Rational configurations in K3 surfaces and simply-connected pg=1 surfaces for K2=1,2,3,4,5,6,7,8,9
Abstract
We prove the existence of (20-2K2)-dimensional families of simply-connected surfaces with ample canonical class, pg=1, and 1 ≤ K2 ≤ 9, and we study the relation with configurations of rational curves in K3 surfaces via Q-Gorenstein smoothings. Our surfaces with K2=7 and K2=9 are the first surfaces known in the literature, together with the existence of a 4-dimensional family for K2=8.
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