Homological mirror symmetry of CPn and their products via Morse homotopy

Abstract

We propose a way of understanding homological mirror symmetry when a complex manifold is a smooth compact toric manifold. So far, in many example, the derived category Db(coh(X)) of coherent sheaves on a toric manifold X is compared with the Fukaya-Seidel category of the Milnor fiber of the corresponding Landau-Ginzburg potential. We instead consider the dual torus fibration π:M B of the complement of the toric divisors in X, where B is the dual polytope of the toric manifold X. A natural formulation of homological mirror symmetry in this set-up is to define Fuk(M) a variant of the Fukaya category and show the equivalence Db(coh(X)) Db(Fuk(M)). As an intermediate step, we construct the category Mo(P) of weighted Morse homotopy on P:=B as a natural generalization of the weighted Fukaya-Oh category proposed by Kontsevich-Soibelman. We then show a full subcategory MoE(P) of Mo(P) generates Db(coh(X)) for the cases X is a complex projective space and their products.