Reconfiguring Independent Sets on Interval Graphs
Abstract
We study reconfiguration of independent sets in interval graphs under the token sliding rule. We show that if two independent sets of size k are reconfigurable in an n-vertex interval graph, then there is a reconfiguration sequence of length O(k· n2). We also provide a construction in which the shortest reconfiguration sequence is of length (k2· n). As a counterpart to these results, we also establish that Independent Set Reconfiguration is PSPACE-hard on incomparability graphs, of which interval graphs are a special case.
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