© | << < ? > >> | Dror Bar-Natan: Talks:
Abstract. I will explain how the computation of compositions of maps of a certain natural class, from one polynomial ring into another, naturally leads to a certain composition operation of quadratics and to Feynman diagrams. I will also explain, with very little detail, how this is used in the construction of some very well-behaved poly-time computable knot polynomials.
Joint work with Roland van der Veen.
Handout: FDA.html, FDA.pdf, FDA.png.
Sources: pensieve.
Abstract. I'll explain what "everything around" means: classical and quantum $m$, $\Delta$, $S$, $tr$, $R$, $C$, and $\theta$, as well as $P$, $\Phi$, $J$, ${\mathbb D}$, and more, and all of their compositions. What DoPeGDO means: the category of Docile Perturbed Gaussian Differential Operators. And what $sl_{2+}^\epsilon$ means: a solvable approximation of the semi-simple Lie algebra $sl_2$.
Knot theorists should rejoice because all this leads to very powerful and well-behaved poly-time-computable knot invariants. Quantum algebraists should rejoice because it's a realistic playground for testing complicated equations and theories.
This is joint work with Roland van der Veen and continues work by Rozansky and Overbay.
Handout: DoPeGDO.html, DoPeGDO.pdf, DoPeGDO.png.
See videos at DaNang-1905 and at CRM-1907.
Links: NCSU Ov Za atoms cm engine akt kiw kt oa objects qa talks
Sources: pensieve.