I’ve recently read about Clifford’s geometric algebra being a more general framework for differential geometry than differential forms, simpler for the study of spaces with a metric tensor, and equivalent to the latter in some cases.
I’ve mostly learned about differential forms in the context of de Rham cohomology so I couldn’t help but asking myself if there’s an equivalent concept in the framework of Clifford algebras (I don’t know a whole lot about Clifford algebras yet so excuse me if this question doesn’t make sense).