From Diaz's Enriques Product to an n-Fold Cup-Product Bockstein Family of Integral Hodge Counterexamples

Abstract

We reinterpret Diaz's construction of Chow-trivial smooth projective varieties violating the integral Hodge conjecture as the level-two case of an \(n\)-fold cup-product Bockstein mechanism. Diaz's dimension-four example is \(V=S1× S2\), where \(S1,S2\) are Enriques surfaces, and its obstruction is the Bockstein of π1*α1π2*β2∈ H3(V, Z/2(2)). Here \(α1\) is the K3 double-cover class and \(β2\) is an Enriques Brauer-detecting class. We extend the finite-coefficient source construction to \(Xn=S1×·s× Sn\) by forming n=π1*α1π2*β2·sπn*βn ∈ H2n-1(Xn, Z/2(n)),with Bockstein n=δ(n)∈ H2n(Xn, Z(n)). Using external products of perverse sheaves, categorical Bockstein compatibility, and a Leibniz rule for the MacPherson--Vilonen boundary, we prove unconditionally that \(n\) has nonzero image in a distinguished Enriques--Brauer component of the MV obstruction channel. Under the Brauer-separation hypothesis, which asserts that algebraic codimension-\(n\) cycle classes have zero image in this same component, the class \(n\) is a non-algebraic \(2\)-torsion integral Hodge class. We verify this separation for decomposable algebraic cycles and reduce the remaining non-decomposable case, via integral even Chow--K\"unneth projectors on the Enriques factors, to a single coefficient-level algebraic-control problem involving the \(H1(S1, Z/2(1))\) Enriques double-cover direction. We also record a motivic finite-coefficient lift of the tower via the finite-coefficient cone \( 1X(n)/2:=Cone( 1X(n)× 2 1X(n))\), and explain which formal part of the MacPherson--Vilonen zig-zag construction lifts motivically under Betti realization.