On switching classes, NLC-width, cliquewidth and treewidth
نویسندگان
چکیده
In this paper we consider a connection between switching (of undirected graphs), and the notions of NLC-width, cliquewidth and treewidth. In particular, we show that the NLC-widths and the cliquewidths of two graphs in a switching class are at most a constant factor apart (2 for the former, 4 for the latter). A similar result can be shown not to hold for treewidth: it is easy to find a switching classes in which the distance between the lowest treewidth and the highest is dependent on the number of vertices of the graph. We also show that for NLC-width every width between the lowest and the highest of the switching class is attained by some graph in that switching class. We prove that this also holds for treewidth.
منابع مشابه
Some probabilistic results on width measures of graphs
Fixed parameter tractable (FPT) algorithms run in time f(p(x)) poly(|x|), where f is an arbitrary function of some parameter p of the input x and poly is some polynomial function. Treewidth, branchwidth, cliquewidth, NLC-width, rankwidth, and booleanwidth are parameters often used in the design and analysis of such algorithms for problems on graphs. We show asymptotically almost surely (aas), b...
متن کاملOn a Disparity Between Relative Cliquewidth and Relative NLC - width by Haiko Müller & Ruth Urner December 2008
Cliquewidth and NLC-width are two closely related parameters that measure the complexity of graphs. Both cliqueand NLC-width are defined to be the minimum number of labels required to create a labelled graph by certain terms of operations. Many hard problems on graphs become solvable in polynomial time if the inputs are restricted to graphs of bounded cliqueor NLC-width. Cliquewidth and NLC-wid...
متن کاملOn a disparity between relative cliquewidth and relative NLC-width
Cliquewidth and NLC-width are two closely related parameters that measure the complexity of graphs. Both cliqueand NLC-width are defined to be the minimum number of labels required to create a labelled graph by certain terms of operations. Many hard problems on graphs become solvable in polynomial-time if the inputs are restricted to graphs of bounded cliqueorNLC-width. Cliquewidth andNLC-width...
متن کاملThe NLC-width and clique-width for powers of graphs of bounded tree-width
The k-power graph of a graph G is a graphwith the same vertex set as G, in that two vertices are adjacent if and only if, there is a path between them in G of length at most k. A k-treepower graph is the k-power graph of a tree, a k-leaf-power graph is the subgraph of some k-tree-power graph induced by the leaves of the tree. We show that (1) every k-tree-power graph has NLC-width at most k + 2...
متن کاملCliquewidth and Knowledge Compilation
In this paper we study the role of cliquewidth in succinct representation of Boolean functions. Our main statement is the following: Let Z be a Boolean circuit having cliquewidth k. Then there is another circuit Z∗ computing the same function as Z having treewidth at most 18k+2 and which has at most 4|Z| gates where |Z| is the number of gates of Z. In this sense, cliquewidth is not more ‘powerf...
متن کاملذخیره در منابع من
با ذخیره ی این منبع در منابع من، دسترسی به آن را برای استفاده های بعدی آسان تر کنید
عنوان ژورنال:
- Theor. Comput. Sci.
دوره 429 شماره
صفحات -
تاریخ انتشار 2012