06-1350/Class Notes for Thursday November 16: Difference between revisions

06-1350/Navigation Panel   # Week of... Links 1 Sep 11 About, Tue, Thu 2 Sep 18 Tue, Kurlin(P), Thu 3 Sep 25 Tue, Photo, Thu 4 Oct 2 HW1, Tue, Thu 5 Oct 9 Tue(P), Thu(P) 6 Oct 16 HW2, Tue(P), Thu(P) 7 Oct 23 Tue(P), Thu 8 Oct 30 HW3, Tue, Thu 9 Nov 6 Tue (${\displaystyle \nu }$), Thu 10 Nov 13 Tue, Thu 11 Nov 20 HW4(P), Thu 12 Nov 27 Thu 13 Dec 4 Syzygies in Asymptote, Final Jan 8 Grades Note. (P) means "contains a problem that Dror cares about". Add your name / see who's in! On to 07-1352

Today's Agenda

• Sweeping clean a tree and ${\displaystyle {\mathcal {A}}(\Gamma )\equiv {\mathcal {A}}(\uparrow _{b_{1}(\Gamma )})}$.

• ${\displaystyle {\mathcal {A}}(\uparrow _{n})}$ is a VS-algebra (see more at VS, TS and TG Algebras).
• In the coordinates above, write the ${\displaystyle TR\Phi B}$ relations in various algebraic notations.
  • R4: ${\displaystyle (1230)^{\star }B^{\pm }\cdot (1213)^{\star }B^{\pm }\cdot (1023)^{\star }\Phi =(1123)^{\star }\Phi \cdot (1233)^{\star }B^{\pm }}$ or ${\displaystyle (B_{1a}^{\pm }B_{2a}^{\pm }\Phi _{1a};B_{1b}^{\pm }B_{2b}^{\pm };B_{1c}^{\pm }B_{2b}^{\pm }\Phi _{1b};B_{2c}^{\pm }\Phi _{1c})=(\Phi _{2a}B_{3a}^{\pm };\Phi _{2a}B_{3b}^{\pm };\Phi _{2b}B_{3c}^{\pm };\Phi _{2c}B_{3c}^{\pm })}$.
  • ${\displaystyle B^{\pm }}$ in terms of ${\displaystyle \Phi }$ and ${\displaystyle R}$ and ${\displaystyle R}$ in terms of ${\displaystyle T}$.
  • R3, R2, R1
  • Symmetry of ${\displaystyle \Phi }$ and of ${\displaystyle B^{\pm }}$.
  • ${\displaystyle u}$, ${\displaystyle d}$ and ${\displaystyle \#}$
  • Idempotence for ${\displaystyle T}$, ${\displaystyle R}$, ${\displaystyle \Phi }$ and ${\displaystyle B^{\pm }}$.