is aviable in ;http://www.wbabin.net/science/mimouni2e.pdf

On 14 juil, 19:25, Miroslav Balaz <gpsla...@googlemail.com> wrote:
> Graph isomorphism is not very good problem, because for human generated
> graphs the algorithhm for tree-isomprphism wlll work.
> But that is only my personal opinion.
>
> But it is hard to understand your algorithm.
> Mainly because i do not understand the words you are using
> peak-?
> summit-?
> pseudo tree-?
> stoppage-?
> nhbm-?
> Also you have there a lot of errors( i do not mean englis erros)
> You should rework that, i was rewriting my master's thesis proofs at least 3
> times each.
>
> 2009/7/14 mimouni <mimouni.moha...@gmail.com>
>
>
>
>
>
> > Hello, I found a new labeling vertex, which can make the deference
> > between the peaks of a graph, and thus resolve the automorphism and
> > isomorphism. Its complexity is estimated to O (n^3).
> > And here is the procedure:
> > To build a pseudo tree this way:
> > 1. Put a single vertices (example: A) in the Level 1.
> > 2. Putting all the peaks surrounding the vertices An in Level 2. And
> > not forgetting the edges.
> > 3. Putting all the peaks adjacent to each vertex exists in the
> > nouveau2, and without duplication and without forgetting the edges.
> > In
> > the level 3.
> > 4. Repeat Step 3 until more vertices.
> > Labeling the vertices; is therefore in this way:
> > 1. in built all the pseudo trees.
> > 2. In seeking pseudo tree that’s a vertices lies in the level x.
> > 3. Labeling the vertices in the A-level x is composed of four parts:
> > the number of times or A lies in the level x, the total number of
> > stoppages A up, the total number of stoppages in the same A level,
> > and
> > finally the total number of stoppages A down.
> > 4. And labeling a vertex is the labeling on all levels.
> > Making the deference between A and B.
> > the two vertices A and B are isomorphism between waters if they both
> > have the same labeling.
> > If the labeling of A in a level x is deferential to the labeling of B
> > at the same level, then A and B are deferens.
> > ========================
> > Validity of the algorithm
> > The demonstration validation of this algorithm is trivial!
> > Theorem Let A and B, two peaks in a graph G. function of the
> > automorphism of G to G is noted f.
> > f (A) = B if and only if, A and B have the same labeling.
> > Proof 1) f (A) = B.
> > Here we will show that A and B on the same labeling. Let x and two
> > other top graph G, such that f (x) = y. Labeling is based on pseudo-
> > tree, so if the tree with pseudo-header as x, A is in the p, and B is
> > in the level q. then the automorphism keeps the distance, then:
> > For the pseudo-tree with it as header, B is in the p, and A is in the
> > level q.
> > With the same idea was for the pseudo-tree x, adjacent to A summits
> > are divided into three parts (top, at the same level as A, and
> > bottom), then the pseudo-tree there, the adjacent peaks B are also
> > divided into three parts (top, at the same level as B, and bottom).
> > So the two summits: A and B have the same labeling
> > 2) A and B have the same labeling.
> > If the labeling of A in the pseudo-tree x is nhmb, labeling B in the
> > pseudo-tree is also: n hmb because it af (x) = y. with the same idea
> > (the automorphism keeps distance), we find that f (A) = B.
> > So: f (A) = B if and only if, A and B have the same labeling.
> > Complexity of the algorithm
> > the complexity of a pseudo-tree is O(n²).
> > the complexity of all pseudo is so O(n³).
> > the complexity of labeling a summit from a pseudo-tree is O(n).
> > the complexity of the labeling is a summit O(n²).
> > So the algorithm is polynomial
> > =======
> > implementation
> > an application in beta (for small graphs) in php is available on:
> >http://mohamed.mimouni1.free.fr/
> > and for big graphs is avaibles on:
> >http://sites.google.com/site/isomorphismproject/

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