On the geometry of K\"ahler--Frobenius manifolds and their classification

Abstract

The purpose of this article is to show that flat compact K\"ahler manifolds exhibit the structure of a Frobenius manifold, a structure originating in 2D Topological Quantum Field Theory and closely related to Joyce structure. As a result, we classify all such manifolds. It can be deduced that K\"ahler--Frobenius manifolds include certain Calabi--Yau manifolds, complex tori T=Cn/Zn, generalized (orientable) Hantzsche--Wendt manifolds, hyperelliptic manifolds and manifolds of type T/G, where G is a finite group acting on T freely and containing no translations. An explicit study is provided for the two-dimensional case. Additionally, we can prove that Chern's conjecture for K\"ahler pre-Frobenius manifolds holds. Lastly, we establish that certain classes of K\"ahler-Frobenius manifolds share a direct relationship with theta functions which are important objects in number theory as well as complex analysis.

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