Rational curves on a smooth Hermitian surface
Abstract
We study the set R of nonplanar rational curves of degree d<q+2 on a smooth Hermitian surface X of degree q+1 defined over an algebraically closed field of characteristic p>0, where q is a power of p. We prove that R is the empty set when d<q+1. In the case where d=q+1, we count the number of elements of R by showing that the group of projective automorphisms of X acts transitively on R and by determining the stabilizer subgroup. In the special case where X is the Fermat surface, we present an element of R explicitly.
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