Bi-flat F-structures as differential bicomplexes and Gauss-Manin connections
Abstract
We show that a bi-flat F-structure (∇,,e,∇*,*,E) on a manifold M defines a differential bicomplex (d∇,dE∇*) on forms with value on the tangent sheaf of the manifold. Moreover, the sequence of vector fields defined recursively by d∇X(α+1)=dL∇*X(α) coincide with the coefficients of the formal expansion of the flat local sections of a family of flat connections ∇GM associated with the bi-flat structure. In the case of Dubrovin-Frobenius manifold the connection ∇GM (for suitable choice of an auxiliary parameter) can be identified with the Levi-Civita connection of the flat pencil of metrics defined by the invariant metric and the intesection form.
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