Shallow minor
In graph theory, a shallow minor or limited-depth minor is a restricted form of a graph minor in which the subgraphs that are contracted to form the minor have small diameter. Shallow minors were introduced by Plotkin, Rao & Smith (1994), who attributed their invention to Charles E. Leiserson and Sivan Toledo.[1]
Definition
One way of defining a minor of an undirected graph G is by specifying a subgraph H of G, and a collection of disjoint subsets Si of the vertices of G, each of which forms a connected induced subgraph Hi of H. The minor has a vertex vi for each subset Si, and an edge vivj whenever there exists an edge from Si to Sj that belongs to H.
In this formulation, a d-shallow minor (alternatively called a shallow minor of depth d) is a minor that can be defined in such a way that each of the subgraphs Hi has radius at most d, meaning that it contains a central vertex ci that is within distance d of all the other vertices of Hi. Note that this distance is measured by hop count in Hi, and because of that it may be larger than the distance in G.[1]
Special cases
Shallow minors of depth zero are the same thing as subgraphs of the given graph. For sufficiently large values of d (including all values at least as large as the number of vertices), the d-shallow minors of a given graph coincide with all of its minors.[1]
Classification of graph families
Nešetřil & Ossona de Mendez (2012) use shallow minors to partition the families of finite graphs into two types. They say that a graph family F is somewhere dense if there exists a finite value of d for which the d-shallow minors of graphs in F consist of every finite graph. Otherwise, they say that a graph family is nowhere dense.[2] This terminology is justified by the fact that, if F is a nowhere dense class of graphs, then (for every ε > 0) the n-vertex graphs in F have O(n1 + ε) edges; thus, the nowhere dense graphs are sparse graphs.[3]
Separator theorems
As Plotkin, Rao & Smith (1994) showed, graphs with excluded shallow minors can be partitioned analogously to the planar separator theorem for planar graphs. In particular, if the complete graph Kh is not a d-shallow minor of an n-vertex graph G, then there exists a subset S of G, with size O(dh2 log n + n/d), such that each connected component of G\S has at most 2n/3 vertices. The result is constructive: there exists a polynomial time algorithm that either finds such a separator, or a d-shallow Kh minor.[4] As a consequence they showed that every minor-closed graph family obeys a separator theorem almost as strong as the one for planar graphs.
Plotkin et al. also applied this result to the partitioning of finite element method meshes in higher dimensions; for this generalization, shallow minors are necessary, as (with no depth restriction) the family of meshes in three or more dimensions has all graphs as minors. Teng (1998) extends these results to a broader class of high-dimensional graphs.
Notes
- ↑ 1.0 1.1 1.2 Nešetřil & Ossona de Mendez (2012), Section 4.2 "Shallow Minors", pp. 62–65.
- ↑ Nešetřil & Ossona de Mendez (2012), section 5.3 "Classification of Classes by Clique Minors", pp. 100–102.
- ↑ Nešetřil & Ossona de Mendez (2012), Theorem 5.3, p. 100.
- ↑ The algorithm of Plotkin et al. takes time O(mn/d), where m is the number of edges in the input. Wulff-Nilsen (2011) improved this for non-sparse graphs to O(m + n2 + ε/d).
References
- Plotkin, Serge; Rao, Satish; Smith, Warren D. (1994), "Shallow excluded minors and improved graph decompositions", Proc. 5th ACM-SIAM Symp. on Discrete Algorithms (SODA), pp. 462–470.
- Teng, Shang-Hua (1998), "Combinatorial aspects of geometric graphs", Comput. Geom. 9 (4): 277–287, doi:10.1016/S0925-7721(96)00008-9, MR 1609578.
- Wulff-Nilsen, Christian (2011), "Separator Theorems for Minor-Free and Shallow Minor-Free Graphs with Applications", Proc. 52nd IEEE Symp. Foundations of Computer Science (FOCS), pp. 37–46, arXiv:1107.1292, doi:10.1109/FOCS.2011.15.
- Nešetřil, Jaroslav; Ossona de Mendez, Patrice (2012), Sparsity: Graphs, Structures, and Algorithms, Algorithms and Combinatorics 28, Springer, doi:10.1007/978-3-642-27875-4, ISBN 978-3-642-27874-7, MR 2920058.