Matthias Schütt scite author profile

Let k be a field of characteristic 2. We give a geometric proof that there are no smooth quartic surfaces S ⊂ P 3 k with more than 64 lines (predating work of Degtyarev which improves this bound to 60). We also exhibit a smooth quartic containing 60 lines which thus attains the record in characteristic 2. After this paper was written, A. Degtyarev stated in [2], partly based on machine-aided calculations from [3], that the bound of Theorem 1.1 can be improved to 60 in characteristic 2. The record is attained by a quartic with S 5-action which we shall exhibit explicitly in Section 8. We point out that unlike in other characteristics (by work of us and Veniani [9], [10], [19]), there exist non-smooth quartic K3 surfaces with more lines than in the smooth case, in fact with as many as 68 lines in characteristics 2 (see Remark 2.3), indicating how special this situation is. We emphasize that originally we were expecting the bound from characteristics = 2, 3 to go up in characteristic 2, since just like in characteristic 3, there may be quasi-elliptic fibrations and the flecnodal divisor may degenerate. With this in mind, our previous best bound ended up at 84 in [10, Prop. 1.3]. In

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Matthias Schütt

Mordell–Weil Lattices

CM newforms with rational coefficients

Fields of definition of singular K3 surfaces

Elliptic surfaces

64 lines on smooth quartic surfaces

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