Relative mirror symmetry, theta functions and the Gamma conjecture

Abstract

Let X be a Fano variety, and D⊂ X be an snc anticanonical divisor. We study relative mirror symmetry for the log Calabi--Yau pair (X,D). (1) We prove a relative mirror theorem for snc pairs without assuming the divisors are nef. (2) We study theta functions associated with the pair (X,D). (3) We introduce functions on the mirror that are obtained from the higher-degree part of the big relative quantum cohomology. As an application, we use these new ingredients in relative mirror symmetry to prove a version of the mirror symmetric Gamma conjecture for X for OX and Opt in this setting, where the Landau--Ginzburg potential is defined as a sum of theta functions.