Reconstructing subgraph-counting graph polynomials of increasing families of graphs

A graph polynomial image is called reconstructible if it is uniquely determined by the polynomials of the vertex-deleted subgraphs of G for every graph G with at least three vertices. In this note it is shown that subgraph-counting graph polynomials of increasing families of graphs are reconstructible if and only if each graph from the corresponding defining family is reconstructible from its polynomial deck. In particular, we prove that the cube polynomial is reconstructible. Other reconstructible polynomials are the clique, the path and the independence polynomials. Along the way two new characterizations of hypercubes are obtained.