Geometric approach towards stable homotopy groups of spheres. The Kervaire invariant II

Abstract

The notion of the geometrical /2 /2--control of self-intersection of a skew-framed immersion and the notion of the /2 /4-structure (the cyclic structure) on the self-intersection manifold of a 4-framed immersion are introduced. It is shown that a skew-framed immersion f:M3n+q4 n, 0 < q <<n (in the 3n4+ε-range) admits a geometrical /2 /2--control if the characteristic class of the skew-framing of this immersion admits a retraction of the order q, i.e. there exists a mapping 0: M3n+q4 3(n-q)4, such that this composition I 0: M3n+q4 3(n-q)4 ∞ is the characteristic class of the skew-framing of f. Using the notion of /2 /2-control we prove that for a sufficiently great n, n=2l-2, an arbitrary immersed 4-framed manifold admits in the regular cobordism class (modulo odd torsion) an immersion with a /2 /4-structure. In the last section we present an approach toward the Kervaire Invariant One Problem.