Mathématiques avec Jules

Introduction of the course

We follows the textbook Introduction to Quantum Groups and Crystal Bases written by Jin Hong and Seok-Jin Kang. I show my great gratitude to professor Huang Min for his rigorous and crystal clear introduction in this domain full of beauty.

Chapiter 1

In this Chapter, we review some important conclusions of Lie algebras and introduce Hopf algebras.

Here is my quick review on root system and the classification of semisimple Lie algebras: pdf

Chapiter 2

In this Chapter, we review those important conclusions of Kac–Moody algebras.

Chapiter 3

In this Chapter, we introduce Quantum groups as quantumed Kac–Moody algebras, how to recover the original Kac–Moody algebra from a given Quantum group via $\mathbb{A}_1$ forms and taking classical limit. We also introduce the corresponding category $\mathcal{O}^{q}_{int}$ of Quantum groups.

For lemma 3.2.5 and proposition 3.3.6, I viewed them in a different way to supplement the material in the textbook. Click the Bilibili Links to see my explanation.

Chapiter 4

Crystal bases.

Chapiter 5

Existence and Uniqueness of Crystal bases. The proof of Uniqueness has so many details in calculations that we have to skip it.

Chapiter 6

Global bases: generalize the crystal bases (taking limit at $q = 0$) to any $q$, such as $q = \infty$.

Chapiter 7

Young tableaux and Crystals. This is my favorite chapter!