There is a classification of simple Lie algebras in $\text{Vec}_{\mathbb{C}}$ given by Dynkin diagrams. We then have 4 families of simple lie algebras, plus some exceptional ones.

Question: How about simple lie algebras in the bigger category $\text{sVec}_{\mathbb{C}}$ of super vector spaces? Is there a known classification for simple Lie algebras there?

There is a classification of simple Lie algebras in $\text{Vec}_{\mathbb{C}}$ given by Dynkin diagrams. We then have 4 families of simple lie algebras, plus some exceptional ones.

Question: How about simple Lie algebras in the bigger category $\text{sVec}_{\mathbb{C}}$ of super vector spaces? Is there a known classification for simple Lie algebras there?

There is a classification of simple lie algebras in $\text{Vec}_{\mathbb{C}}$ given by Dynking diagrams. We then have 4 families of simple lie algebras, plus some exceptional ones.

Question: How about simple lie algebras in the bigger category $\text{sVec}_{\mathbb{C}}$ of super vector spaces? Is there a known classification for simple lie algebras there?

There is a classification of simple Lie algebras in $\text{Vec}_{\mathbb{C}}$ given by Dynkin diagrams. We then have 4 families of simple lie algebras, plus some exceptional ones.

Question: How about simple lie algebras in the bigger category $\text{sVec}_{\mathbb{C}}$ of super vector spaces? Is there a known classification for simple Lie algebras there?