Toric Landau-Ginzburg models in threefold divisorial contractions

Abstract

We investigate quantum periods and toric Landau-Ginzburg models under divisorial contractions of terminal Fano threefolds. Let g:Y → X be a divisorial contraction between Q-factorial Fano threefolds with ordinary terminal singularities and E be the exceptional divisor. Assuming that the center of the contraction is either a smooth point, a terminal quotient point, a point of type cA/n, or a smooth curve with singularities of type cA or cA/n, we prove the regularized period identity r+∞GY,rE(t)=GX(t) where GY,rE(t) and GX(t) are the regularized quantum periods of (Y,rE) and X respectively. This gives a mirror approach to the computation of the Sarkisov links and higher syzygies of central models of dimension 3.