Classifying the Groups of Order p^3 in Lean

This note discusses our formalisation in Lean 4 of the classification of groups of order p^3 for a prime number p, using mathlib4. We present the five isomorphism classes and give a detailed account of the formalisation, with particular emphasis on the non-abelian case, which requiring the most substantial formal development. For odd~p, the non-abelian groups are the Heisenberg group Heis(Z/pZ) and the semidirect product Z/p^2ZrtimesZ/pZ; for p=2, they are D_4 and Q_8. We describe the construction of these concrete groups, the structural lemmas about centers, commutators, and exponents, and the explicit isomorphism constructions that classify an arbitrary non-abelian p^3-group.