Difference between revisions of "Factorization"
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''in graph theory'' | ''in graph theory'' | ||
− | The decomposition of a [[ | + | The decomposition of a [[graph]] into edge-disjoint spanning subgraphs of a special form. In the general case a factor is a spanning subgraph with a given property. An example of such a property is [[Regular graph|regularity]]. A regular spanning subgraph of degree $k$ is called a $k$-factor; a $1$-factor is also called a perfect matching. A graph is called $k$-factorizable (or $k$-factorable) if it can be represented as a union of edge-disjoint $k$-factors. |
− | In graph theory one considers questions on the existence of factors of one type or another in an arbitrary graph, on the number of factors, and on the possibility of a factorization of a given type for different classes of graphs. It is known, for example, that a complete graph with an even number of vertices and a complete bipartite graph | + | In graph theory one considers questions on the existence of factors of one type or another in an arbitrary graph, on the number of factors, and on the possibility of a factorization of a given type for different classes of graphs. It is known, for example, that a [[complete graph]] with an even number of vertices and a [[complete bipartite graph]] with the same number of vertices in each part are $1$-factorizable. A connected graph is $2$-factorizable if and only if it is a regular graph of even degree. A graph $G$ has a $1$-factor if and only if it has an even number of vertices and if there is no subset of vertices $U$ such that the number of components with an odd number of vertices of the graph $G\setminus U$, obtained from $G$ by deleting the vertices of $U$, exceeds $|U|$. Every two-connected regular graph of degree 3 can be decomposed into a $1$-factor and a $2$-factor which are edge-disjoint. |
Examples of non-regular factors are spanning trees (cf. [[Tree|Tree]]) and forests, spanning planar subgraphs (see [[Graph imbedding|Graph imbedding]]), etc. Connected with the decomposition of a graph into spanning forests is the numerical characteristic called the arboricity; this is the least number of edge-disjoint spanning forests whose union is the graph. The arboricity of an arbitrary graph $G$ is equal to | Examples of non-regular factors are spanning trees (cf. [[Tree|Tree]]) and forests, spanning planar subgraphs (see [[Graph imbedding|Graph imbedding]]), etc. Connected with the decomposition of a graph into spanning forests is the numerical characteristic called the arboricity; this is the least number of edge-disjoint spanning forests whose union is the graph. The arboricity of an arbitrary graph $G$ is equal to | ||
− | $$\max_k | + | $$\max_k\left\lbrace\frac{g_k}{k-1}\right\rbrace,$$ |
where $g_k$ is the largest number of edges in the $k$-vertex subgraphs of $G$. | where $g_k$ is the largest number of edges in the $k$-vertex subgraphs of $G$. | ||
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====Comments==== | ====Comments==== | ||
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====References==== | ====References==== | ||
− | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> | + | <table> |
+ | <TR><TD valign="top">[1]</TD> <TD valign="top"> F. Harary, "Graph theory" , Addison-Wesley (1969) pp. Chapt. 9</TD></TR> | ||
+ | <TR><TD valign="top">[a1]</TD> <TD valign="top"> J. Petersen, "Die theorie der regulären Graphen" ''Acta. Math.'' , '''15''' (1891) pp. 193–220 {{ZBL|23.0115.03}}</TD></TR> | ||
+ | <TR><TD valign="top">[a2]</TD> <TD valign="top"> W.T. Tutte, "Graph factors" ''Combinatorica'' , '''1''' (1981) pp. 79–97</TD></TR> | ||
+ | <TR><TD valign="top">[a3]</TD> <TD valign="top"> J. Akiyama, M. Kano, "Factors and factorizations of graphs - a survey" ''J. Graph Theory'' , '''9''' (1985) pp. 1–42</TD></TR> | ||
+ | </table> |
Latest revision as of 19:41, 21 March 2024
2020 Mathematics Subject Classification: Primary: 05C70 [MSN][ZBL]
in graph theory
The decomposition of a graph into edge-disjoint spanning subgraphs of a special form. In the general case a factor is a spanning subgraph with a given property. An example of such a property is regularity. A regular spanning subgraph of degree $k$ is called a $k$-factor; a $1$-factor is also called a perfect matching. A graph is called $k$-factorizable (or $k$-factorable) if it can be represented as a union of edge-disjoint $k$-factors.
In graph theory one considers questions on the existence of factors of one type or another in an arbitrary graph, on the number of factors, and on the possibility of a factorization of a given type for different classes of graphs. It is known, for example, that a complete graph with an even number of vertices and a complete bipartite graph with the same number of vertices in each part are $1$-factorizable. A connected graph is $2$-factorizable if and only if it is a regular graph of even degree. A graph $G$ has a $1$-factor if and only if it has an even number of vertices and if there is no subset of vertices $U$ such that the number of components with an odd number of vertices of the graph $G\setminus U$, obtained from $G$ by deleting the vertices of $U$, exceeds $|U|$. Every two-connected regular graph of degree 3 can be decomposed into a $1$-factor and a $2$-factor which are edge-disjoint.
Examples of non-regular factors are spanning trees (cf. Tree) and forests, spanning planar subgraphs (see Graph imbedding), etc. Connected with the decomposition of a graph into spanning forests is the numerical characteristic called the arboricity; this is the least number of edge-disjoint spanning forests whose union is the graph. The arboricity of an arbitrary graph $G$ is equal to
$$\max_k\left\lbrace\frac{g_k}{k-1}\right\rbrace,$$
where $g_k$ is the largest number of edges in the $k$-vertex subgraphs of $G$.
Comments
A spanning subgraph of a graph $G=(V,E)$ is a subgraph $G_1=(V_1,E_1)$ whose set of vertices $V_1$ is equal to the set of vertices $V$ of $G$.
The $1$-factor theorem quoted above is due to W.T. Tutte. Given a vertex function $f$, a factor $F$ is called an $f$-factor if $d(v|F)=f(x)$ for every $v\in V$, the vertex set of $G$. Tutte also proved an $f$-factor theorem. The results on $2$-factors mentioned above are due to J. Petersen [a1]. A comprehensive treatment of all these results is given by Tutte in [a2]. A recent survey is [a3].
References
[1] | F. Harary, "Graph theory" , Addison-Wesley (1969) pp. Chapt. 9 |
[a1] | J. Petersen, "Die theorie der regulären Graphen" Acta. Math. , 15 (1891) pp. 193–220 Zbl 23.0115.03 |
[a2] | W.T. Tutte, "Graph factors" Combinatorica , 1 (1981) pp. 79–97 |
[a3] | J. Akiyama, M. Kano, "Factors and factorizations of graphs - a survey" J. Graph Theory , 9 (1985) pp. 1–42 |
Factorization. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Factorization&oldid=32464