Soliton almost K\"{a}hler structures on 6-dimensional nilmanifolds for the symplectic curvature flow

The aim of this paper is to study self-similar solutions to the symplectic cuvature flow on 6-dimensional nilmanifolds. For this purpose, we focus our attention in the family of symplectic Two- and Three-step nilpotent Lie algebras admitting a "minimal compatible metric" and we give a complete classification of these algebras together with their respective metric. Such classification is given by using our generalization of Nikolayevsky's nice basis criterium (arXiv:1301.4949), which will be repeated here in the context of canonical compatible metrics for geometric structures on nilmanifolds, for the convenience of the reader. By computing the Chern-Ricci operator $P$ in each case, we show that the above distinguished metrics define a soliton almost K\"{a}hler structure. Many illustrative examples are carefully developed.