Analytic theory of Legendre-type transformations for a Frobenius manifold
Abstract
Let M be an n-dimensional Frobenius manifold. Fix ∈\1,…,n\. Assuming certain invertibility, Dubrovin introduced the Legendre-type transformation S, which transforms M to an n-dimensional Frobenius manifold S(M). In this paper, we show that these S(M) share the same monodromy data at the Fuchsian singular point of the Dubrovin connection, and that for the case when M is semisimple they also share the same Stokes matrix and the same central connection matrix. A straightforward application of the monodromy identification is the following: if we know the monodromy data of some semisimple Frobenius manifold M, we immediately obtain those of its Legendre-type transformations. Another application gives the identification between the partition function of a semisimple Frobenius manifold M and the topological partition function of S(M).
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