Elementary links from prime Fano threefolds along two lines

Abstract

For prime Fano threefolds X of genus g=12, 10 or 9, and for totally disjoint pairs of lines Z1, Z2 in X, we establish links from the blowups of X along Z1 and Z2. If g=12, then the links end with the blowups of Fano threefolds of type 2.21 along bi-cubic curves; if g=10, then the links end with the blowups of the projectivization of the tangent bundle of the projective plane along genus 2 bi-quintic curves with a mild condition; if g=9, then the links end with conic bundles over the product of two projective lines with the discriminant loci of bidegree (3,3). When g=12 or g=10, we also establish the converses of the above links. Moreover, we especially focus on the links when g=12 and the links are Gm-equivariant.