Key variety construction of Sarkisov links for prime Q-Fano threefolds of codimension four associated to Type II2 projections

Abstract

In our paper [Tak6], we constructed eight families of quasi-smooth prime Q-Fano threefolds, anticanonically embedded in codimension four, using weighted projectivizations of the 14-dimensional affine variety A14or its cone. Let fX X be the unique divisorial extraction at one specified singularity of maximal index. In this paper, we explicitly construct the Sarkisov link starting from f for X belonging to seven of these families. This is achieved by using the Sarkisov link associated with the weighted projectivization of A14 or its cone corresponding to X. As a consequence, we show that the Sarkisov link ends with either a fibration whose general fiber is a del Pezzo surface of degree one or a divisorial contraction of type (2,1) to weighted complete intersections of codimension at most two. We also provide more detailed descriptions of these Sarkisov links.