Recently, research on parallel processing systems is very active, and many complex topologies have been proposed. A burnt pancake graph is one such topology. In this paper, we prove that a faulty burnt pancake graph with degree n has a fault-free Hamiltonian cycle if the number of the faulty elements is n-2 or less, and it has a fault-free Hamiltonian path between any pair of nonfaulty nodes if the number of the faulty elements is n-3 or less.
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Keiichi KANEKO, "Hamiltonian Cycles and Hamiltonian Paths in Faulty Burnt Pancake Graphs" in IEICE TRANSACTIONS on Information,
vol. E90-D, no. 4, pp. 716-721, April 2007, doi: 10.1093/ietisy/e90-d.4.716.
Abstract: Recently, research on parallel processing systems is very active, and many complex topologies have been proposed. A burnt pancake graph is one such topology. In this paper, we prove that a faulty burnt pancake graph with degree n has a fault-free Hamiltonian cycle if the number of the faulty elements is n-2 or less, and it has a fault-free Hamiltonian path between any pair of nonfaulty nodes if the number of the faulty elements is n-3 or less.
URL: https://globals.ieice.org/en_transactions/information/10.1093/ietisy/e90-d.4.716/_p
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@ARTICLE{e90-d_4_716,
author={Keiichi KANEKO, },
journal={IEICE TRANSACTIONS on Information},
title={Hamiltonian Cycles and Hamiltonian Paths in Faulty Burnt Pancake Graphs},
year={2007},
volume={E90-D},
number={4},
pages={716-721},
abstract={Recently, research on parallel processing systems is very active, and many complex topologies have been proposed. A burnt pancake graph is one such topology. In this paper, we prove that a faulty burnt pancake graph with degree n has a fault-free Hamiltonian cycle if the number of the faulty elements is n-2 or less, and it has a fault-free Hamiltonian path between any pair of nonfaulty nodes if the number of the faulty elements is n-3 or less.},
keywords={},
doi={10.1093/ietisy/e90-d.4.716},
ISSN={1745-1361},
month={April},}
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TY - JOUR
TI - Hamiltonian Cycles and Hamiltonian Paths in Faulty Burnt Pancake Graphs
T2 - IEICE TRANSACTIONS on Information
SP - 716
EP - 721
AU - Keiichi KANEKO
PY - 2007
DO - 10.1093/ietisy/e90-d.4.716
JO - IEICE TRANSACTIONS on Information
SN - 1745-1361
VL - E90-D
IS - 4
JA - IEICE TRANSACTIONS on Information
Y1 - April 2007
AB - Recently, research on parallel processing systems is very active, and many complex topologies have been proposed. A burnt pancake graph is one such topology. In this paper, we prove that a faulty burnt pancake graph with degree n has a fault-free Hamiltonian cycle if the number of the faulty elements is n-2 or less, and it has a fault-free Hamiltonian path between any pair of nonfaulty nodes if the number of the faulty elements is n-3 or less.
ER -