Enumerative geometry of skew lines in P3 with a given associated finite group
Abstract
For any finite set L of 3 or more skew lines in P3K over an algebraically closed field K of arbitrary characteristic, there is a canonical associated subgroup G L of PGL2(K). Given a finite subgroup G⊂ PGL2(K) we study which configurations of lines have G L=G. We derive an upper bound on the number | L| of lines in terms of the order |G| of the group G and as an application we classify up to projective equivalence which sets L in P3 C have G L=G for certain finite nonabelian groups G.
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