In set theory, a branch of mathematics, a rank-into-rank is a large cardinal λ satisfying one of the following four axioms (commonly known as rank-into-rank embeddings, given in order of increasing consistency strength):

• Axiom I3: There is a nontrivial elementary embedding of V_λ into itself.
• Axiom I2: There is a nontrivial elementary embedding of V into a transitive class M that includes V_λ where λ is the first fixed point above the critical point.
• Axiom I1: There is a nontrivial elementary embedding of V_λ+1 into itself.
• Axiom I0: There is a nontrivial elementary embedding of L(V_λ+1 ) into itself with the critical point below λ.

These are essentially the largest known large cardinal axioms not known to be inconsistent in ZFC; if the axiom of choice is dropped then Reinhardt cardinals are larger if they exist.

If j is the elementary embedding mentioned in one of these axioms and κ is its critical point, then λ is the limit of $j^n(\backslash kappa)$ as n goes to ω. More generally, if the axiom of choice holds, it is provable that if there is a nontrivial elementary embedding of V_α into itself then α is either a limit ordinal of cofinality ω or the successor of such an ordinal.

The axioms I1, I2, and I3 were at first suspected to be inconsistent (in ZFC) as it was thought possible that Kunen's result that Reinhardt cardinals are inconsistent with the axiom of choice could be extended to them, but this has not yet happened and they are now usually believed to be consistent.

Large cardinals | Determinacy