Absolutely wonderful!!! This clarifies information about group theory in a way I have not seen by looking at many textbooks and technical papers. Thank you for posting these lectures on line. I look forward to viewing (and maybe re-viewing) these lectures.

It looks like theres a mistake at 25:01. the right bottom writing should say = {e,r^2} instead of = {e,r}

Reminder for future visitors: the "orbits" in this specific lecture refer to the subgroups (of D_3) generated by each of its (6) elements. The actual orbit is commonly used to refer to the movement of elements under group action.

Excellent material!! Thanks for producing and posting it. :-)

The peppers have 10 "arms" not eight, so the rotation should be 36° rotation

Thank you for the great explanation and presentation. It is one of the best. I am confused by the definition of an orbit you provide. My understanding is that an orbit of an element s in a set S is the set of elements G sends s to through its group action on S. How does that generalize to G acting on G? Do we just consider the orbit of the subgroup formed by one generator of G? In that case, would the orbit of an element g' in G be the right coset formed by a the subgroup generated by some element f?

2:20. - There are 10 peppers, not 8...

This video made me finally understand e. Thank you!

Is this use of the term "orbit" standard/typical? I'm used to defining the orbit of an element x in group G the following: G(x) = {gx | g in G}. I tried to find this use of orbit elsewhere, but at least Mathworld and Wikipedia seem to agree with the definition I'm used to.

22:25 Hmm... but in a group, every node must have an arrow `g` going out to some other node, right? Because if it hadn't, we could get stuck in some node, being unable to apply certain operations (`g` in this case) while at some "dead end" nodes. But the group axioms require us to be able to perform every group operation always, in whatever order we like. So this implies that if we follow the arrows of `g` (and we can always do that), we must at some point return to where we started (if the number of steps was finite), or never come there (in that case the number of steps is infinite). So in a finite group there will always be closed orbits, for every generator. Am I right? If that is the case, then cyclic groups are really the building blocks of all other groups :>

Commuting diagrams is useful terminology if you're using this as a jumping off point into category theory.

from where can i find these lectures slides please

I don’t understand how the Cayley diagram works , how have you obtained elements and orbits from the diagram?Anyone please clarify this to the greatest extent?

So so great!

Where can we find these slides?

His name is Niels Abel.

15:30