We say that a <math> k </math>-graph <math> \mathcal{H}^{(k)} </math> is <math> (\delta_k, r) </math>-regular with respect to a family of partitions <math> \mathcal{P} </math> if all but at most <math> \delta_k n^k </math> <math> k- </math>edges <math> K </math> of <math> \mathcal{H}^{(k)} </math> have the property that <math> K \in \mathcal{K}_k(\mathcal{G}^{(1)}) </math> and if <math> \mathbf{P} = \{P^{(j)}\}_{j=1}^{k-1} </math> is unique <math> (k, k-1) </math>-complex for which <math> K \in \mathcal{K}_k(P^{(k-1)}) </math>, then <math> \mathcal{H}^{(k)} </math> is <math> (\delta_k, d(\mathcal{H}^{(k)} \vert P^{(k-1)}), r) </math> regular with respect to <math> \mathcal{P} </math>.
