We prove that, on a planar regular domain, suitably scaled functionals of Ginzburg–Landau type, given by the sum of quadratic fractional Sobolev seminorms and a penalization term vanishing on the unitary sphere, gamma-converge to vortex-type energies with respect to the flat convergence of Jacobians. The compactness and the gamma
-lim inf follow by comparison with standard Ginzburg–Landau functionals depending on Riesz potentials. The gamma-lim sup, instead, is achieved via a direct argument by joining a finite number of vortex-like functions suitably truncated around the singularity.
