On Landau-Ginzburg systems, Quivers and Monodromy

Abstract

Let X be a toric Fano manifold and denote by Crit(fX) ⊂ (C)n the solution scheme of the corresponding Landau-Ginzburg system of equations. For toric Del-Pezzo surfaces and various toric Fano threefolds we define a map L : Crit(fX) → Pic(X) such that EL(X) : = L(Crit(fX)) ⊂ Pic(X) is a full strongly exceptional collection of line bundles. We observe the existence of a natural monodromy map M : π1(L(X) RX,fX) → Aut(Crit(fX)) where L(X) is the space of all Laurent polynomials whose Newton polytope is equal to the Newton polytope of fX, the Landau-Ginzburg potential of X, and RX ⊂ L(X) is the space of all elements whose corresponding solution scheme is reduced. We show that monodromies of Crit(fX) admit non-trivial relations to quiver representations of the exceptional collection EL(X). We refer to this property as the M-aligned property of the maps L: Crit(fX) → Pic(X). We discuss possible applications of the existence of such M-aligned exceptional maps to various aspects of mirror symmetry of toric Fano manifolds.