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Section Day 11

This is an outline of the topics we covered in the eleventh day of class. The skeleton notes are in a handout, which can be printed out using the printer icon at the top right of its section of the page for filling in during class. Filled notes for each day will be posted after class to Canvas.

Handout Tuesday 6/23

Algebraist of the Day.

Augustin-Louis Cauchy, 1789-1857
  • French mathematician, known for his work in analysis, number theory, and group theory.
  • Notable theorems: Cauchy’s Integral Theorem, Cauchy’s Theorem for finite groups, first rigorous proof of Taylor’s Theorem
  • Was a notoriously bad lecturer at the Γ‰cole Polytechnique
  • Conflicts with the July Revolution; refused to swear allegiance to the new government and lost his positions

Reminders/Announcements.

Definition 117. Group Action Features.

Let \(G\) act on \(X\text{.}\) For each \(x\in X\text{,}\) its orbit is
\begin{equation*} \Orb_x = \mathcal{O}_x=\{g\cdot x \mid g \in G\} \subseteq X \end{equation*}
and its stabilizer is
\begin{equation*} \Stab_x = G_x = \{g\in G \mid g\cdot x = x\} \subseteq G\text{.} \end{equation*}
We say that \(x\) is a fixed point of the action if \(\Orb_x=\{x\} \Longleftrightarrow \Stab_x=G\text{.}\) We write \(X_G\) for the set of all fixed points of the action.

Example 118. \(\GL(2,\R)\) acting on \(\R^2\).

Proof.

Proof.