Equivalence of labeled graphs and lattices
Abstract
In 1973, Harary and Palmer posed the problem of enumeration of labeled graphs on n ≥ 1 unisolated vertices and l ≥ 0 edges. In 1997, Bender et al.\ obtained a recurrence relation representing the sequence A054548(OEIS) of labeled graphs on n ≥ 0 unisolated vertices containing q ≥ n2 edges. In 2020, Bhavale and Waphare obtained a recurrence relation representing the sequence of fundamental basic blocks on n ≥ 0 comparable reducible elements, having nullity l ≥ n+12 . In this paper, we prove the equivalence of these two sequences. We also provide an edge labeling for a given vertex labeled finite simple graph.
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