Quadratic Functions of Cocycles and Pin Structures

Abstract

We construct a natural bijective correspondence between equivalence classes of Pin- structures on a compact simplicial n-manifold Mn, possibly with boundary, and Z/4-valued 'quadratic functions' Q defined on degree n-1 relative Z/2 cocycles, Q Zn-1(Mn, ∂ Mn ; Z /2) Z/4. The 'quadratic' property of Q(p+q) and the values Q(dc) on coboundaries are expressed in terms of higher i products of Steenrod. For n = 2 the results extend old results relating Pin- structures on closed surfaces to quadratic refinements of the cup product pairing on H1(Mn ; Z /2). In the oriented case, that is, for Spin manifolds, the results extend results of Kapustin, see arXiv:1505.05856v2, and results in our previous paper on the Pontrjagin dual 4-dimensional Spin bordism, see arXiv:1803.08147. The extension of those results to Pin- manifolds in this paper required a different approach, involving some stable homotopy theory of Postnikov towers.