Every rational Hodge isometry between two K3 surfaces is algebraic
Abstract
We prove that given any rational Hodge isometry :H2(S1,Q)→ H2(S2,Q) between any two K\"ahler K3 surfaces S1 and S2 the cohomology class of in H2,2(S1× S2) is a polynomial in Chern classes of coherent analytic sheaves over S1 × S2. Consequently, the cohomology class of is algebraic whenever S1 and S2 are algebraic.
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