Fourier-Mukai transforms, mirror symmetry, and generalized K3 surfaces

Abstract: We study generalized complex structures on K3 surfaces, in the sense of Hitchin. For each real parameter t between one and infinity we exhibit two families of generalized K3 surfaces, (M,cal{I}{zeta}) and (M,cal{J}{zeta}), parametrized by zeta in CP^1, which are Mukai dual for zeta=0 and infinity, amd mirror partners for zeta not equal to 0 and infinity. Moreover, the Fourier-Mukai equivalence D^b(M,cal{I}_0) -> D^b(M,cal{J}_0) induces an isomorphism phi_T between the spaces of first order deformations of (M,cal{I}0) and (M,cal{J}_0) as generalized complex manifolds, and the deformations (M,cal{I}{zeta}) and (M,cal{J}_{zeta}) agree under phi_T, up to a B-field correction which vanishes in the limit t -> infinity.