论文信息 - Triangular embeddings of complete graphs from graceful labellings of paths

Triangular embeddings of complete graphs from graceful labellings of paths

We show that to each graceful labelling of a path on 2s+1 vertices, s>=2, there corresponds a current assignment on a 3-valent graph which generates at least 2^2^s cyclic oriented triangular embeddings of a complete graph on 12s+7 vertices. We also show that in this correspondence, two distinct graceful labellings never give isomorphic oriented embeddings. Since the number of graceful labellings of paths on 2s+1 vertices grows asymptotically at least as fast as (5/3)^2^s, this method gives at least 11^s distinct cyclic oriented triangular embedding of a complete graph of order 12s+7 for all sufficiently large s.

Jozef Sirán | R. Bruce Richter | Luis A. Goddyn

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