A Recipe for Reciprocity

Gauss noted quadratic reciprocity to be among his favourite results, and any undergrad will quickly pick up on just how strange it is despite a plethora of elementary proofs. By 1930, E. Artin had finalized Artin reciprocity which wondrously subsumed all previous generalizations, but was still confined to abelian contexts. An amicable non-abelian reciprocity remains a driving force in number-theoretic research.

In this talk, I'll recount Artin reciprocity and show it implies quadratic and cubic reciprocity. I'll then talk about some candidate non-abelian reciprocities, and in particular, which morals of Artin reciprocity they preserve.