Q-Fano threefolds and Laurent inversion

Abstract

We construct families of non-toric Q-factorial terminal Fano (Q-Fano) threefolds of codimension ≥ 20 corresponding to 54 mutation classes of rigid maximally mutable Laurent polynomials. From the point of view of mirror symmetry, they are the highest codimension (non-toric) Q-Fano varieties for which we can currently establish the Fano/Landau-Ginzburg correspondence. We construct 46 additional Q-Fano threefolds with codimensions of new examples ranging between 19 and 10. Some of these varieties will be presented as toric complete intersections, and others as Pfaffian varieties.