Edge Decompositions of Hypercubes by Paths

Many authors have investigated edge decompositions of graphs by the edge sets of isomorphic copies of special subgraphs. For $q$- dimensional hypercubes $Q_q$ various researchers have done this for cer- tain trees, paths, and cycles. In this paper we shall say that "$H$ divides $G$" if $E(G)$ is the disjoint union of $\{fE(H_i) | H_i \simeq H\}$. Our main result is that for $q$ odd and $q < 2^{32}$, the path of length $m$, $P_m$, divides $Q_q$ if and only if $m \leq q$ and $m | (q \times 2^{q-1})$.