Abstract
A class of graphs, called cage-amalgamation graphs, that is contained in weakly modular and fiber-complemented graphs and contains median and chordal graphs, is introduced and characterized in several ways. A variation of the Hamming polynomial is also introduced and used in obtaining two tree-like equalities for these graphs, that were previously known for both chordal and median graphs. The first equality is ∑ i ≥ 0 ( − 1 ) i ρ i ( G ) = 1 , where ρ i ( G ) is the number of i -regular Hamming subgraphs in a cage-amalgamation graph G .
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