VS, TS and TG Algebras: Difference between revisions

Abstract

We introduce VS-, TS- and TG-Algebras; three types of algebraic entities within which some basic equations of knot theory (related to Algebraic Knot Theory) can be written and potentially solved. Why?

• These equations are valuable yet not well understood. My hope is to study them in many simpler spaces (i.e., in many simpler VS-, TS- and TG-Algebras) than the ones that naturally occur in knot theory, in the hope that out of many test cases an understanding will emerge.
• In particular, one day I hope to write (or encourage the writing of) computer programs that will take a VS-, TS-, or TG-algebra "plug-in" and given it, will carry out all the necessary higher-level algebra. This will make it easier to study particular cases computationally. But for this, the notions of VS-, TS- and TG-Algebras must first be completely specified.

VS-Algebras in One Paragraph

A VS-Algebra (Vertical Strands Algebra) is an algebraic object that is endowed with the same operations as the algebras ${\displaystyle {\mathcal {A}}_{n}^{hor}}$ of horizontal chord chord diagrams - multiplication (vertical stacking, a binary operation) and strand permutation, strand addition, strand doubling and strand deletion (all unary operations). It is local if it satisfies the same "locality in time" and "locality in space" relations that ${\displaystyle {\mathcal {A}}_{n}^{hor}}$ satisfies [Bar-Natan_97]. In any local VS-algebra the equations for a Drinfel'd associator (i.e., the pentagon and the hexagon) can be written and potentially be solved, and solutions always lead to braid invariants. Likewise in any local VS-algebra the largely undocumented braidor equations can be written and potentially be solved, and solutions always lead to braid invariants.

TS-Algebras in One Paragraph

A TS-Algebra (Tangled Strands Algebra) is to tangles as a VS-algebra is to braids. Equally cryptically, it is to ${\displaystyle {\mathcal {A}}_{n}}$ as a VS-algebra is to ${\displaystyle {\mathcal {A}}_{n}^{hor}}$. Thus a TS-algebra has the same unary operations as a VS-algebra along with a fancier collection of "products" that allow for "reversing" and "bending back" strands before they are concatenated. Thus every TS-algebra is in particular a VS-algebra, hence if it is "local" (with the same definition as for a VS-algebra), associators and braidors make sense it it. In a TS-algebra every associator or braidor satisfying some minor further symmetry conditions leads to a knot and link invariant. Furthermore, sufficiently symmetric associators lead to full-fledged Algebraic Knot Theories.

TG-Algebras in One Paragraph

A TG-Algebra (Trivalent Graph Algebra) is to knotted trivalent graphs as a TS-algebra is to tangles. Knotted trivalent graphs are equivalent to tangles, in some topological sense; indeed, given a knotted trivalent graph, pick a maximal tree and contract it until it is just a thick point. What remains, in the complement of that think point, is just a number of knotted edges with no vertices. That is, it is a tangle. It follows that a knotted trivalent graph is merely a tangle with just a bit of extra combinatorial labeling. Likewise the notions of a TG-algebra and of a TS-algebra are nearly equivalent. They differ mostly just by how certain things are labeled.

VS-Algebras in Some Detail

Definition. For a natural number ${\displaystyle n}$ let ${\displaystyle {\underline {n}}}$ denote the set ${\displaystyle \{0,1,2,\ldots ,n\}}$. Let ${\displaystyle {\mathbf {VS} }}$ denote the category whose objects are the natural numbers and whose morphisms are given by

${\displaystyle \operatorname {mor} _{\mathbf {VS} }(m,n)=\{\alpha :{\underline {m}}\to {\underline {n}}:\alpha (0)=0\}}$,

with the obvious composition of morphisms.

Interpretation. The object "${\displaystyle n}$" stands for "${\displaystyle n}$ strands". A morphism ${\displaystyle \alpha :m\to n}$ means "for any ${\displaystyle 1\leq k\leq m}$, strand number ${\displaystyle k}$ in ${\displaystyle m}$ looks at strand number ${\displaystyle \alpha (k)}$ in ${\displaystyle n}$ if ${\displaystyle \alpha (k)>0}$, and looks nowhere if ${\displaystyle \alpha (k)=0}$".

Definition. A VS-algebra is a contravariant functor ${\displaystyle {\mathbf {A} }}$ from the category ${\displaystyle {\mathbf {VS} }}$ to the category of algebras over some fixed ring of scalars. We denote ${\displaystyle {\mathbf {A} }(n)}$ by ${\displaystyle A_{n}}$ and ${\displaystyle {\mathbf {A} }(\alpha )}$ by ${\displaystyle \alpha ^{\star }}$.

Interpretation. In a TS-algebra we have an algebra for any number of strands, with multiplication corresponding to "stacking two ${\displaystyle n}$-stranded objects (imagine braids) one on top the other". We think of an element ${\displaystyle \Psi }$ of ${\displaystyle A_{n}}$ as "${\displaystyle n}$ strands each of which carrying some algebraic information". If ${\displaystyle \alpha :m\to n}$, then ${\displaystyle \alpha ^{\star }\Psi }$ has ${\displaystyle m}$ strands carrying algebraic information, and if ${\displaystyle \alpha (k)>0}$, strand number ${\displaystyle k}$ in ${\displaystyle \alpha ^{\star }\Psi }$ "reads" its information from strand number ${\displaystyle \alpha (k)}$ in ${\displaystyle \Psi }$. If ${\displaystyle \alpha (k)=0}$, strand number ${\displaystyle k}$ in ${\displaystyle \alpha ^{\star }\Psi }$ reads its information from nowhere, so it carries some "default" information, presumably "empty".

TS-Algebras in Some Detail

TG-Algebras is Some Detail

This section will surely wait a while to be written; at the moment I don't have an immediate reason to write it nor do I know exactly what I want written.

References

[Bar-Natan_97] ^  Dror Bar-Natan, Non-Associative Tangles, in Geometric topology, proceedings of the Georgia international topology conference, W. H. Kazez, ed., 139-183, Amer. Math. Soc. and International Press, Providence, 1997.