Pebbling on C4k+3× G and M(C2n)× G

Abstract

The pebbling number of a graph G, f(G), is the least p such that, however p pebbles are placed on the vertices of G, we can move a pebble to any vertex by a sequence of moves, each move taking two pebbles off one vertex and placing one on an adjacent vertex. It is conjectured that for all graphs G and H, f(G× H)≤ f(G)f(H). If the graph G satisfies the odd two-pebbling property, we will prove that f(C4k+3× G)≤ f(C4k+3)f(G) and f(M(C2n)× G)≤ f(M(C2n))f(G), where C4k+3 is the odd cycle of order 4k+3 and M(C2n) is the middle graph of the even cycle C2n.