From: Martin Mares Date: Sun, 20 Jan 2008 19:27:42 +0000 (+0100) Subject: Intro to minor-closed classes. X-Git-Tag: printed~286 X-Git-Url: http://mj.ucw.cz/gitweb/?a=commitdiff_plain;h=75dd5f6645a8436791094fec6aa2ea67dd36a8e5;p=saga.git Intro to minor-closed classes. --- diff --git a/macros.tex b/macros.tex index 52b30c5..ca99e44 100644 --- a/macros.tex +++ b/macros.tex @@ -302,6 +302,7 @@ \def\impl{\proclaim{Implementation}} \def\cor{\proclaim{Corollary}} \def\nota{\proclaim{Notation}} +\def\example{\proclaim{Example}} \def\label#1{{\sl (#1)\/}\enspace} diff --git a/mst.tex b/mst.tex index 9062e2e..848d61a 100644 --- a/mst.tex +++ b/mst.tex @@ -480,7 +480,7 @@ formulations and proofs, which we preferred to avoid. We also note that most of the algorithms can be run on disconnected multigraphs with little or no modifications. -\algn{Contracting version of Bor\o{u}vka's algorithm} +\algn{Contractive version of Bor\o{u}vka's algorithm} \algo \algin A~graph~$G$ with an edge comparison oracle. \:$T\=\emptyset$. @@ -510,7 +510,7 @@ $\O(n+m)=\O(m)$. \qed \thm -The Contracting Bor\o{u}vka's algorithm finds the MST in time $\O(m\log n)$. +The Contractive Bor\o{u}vka's algorithm finds the MST in time $\O(m\log n)$. \proof As in the original Bor\o{u}vka's algorithm, the number of phases is $\O(\log n)$. @@ -518,7 +518,7 @@ Then apply the previous lemma. \qed \thmn{\cite{mm:mst}} -When the input graph is planar, the Contracting Bor\o{u}vka's algorithm runs in +When the input graph is planar, the Contractive Bor\o{u}vka's algorithm runs in time $\O(m)$. \proof @@ -646,11 +646,40 @@ edges as every $H_{a,k}$ contains a complete graph on~$a$ vertices. \section{Minor-closed graph classes} -The contracting algorithm given in the previous section has been found to preform -well on planar graphs. On the other hand, the bound $\O(m\log n)$ on general graphs -is tight. +The contracting algorithm given in the previous section has been found to perform +well on planar graphs, but in the general case its time complexity was not linear. +Can we find some broader class of graphs where the algorithm is still efficient? +The right context turns out to be the minor-closed graph classes, which are +closed on contractions and have bounded density. + +\defn +A~graph~$H$ is a \df{minor} of a~graph~$G$ iff it can be obtained +from a subgraph of~$G$ by a sequence of graph contractions (see \thmref{simpcont}). + +\defn +A~class~$\cal C$ of graphs is \df{minor-closed}, when for every $G\in\cal C$ and +its minor~$H$, the graph~$H$ lies in~$\cal C$ as well. A~class~$\cal C$ is called +\df{non-trivial} if at least one graph lies in~$\cal C$ and at least one lies outside~$\cal C$. + +\example +Non-trivial minor-closed classes include planar graphs and more generally graphs +embeddable in any fixed surface. Many nice properties of planar graphs extend +to these classes, too, most notable the linearity of the number of edges. + +\defn +Let $\cal C$ be a class of graphs. We define its \df{edge density} $\varrho(\cal C)$ +to be the infimum of all~$\varrho$'s such that $\vert E(G) \vert \le \varrho\cdot\vert V(G)\vert$ +holds for every $G\in\cal C$. + +\thmn{Density of minor-closed classes} +A~minor-closed class of graphs has finite edge density if and only if it is +a non-trivial class. + +\proof +See Theorem 6.1 in \cite{nesetril:minors}, which also lists some other equivalent conditions. +\qed + -\cite{nesetril:minors} \section{Using Fibonacci heaps} \secid{fibonacci}