Constructive Proof of the Hodge Conjecture for K3 Surfaces via Nodal Degenerations

Abstract

We give a constructive proof of the Hodge conjecture for complex K3 surfaces that does not rely on Torelli-type results. Starting with an arbitrary rational (1,1)-class α∈ H1,1(X,Q), we algorithmically build a one-parameter family of quartic K3's acquiring at most ten A1-nodes. On the central fibre X0, the class α specializes to a Q-linear combination of the hyperplane class and the exceptional (-2)-curves coming from the blow-ups of the nodes. Using the Clemens--Schmid sequence together with Picard--Lefschetz theory, we identify W2 H2 H2(X0) and transport this combination back to the original smooth surface as an algebraic divisor. This yields an explicit, finite-step procedure that realizes any rational (1,1)-class by an algebraic cycle. We also formulate an equivariant extension for (2,2)-classes on Calabi--Yau threefolds, indicating how the same strategy might apply in higher dimension.