Hamiltonian Sets of Polygonal Paths in Assembly Graphs

Abstract

We provide four equivalent combinatorial conditions for a simple assembly graph (rigid vertex graph where all vertices are of degree 1 or 4) to have the largest number of Hamiltonian sets of polygonal paths relative its size. These conditions serve to prove the conjecture that such maximum, which is equal to F2n+1-1, where Fk denotes the kth Fibonacci number, is achieved only for special assembly graphs, called tangled cords.

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