotted trivalent graphs.
Much as the spaces <math>{\mathcal A}</math> of chord diagrams for ordinary knotted objects are related to metrized Lie algebras, we find that the spaces <math>{\mathcal A}^w</math> of "arrow diagrams" for w-knotted objects are related to not-necessarily-metrized Lie algebras. Many questions concerning w-knotted objects turn out to be equivalent to questions about Lie algebras. Most notably we find that a homomorphic universal finite type invariant of w-knotted foams is essentially the same as a solution of the Kashiwara-Vergne {{ref|KV}} conjecture and much of the Alekseev-Torossian {{ref|AT}} work on Drinfel'd associators and Kashiwara-Vergne can be re-interpreted as a study of w-knotted trivalent graphs.


The true value of w-knots, though, is likely to emerge later, for we expect them to serve as a <u>w</u>armup example for what we expect will be even more interesting - the study of <u>v</u>irtual knots, or v-knots. We expect v-knotted objects to provide the global context whose projectivization (or "associated graded structure") will be the Etingof-Kazhdan theory of deformation quantization of Lie bialgebras {{ref|EK}}.
The true value of w-knots, though, is likely to emerge later, for we expect them to serve as a <u>w</u>armup example for what we expect will be even more interesting - the study of <u>v</u>irtual knots, or v-knots. We expect v-knotted objects to provide the global context whose projectivization (or "associated graded structure") will be the Etingof-Kazhdan theory of deformation quantization of Lie bialgebras {{ref|EK}}.


The paper. WKO.pdf, WKO.zip.
'''The paper.''' {{Home Link|papers/WKO/WKO.pdf|WKO.pdf}}, {{Home Link|papers/WKO/WKO.zip|WKO.zip}}.


Related Mathematica Notebooks. "The Kishino Braid" (Source, PDF), "Dimensions" (Source, PDF), "wA" (Source, PDF), "InfinitesimalAlexanderModules" (Source, PDF).
'''Related Mathematica Notebooks.''' "The Kishino Braid" ({{Pensieve Link|Projects/WKO/The_Kishino_Braid.nb|Source}}, {{Pensieve Link|Projects/WKO/nb/The_Kishino_Braid.pdf|PDF}}), "Dimensions" ({{Pensieve Link|Projects/WKO/Dimensions.nb|Source}}, {{Pensieve Link|Projects/WKO/nb/Dimensions|PDF}}), "wA" ({{Pensieve Link|Projects/WKO/wA.nb|Source}}, {{Pensieve Link|Projects/WKO/nb/wA.pdf|PDF}}), "InfinitesimalAlexanderModules" ({{Pensieve Link|Projects/WKO/InfinitesimalAlexanderModules.nb|Source}}, {{Pensieve Link|Projects/WKO/nb/InfinitesimalAlexanderModules.pdf|PDF}}).


Related talks. Oberwolfach-0805, MSRI-0808, Northeastern-081028, Trieste-0905, Bonn-0908.
'''Related talks.''' {{Home Link|Talks/Oberwolfach-0805|Oberwolfach-0805}}, {{Home Link|Talks/MSRI-0808|MSRI-0808}}, {{Home Link|Talks/Northeastern-081028|Northeastern-081028}}, {{Home Link|Talks/Trieste-0905|Trieste-0905}}, {{Home Link|Talks/Bonn-0908|Bonn-0908}}, {{Home Link|Talks/Caen-1206|Caen-1206}}.


Links. SandersonsGarden.html.
'''Links.''' {{Home Link|Gallery/KnottedObjects/SandersonsGarden.html|SandersonsGarden.html}}.


Related Scratch Work is under Pensieve: WKO and Pensieve: Arrow_Diagrams_and_gl(N).
'''Related Scratch Work''' is under {{Pensieve Link|Projects/WKO|Pensieve: WKO}} and {{Pensieve Link|Projects/Arrow_Diagrams_and_gl(N)|Pensieve: Arrow_Diagrams_and_gl(N)}}.


References.
'''References.'''


{{note|AT}} A. Alekseev and C. Torossian, The Kashiwara-Vergne conjecture and Drinfeld's associators, {{arXiv|0802.4300}}.
{{note|AT}} A. Alekseev and C. Torossian, The Kashiwara-Vergne conjecture and Drinfeld's associators, {{arXiv|0802.4300}}.
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{{note|BP}} B. Berceanu and S. Papadima, Universal Representations of Braid and Braid-Permutation Groups, {{arXiv|0708.0634}}.
{{note|BP}} B. Berceanu and S. Papadima, Universal Representations of Braid and Braid-Permutation Groups, {{arXiv|0708.0634}}.


{{note|BH}} T. Brendle and A. Hatcher, Configuration Spaces of Rings and Wickets, {{arXiv|0805.4354||.
{{note|BH}} T. Brendle and A. Hatcher, Configuration Spaces of Rings and Wickets, {{arXiv|0805.4354}}.


{{note|EK}} P. Etingof and D. Kazhdan, Quantization of Lie Bialgebras, I, Selecta Mathematica, New Series 2 (1996) 1-41, {{arXiv|q-alg/9506005}}.
{{note|EK}} P. Etingof and D. Kazhdan, Quantization of Lie Bialgebras, I, Selecta Mathematica, New Series 2 (1996) 1-41, {{arXiv|q-alg/9506005}}.
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{{note|Sa}} S. Satoh, Virtual Knot Presentations of Ribbon Torus Knots, J. of Knot Theory and its Ramifications 9-4 (2000) 531-542.
{{note|Sa}} S. Satoh, Virtual Knot Presentations of Ribbon Torus Knots, J. of Knot Theory and its Ramifications 9-4 (2000) 531-542.


<center>http://www.math.toronto.edu/drorbn/papers/WKO/IAMRelations.png</center>

Latest revision as of 16:47, 5 May 2014

DBN: Publications: WKO / Navigation
Wideo Companion

The wClips Seminar is a series of weekly wideotaped meetings at the University of Toronto, systematically going over the content of the WKO paper section by section.

Announcements. small circle, UofT, LDT Blog (also here). Email Dror to join our mailing list!

Resources. How to use this site, Dror's notebook, blackboard shots.

The wClips

http://katlas.math.toronto.edu/drorbn/dbnvp/dbnvp.png
Date Links
Jan 11, 2012 dbnvp 120111-1: Introduction.
dbnvp 120111-2: Section 2.1 - v-Braids.
Jan 18, 2012 dbnvp 120118-1: An introduction to this web site.
dbnvp 120118-2: Section 2.2 - w-Braids by generators and relations and as flying rings.
dbnvp 120118-3: Section 2.2 - w-Braids - other drawing conventions, "wens".
Jan 25, 2012 dbnvp 120125-1: Section 2.2.3 - basis conjugating automorphisms of .
dbnvp 120125-2: A very quick introduction to finite type invariants in the "u" case.
Feb 1, 2012 dbnvp 120201: Section 2.3 - finite type invariants of v- and w-braids, arrow diagrams, 6T, TC and 4T relations, expansions / universal finite type invariants.
Feb 8, 2012 dbnvp 120208: Review of u,v, and w braids and of Section 2.3.
Feb 15, 2012 dbnvp 120215: Section 2.5 - mostly compatibilities of , also injectivity and uniqueness of .
Feb 22, 2012 dbnvp 120222: Section 2.5.5, , and Section 3.1 (partially), the definition of v- and w-knots.
Feb 29, 2012 dbnvp 120229: Sections 3.1-3.4: v-Knots and w-Knots: Definitions, framings, finite type invariants, dimensions, and the expansion in the w case.
Mar 7, 2012 dbnvp 120307: Section 3.5: Jacobi diagrams and the bracket-rise theorem.
Mar 14, 2012 dbnvp 120314: Section 3.6 - the relation with Lie algebras.
Mar 21, 2012 dbnvp 120321: Section 4 - Algebraic Structures.
Mar 28, 2012 Out-of-sequence not-on-tape we watched the video of Talks: GWU-1203.
Apr 4, 2012 dbnvp 120404: Section 3.7 - The Alexander Theorem (statement).
Apr 18, 2012 dbnvp 120418: Aside on the Euler trick, the differential of , and the BCH formula.
Apr 25, 2012 dbnvp 120425: Section 3.8, a disorganized lecture towards the proof of the Alexander theorem.
May 2, 2012 dbnvp 120502: Section 4: Algebraic structures (review), circuit algebras, v- and w-tangles.
May 10, 2012 dbnvp 120510: Sections 5.1 and 5.2: tangles, their projectivization and its relationship with Alekseev-Torossian spaces.
May 23, 2012 dbnvp 120523: Section 5.2: Proof of the relationship with A-T spaces.
May 30, 2012 dbnvp 120530: Interpreting as a universal space of invariant tangential differential operators.
wClips Seminar Group Photo
Group photo on January 11, 2012: DBN, ZD, Stephen Morgan, Lucy Zhang, Iva Halacheva, David Li-Bland, Sam Selmani, Oleg Chterental, Peter Lee.

Finite Type Invariants of W-Knotted Objects: From Alexander to Kashiwara and Vergne

Joint with Zsuzsanna Dancso

This paper was split in two and became the first two parts of a four-part series (WKO1, WKO2, WKO3, WKO4). The remaining relevance of this page is due to the series of videotaped lectures (wClips) that are linked here.

Download WKO.pdf: last updated ≥ May 5, 2014. first edition: September 27, 2013. The arXiv:1309.7155 edition may be older.

Abstract. w-Knots, and more generally, w-knotted objects (w-braids, w-tangles, etc.) make a class of knotted objects which is wider but weaker than their "usual" counterparts. To get (say) w-knots from u-knots, one has to allow non-planar "virtual" knot diagrams, hence enlarging the the base set of knots. But then one imposes a new relation, the "overcrossings commute" relation, further beyond the ordinary collection of Reidemeister moves, making w-knotted objects a bit weaker once again.

The group of w-braids was studied (under the name "welded braids") by Fenn, Rimanyi and Rourke [FRR] and was shown to be isomorphic to the McCool group [Mc] of "basis-conjugating" automorphisms of a free group - the smallest subgroup of that contains both braids and permutations. Brendle and Hatcher [BH], in work that traces back to Goldsmith [Gol], have shown this group to be a group of movies of flying rings in . Satoh [Sa] studied several classes of w-knotted objects (under the name "weakly-virtual") and has shown them to be closely related to certain classes of knotted surfaces in . So w-knotted objects are algebraically and topologically interesting.

In this article we study finite type invariants of several classes of w-knotted objects. Following Berceanu and Papadima [BP], we construct homomorphic universal finite type invariants of w-braids and of w-tangles. We find that the universal finite type invariant of w-knots is more or less the Alexander polynomial (details inside).

Much as the spaces of chord diagrams for ordinary knotted objects are related to metrized Lie algebras, we find that the spaces of "arrow diagrams" for w-knotted objects are related to not-necessarily-metrized Lie algebras. Many questions concerning w-knotted objects turn out to be equivalent to questions about Lie algebras. Most notably we find that a homomorphic universal finite type invariant of w-knotted foams is essentially the same as a solution of the Kashiwara-Vergne [KV] conjecture and much of the Alekseev-Torossian [AT] work on Drinfel'd associators and Kashiwara-Vergne can be re-interpreted as a study of w-knotted trivalent graphs.

The true value of w-knots, though, is likely to emerge later, for we expect them to serve as a warmup example for what we expect will be even more interesting - the study of virtual knots, or v-knots. We expect v-knotted objects to provide the global context whose projectivization (or "associated graded structure") will be the Etingof-Kazhdan theory of deformation quantization of Lie bialgebras [EK].

The paper. WKO.pdf, WKO.zip.

Related Mathematica Notebooks. "The Kishino Braid" (Source, PDF), "Dimensions" (Source, PDF), "wA" (Source, PDF), "InfinitesimalAlexanderModules" (Source, PDF).

Related talks. Oberwolfach-0805, MSRI-0808, Northeastern-081028, Trieste-0905, Bonn-0908, Caen-1206.

Links. SandersonsGarden.html.

Related Scratch Work is under Pensieve: WKO and Pensieve: Arrow_Diagrams_and_gl(N).

References.

[AT] ^  A. Alekseev and C. Torossian, The Kashiwara-Vergne conjecture and Drinfeld's associators, arXiv:0802.4300.

[BP] ^  B. Berceanu and S. Papadima, Universal Representations of Braid and Braid-Permutation Groups, arXiv:0708.0634.

[BH] ^  T. Brendle and A. Hatcher, Configuration Spaces of Rings and Wickets, arXiv:0805.4354.

[EK] ^  P. Etingof and D. Kazhdan, Quantization of Lie Bialgebras, I, Selecta Mathematica, New Series 2 (1996) 1-41, arXiv:q-alg/9506005.

[FRR] ^  R. Fenn, R. Rimanyi and C. Rourke, The Braid-Permutation Group, Topology 36 (1997) 123-135.

[Gol] ^  D. L. Goldsmith, The Theory of Motion Groups, Mich. Math. J. 28-1 (1981) 3-17.

[KV] ^  M. Kashiwara and M. Vergne, The Campbell-Hausdorff Formula and Invariant Hyperfunctions, Invent. Math. 47 (1978) 249-272.

[Mc] ^  J. McCool, On Basis-Conjugating Automorphisms of Free Groups, Can. J. Math. 38-6(1986) 1525-1529.

[Sa] ^  S. Satoh, Virtual Knot Presentations of Ribbon Torus Knots, J. of Knot Theory and its Ramifications 9-4 (2000) 531-542.


http://www.math.toronto.edu/drorbn/papers/WKO/IAMRelations.png