Abstrakt
A distance magic labeling of a graph G is a bijective assignment of labels from {1, 2,..., |V (G)|} to the vertices of G such that the sum of labels on neighbors of u is the same for all vertices u. We show that the n-dimensional hypercube has a distance magic labeling for every n ≡ 2(mod 4).
It is known that this condition is also necessary. This completes solution of a conjecture posed by Acharya et al.