Fabrizio Catanese
Published 2021-06-18Version 1
We show, in this first part, that the maximal number of singular points of a quartic surface $X \subset \mathbb{P}^3_K$ defined over an algebraically closed field $K$ of characteristic $2$ is at most $18$. We produce examples with $14$ singular points, and show that, under several geometric assumptions ($\mathfrak S_4$-symmetry, or behaviour of the Gauss map, or structure of tangent cone at one of the singular points $P$ , separability/inseparability of the projection with centre $P$), we obtain better upper bounds.
Comments: 22 pages, Dedicated to Bernd Sturmfels on the occasion of his 60-th birthday. Improves on the main result of the previous paper by the author arXiv:2106.06643, which has a big overlapping with the present paper, but is not completely superseded
Singularities of normal quartic surfaces II (char=2)
The number of singular points of quartic surfaces (char=2)
The maximum number of singular points on rational homology projective planes
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