A practical algorithm to compute the geometric Picard lattice of K3 surfaces of degree 2
Abstract
Let k be either a number a field or a function field over Q with finitely many variables. We present a practical algorithm to compute the geometric Picard lattice of a K3 surface over k of degree 2, i.e., a double cover of the projective plane over k ramified above a smooth sextic curve. The algorithm might not terminate, but if it terminates then it returns a proven correct answer.
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