XNLP-completeness for Parameterized Problems on Graphs with a Linear Structure
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In this paper, we show several parameterized problems to be complete for the class XNLP: parameterized problems that can be solved with a non-deterministic algorithm that uses f(k)log n space and f(k)n^c time, with f a computable function, n the input size, k the parameter and c a constant. The problems include Maximum Regular Induced Subgraph and Max Cut parameterized by linear clique-width, Capacitated (Red-Blue) Dominating Set parameterized by pathwidth, Odd Cycle Transversal parameterized by a new parameter we call logarithmic linear clique-width (defined as k/log n for an n-vertex graph of linear clique-width k), and Bipartite Bandwidth.
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