On Landau-Ginzburg systems and Db(X) of various toric Fano manifolds with small picard group

Abstract

For a toric Fano manifold X denote by Crit(X) ⊂ (C)n the solution scheme of the Landau-Ginzburg system of equations of X. Examples of toric Fano manifolds with rk(Pic(X)) ≤ 3 which admit full strongly exceptional collections of line bundles were recently found by various authors. For these examples we construct a map E : Crit(X) → Pic(X) whose image E= \ E(z) z ∈ Crit(X) \ is a full strongly exceptional collection satisfying the M-aligned property. That is, under this map, the groups Hom(E(z),E(w)) for z,w ∈ Crit(X) are naturally related to the structure of the monodromy group acting on Crit(X).