For a topological space $X$ and a subspace $A$, let $Q_n(X,A)$ be the group of singular cubical $n$-chains of $X$ relative to $A$ and let $D_n(X,A)$ be the subgroup of degenerate cubical chains. The homology of the quotient complex $Q_{\bullet}(X,A)/D_{\bullet}(X,A)$ is then isomorphic to ordinary singular homology (I think this is from Serre's thesis?).
However, as far as I can tell the homology groups of $Q_{\bullet}(X,A)$ satisfy all the axioms of a homology theory except the dimension axiom, where it is easy to see that $H_k(Q_{\bullet}(\text{pt},\emptyset))$ is $\mathbb{Z}$ for all $k \geq 0$.
Question: what homology theory is computed by $Q_{\bullet}(X,A)$?
