Title of article
Series parallel extensions of plane graphs to dual-eulerian graphs Original Research Article
Author/Authors
Arjana Z?itnik، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2007
Pages
8
From page
633
To page
640
Abstract
A plane graph is dual-eulerian if it has an eulerian tour with the property that the same sequence of edges also forms an eulerian tour in the dual graph. Dual-eulerian graphs are of interest in the design of CMOS VLSI circuits.
Every dual-eulerian plane graph also has an eulerian Petrie (left–right) tour thus we consider series-parallel extensions of plane graphs to graphs, which have eulerian Petrie tours. We reduce several special cases of extensions to the problem of finding hamiltonian cycles. In particular, a 2-connected plane graph G has a single series parallel extension to a graph with an eulerian Petrie tour if and only if its medial graph has a hamiltonian cycle.
Keywords
Dual eulerian graphs , Petrie walks , Series parallel extensions , Hamilton cycles , Medial graph
Journal title
Discrete Mathematics
Serial Year
2007
Journal title
Discrete Mathematics
Record number
947714
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