LG/CY correspondence between tt* geometries

Abstract

The concept of tt* geometric structure was introduced by physicists (see CV1, BCOV and references therein) , and then studied firstly in mathematics by C. Hertling Het1. It is believed that the tt* geometric structure contains the whole genus 0 information of a two dimensional topological field theory. In this paper, we propose the LG/CY correspondence conjecture for tt* geometry and obtain the following result. Let f∈C[z0, …, zn+2] be a nondegenerate homogeneous polynomialof degree n+2, then it defines a Calabi-Yau model represented by a Calabi-Yau hypersurface Xf in CPn+1 or a Landau-Ginzburg model represented by a hypersurface singularity (Cn+2, f), both can be written as a tt* structure. We proved that there exists a tt* substructure on Landau-Ginzburg side, which should correspond to the tt* structure from variation of Hodge structures in Calabi-Yau side. We build the isomorphism of almost all structures in tt* geometries between these two models except the isomorphism between real structures.