Paired 2-disjoint path covers of burnt pancake graphs with faulty elements
Abstract
The burnt pancake graph BPn is the Cayley graph of the hyperoctahedral group using prefix reversals as generators. Let \u,v\ and \x,y\ be any two pairs of distinct vertices of BPn for n≥ 4. We show that there are u-v and x-y paths whose vertices partition the vertex set of BPn even if BPn has up to n-4 faulty elements. On the other hand, for every n3 there is a set of n-2 faulty edges or faulty vertices for which such a fault-free disjoint path cover does not exist.
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