Observations on the Darboux coordinates for rigid special geometry

Abstract

We exploit some relations which exist when (rigid) special geometry is formulated in real symplectic special coordinates PI=(p,q), I=1,...,2n. The central role of the real 2n× 2n matrix M( F, F), where F = ∂∂ F and F is the holomorphic prepotential, is elucidated in the real formalism. The property M M= with being the invariant symplectic form is used to prove several identities in the Darboux formulation. In this setting the matrix M coincides with the (negative of the) Hessian matrix H(S)=∂2 S∂ PI∂ PJ of a certain hamiltonian real function S(P), which also provides the metric of the special K\"ahler manifold. When S(P)=S(U+ U) is regarded as a "K\"ahler potential'' of a complex manifold with coordinates UI=12(PI+iZI), then it provides a K\"ahler metric of an hyperk\"ahler manifold which describes the hypermultiplet geometry obtained by c-map from the original n-dimensional special K\"ahler structure.

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