Steenrod Lengths and a Problem of Vakil

Abstract

We give an explicit combinatorial description of the function f(n) governing the Steenrod length of real projective spaces RPn. This function arises in stable homotopy theory through the action of Steenrod squares on mod-2 cohomology and is closely related to the ghost length, which measures the minimal number of spheres required to construct a space up to homotopy. Building on the directed graphs Tn introduced by Vakil to encode degree constraints for Steenrod operations, we interpret f(n) as the length of the longest directed path starting at n. Using this framework, we resolve a question posed by Vakil by deriving concrete combinatorial formulas for f(n) in terms of binary classes and a distinguished family of integers, which we call Vakil numbers.

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