9 research outputs found
Antibandwidth of Complete k-ary Trees
AbstractThe antibandwidth problem is to label vertices of a n-vertex graph injectively by 1,2,3,…n, so that the minimum difference between labels of adjacent vertices is maximised. The problem is motivated by the obnoxious facility location problem, radiocolouring, work and game scheduling and is dual to the well known bandwidth problem. We prove exact results for the antibandwidth of complete k-ary trees, k even, and estimate the parameter for odd k up to the second order term. This extends previous results for complete binary trees
Antibandwidth of Complete k-Ary Trees
The antibandwidth problem is to label vertices of a n-vertex graph injectively by 1, 2, 3,... n, such that the minimum difference of labels of adjacent vertices is maximised. The problem is motivated by obnoxious facility location problem, radiocolouring, work and game scheduling and is dual to the well known bandwidth problem. We prove exact results for the antibandwidth of complete k-ary trees, k even, and estimate the parameter for odd k up to the second order term. This extends previous results for complete binary trees
Antibandwidth of Complete k-Ary Trees
The antibandwidth problem is to label vertices of a n-vertex graph injectively by 1, 2, 3, ... n, such that the minimum difference of labels of adjacent vertices is maximised. The problem is motivated by obnoxious facility location problem, radiocolouring, work and game scheduling and is dual to the well known bandwidth problem. We prove exact results for the antibandwidth of complete k-ary trees, k even, and estimate the parameter for odd k up to the second order term. This extends previous results for complete binary trees. © 2006 Elsevier B.V. All rights reserved
Antibandwidth of complete k-ary trees
AbstractThe antibandwidth problem is to label vertices of a n-vertex graph injectively by 1,2,3,…n, so that the minimum difference between labels of adjacent vertices is maximised. The problem is motivated by the obnoxious facility location problem, radiocolouring, work and game scheduling and is dual to the well known bandwidth problem. We prove exact results for the antibandwidth of complete k-ary trees, k even, and estimate the parameter for odd k up to the second order term. This extends previous results for complete binary trees