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In [[graph theory]], '''nowhere-zero flows''' are a special type of [[Flow network|network flow]] which is related (by duality) to [[graph coloring|coloring]] [[planar graphs]].
 
== Definition ==
Let ''G'' = ''(V,E)'' be a [[directed graph]] and let ''M'' be an [[abelian group]]. A map φ: ''E'' → ''M'' is a '''flow''' or an ''M''-'''flow''' if for every vertex ''v'' ∈ ''V'', it holds that
:<math>\sum_{e \in \delta^+(v)} \phi(e) = \sum_{e \in \delta^-(v)} \phi(e),</math>
where ''δ<sup>+</sup>(v)'' denotes the set of edges out of ''v'' and ''δ<sup>–</sup>(v)'' denotes the set of edges into ''v''.
Sometimes, this condition is referred to as [[Kirchhoff's circuit laws|Kirchhoff's law]].
If ''φ(e)'' ≠ 0 for every ''e'' ∈ ''E'', we call φ a '''nowhere-zero''' flow.  If ''M'' = '''Z''' is the group of integers under addition and ''k'' is a positive integer with the property that –''k'' < ''φ(e)'' < ''k'' for every edge ''e'', then the ''M''-flow φ is also called a ''k''-'''flow'''.
 
Let ''G'' = ''(V,E)'' be an undirected graph. An orientation of ''E'' is a '''modular''' ''k''-'''flow''' if
:<math>|\delta^+(v)| \equiv |\delta^-(v)| \pmod{k}</math>
for every vertex ''v'' ∈ ''V''.
 
== Properties ==
 
Modify a nowhere-zero flow φ on a graph ''G'' by choosing an edge ''e'', reversing it, and then replacing ''φ(e)'' with ''-φ(e)''.  After this adjustment, φ is still a nowhere-zero flow.  Furthermore, if φ was originally a ''k''-flow, then the resulting φ is also a ''k''-flow.  Thus, the existence of a nowhere-zero ''M''-flow or a nowhere-zero ''k''-flow is independent of the orientation of the graph.  Thus, an undirected graph ''G'' is said to have a nowhere-zero ''M''-flow or nowhere-zero ''k''-flow if some (and thus every) orientation of ''G'' has such a flow.
 
More surprisingly, if ''M'' is a finite abelian group of size ''k'', then the number of a nowhere-zero ''M''-flows in some graph does not depend on the structure of ''M'' but only on ''k'', the size of ''M''.  Furthermore, the existence of a ''M''-flow coincides with the existence of a ''k''-flow.  These two results were proved by [[Tutte]] in 1953.<ref>{{cite journal
| last = Tutte
| first = William Thomas
| authorlink = W. T. Tutte
| year = 1953
| title = A contribution to the theory of chromatic polynomials
| url = http://cms.math.ca/cjm/a144778#
}}</ref>
 
== Flow/coloring duality ==
Let ''G'' = ''(V,E)'' be a directed [[Bridge (graph theory)|bridgeless]] graph drawn in the plane, and assume that the regions of this drawing are properly ''k''-colored with the colors {0, 1, 2, .., ''k'' – 1}. Now, construct a map φ: ''E(G)'' → {–(''k'' – 1), ..., –1, 0, 1, ..., ''k'' – 1} by the following rule: if the edge ''e'' has a region of color ''x'' to the left and a region of color ''y'' to the right, then let ''φ(e)'' = ''x'' – ''y''. It is an easy exercise to show that φ is a ''k''-flow. Furthermore, since the regions were properly colored, φ is a nowhere-zero ''k''-flow. It follows from this construction, that if ''G'' and ''G*'' are planar dual graphs and ''G*'' is ''k''-colorable, then ''G'' has a nowhere-zero ''k''-flow. Tutte proved that the converse of this statement is also true.  Thus, for planar graphs, nowhere-zero flows are dual to colorings. Since nowhere-zero flows make sense for general graphs (not just graphs drawn in the plane), this study can be viewed as an extension of coloring theory for non-planar graphs.
 
== Theory ==
{{unsolved|mathematics|Does every bridgeless graph have a nowhere zero 5-flow? Does every bridgeless graph that does not have the Petersen graph as a minor have a nowhere zero 4-flow?}}
Just as no graph with a [[glossary of graph theory|loop]] edge has a proper coloring, no graph with a [[glossary of graph theory|bridge]] can have a nowhere-zero flow (in any group).  It is easy to show that every graph without a bridge has a nowhere-zero '''Z'''-flow (a form of [[Robbins theorem]]), but interesting questions arise when trying to find nowhere-zero ''k''-flows for small values of ''k''.  Two nice theorems in this direction are Jaeger's 4-flow theorem (every 4-[[glossary of graph theory|edge-connected]] graph has a nowhere-zero 4-flow)<ref>F. Jaeger, Flows and generalized coloring theorems in graphs, J. Comb. Theory Set. B, 26 (1979), 205-216.</ref> and Seymour's 6-flow theorem (every bridgeless graph has a nowhere-zero 6-flow).<ref>P. D. Seymour, Nowhere-zero 6-flows, J. Comb. Theory Ser B, 30 (1981), 130-135.</ref>
 
[[W. T. Tutte|Tutte]] conjectured that every bridgeless graph has a nowhere-zero 5-flow<ref>[http://garden.irmacs.sfu.ca/?q=op/5_flow_conjecture 5-flow conjecture], Open Problem Garden.</ref> and that every bridgeless graph that does not have the [[Petersen graph]] as a [[minor (graph theory)|minor]] has a nowhere-zero 4-flow.<ref>[http://garden.irmacs.sfu.ca/?q=op/4_flow_conjecture 4-flow conjecture], Open Problem Garden.</ref> For [[cubic graph]]s with no Petersen minor, a 4-flow is known to exist as a consequence of the [[Snark (graph theory)|snark theorem]] but for arbitrary graphs these conjectures remain open.
 
== See also ==
* [[Cycle space]]
 
==References==
{{reflist}}
* {{cite book
| last                  = Zhang
| first                = Cun-Quan
| title                = Integer Flows and Cycle Covers of Graphs
| url                  = http://www.math.wvu.edu/~cqzhang/book.html
| series                = Chapman & Hall/CRC Pure and Applied Mathematics Series
| year                  = 1997
| publisher            = Marcel Dekker, Inc.
| isbn                  = 9780824797904
| lccn                  = 96037152
}}
* T.R. Jensen and B. Toft, Graph Coloring Problems, Wiley-Interscience Serires in Discrete Mathematics and Optimization, (1995)
 
[[Category:Network flow]]

Latest revision as of 03:34, 5 December 2012

In graph theory, nowhere-zero flows are a special type of network flow which is related (by duality) to coloring planar graphs.

Definition

Let G = (V,E) be a directed graph and let M be an abelian group. A map φ: EM is a flow or an M-flow if for every vertex vV, it holds that

eδ+(v)ϕ(e)=eδ(v)ϕ(e),

where δ+(v) denotes the set of edges out of v and δ(v) denotes the set of edges into v. Sometimes, this condition is referred to as Kirchhoff's law. If φ(e) ≠ 0 for every eE, we call φ a nowhere-zero flow. If M = Z is the group of integers under addition and k is a positive integer with the property that –k < φ(e) < k for every edge e, then the M-flow φ is also called a k-flow.

Let G = (V,E) be an undirected graph. An orientation of E is a modular k-flow if

|δ+(v)||δ(v)|(modk)

for every vertex vV.

Properties

Modify a nowhere-zero flow φ on a graph G by choosing an edge e, reversing it, and then replacing φ(e) with -φ(e). After this adjustment, φ is still a nowhere-zero flow. Furthermore, if φ was originally a k-flow, then the resulting φ is also a k-flow. Thus, the existence of a nowhere-zero M-flow or a nowhere-zero k-flow is independent of the orientation of the graph. Thus, an undirected graph G is said to have a nowhere-zero M-flow or nowhere-zero k-flow if some (and thus every) orientation of G has such a flow.

More surprisingly, if M is a finite abelian group of size k, then the number of a nowhere-zero M-flows in some graph does not depend on the structure of M but only on k, the size of M. Furthermore, the existence of a M-flow coincides with the existence of a k-flow. These two results were proved by Tutte in 1953.[1]

Flow/coloring duality

Let G = (V,E) be a directed bridgeless graph drawn in the plane, and assume that the regions of this drawing are properly k-colored with the colors {0, 1, 2, .., k – 1}. Now, construct a map φ: E(G) → {–(k – 1), ..., –1, 0, 1, ..., k – 1} by the following rule: if the edge e has a region of color x to the left and a region of color y to the right, then let φ(e) = xy. It is an easy exercise to show that φ is a k-flow. Furthermore, since the regions were properly colored, φ is a nowhere-zero k-flow. It follows from this construction, that if G and G* are planar dual graphs and G* is k-colorable, then G has a nowhere-zero k-flow. Tutte proved that the converse of this statement is also true. Thus, for planar graphs, nowhere-zero flows are dual to colorings. Since nowhere-zero flows make sense for general graphs (not just graphs drawn in the plane), this study can be viewed as an extension of coloring theory for non-planar graphs.

Theory

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Here is my homepage ... new launch ec Just as no graph with a loop edge has a proper coloring, no graph with a bridge can have a nowhere-zero flow (in any group). It is easy to show that every graph without a bridge has a nowhere-zero Z-flow (a form of Robbins theorem), but interesting questions arise when trying to find nowhere-zero k-flows for small values of k. Two nice theorems in this direction are Jaeger's 4-flow theorem (every 4-edge-connected graph has a nowhere-zero 4-flow)[2] and Seymour's 6-flow theorem (every bridgeless graph has a nowhere-zero 6-flow).[3]

Tutte conjectured that every bridgeless graph has a nowhere-zero 5-flow[4] and that every bridgeless graph that does not have the Petersen graph as a minor has a nowhere-zero 4-flow.[5] For cubic graphs with no Petersen minor, a 4-flow is known to exist as a consequence of the snark theorem but for arbitrary graphs these conjectures remain open.

See also

References

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  • T.R. Jensen and B. Toft, Graph Coloring Problems, Wiley-Interscience Serires in Discrete Mathematics and Optimization, (1995)
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  2. F. Jaeger, Flows and generalized coloring theorems in graphs, J. Comb. Theory Set. B, 26 (1979), 205-216.
  3. P. D. Seymour, Nowhere-zero 6-flows, J. Comb. Theory Ser B, 30 (1981), 130-135.
  4. 5-flow conjecture, Open Problem Garden.
  5. 4-flow conjecture, Open Problem Garden.