Bratteli–Vershik diagram

In mathematics, a Bratteli–Veršik diagram is an ordered, essentially simple Bratteli diagram (V, E) with a homeomorphism on the set of all infinite paths called the Veršhik transformation. It is named after Ola Bratteli and Anatoly Vershik.

Definition

Let X = {(e1, e2, ...) | ei  Ei and r(ei) = s(ei+1)} be the set of all paths in (V, E). Let Emin be the set of all minimal edges in E, similarly let Emax be the set of all maximal edges. Let y be the unique infinite path in Emax.

The Veršhik transformation is a homeomorphism φ : X  X defined such that φ(x) is the unique minimal path if x = y. Otherwise x = (e1, e2,...) | ei  Ei where at least one ei  Emax. Let k be the smallest such integer. Then φ(x) = (f1, f2, ..., fk−1, ek + 1, ek+1, ... ), where ek + 1 is the successor of ek in the total ordering of edges incident on r(ek) and (f1, f2, ..., fk−1) is the unique minimal path to ek + 1.

The Veršhik transformation allows us to construct a pointed topological system (X, φ, y) out of any given ordered, essentially simple Bratteli diagram. The reverse construction is also defined.

Equivalence

The notion of graph minor can be promoted from a well-quasi-ordering to an equivalence relation if we assume the relation is symmetric. This is the notion of equivalence used for Bratteli diagrams.

The major result in this field is that equivalent essentially simple ordered Bratteli diagrams correspond to topologically conjugate pointed dynamical systems. This allows us apply results from the former field into the latter and vice versa.[1]

gollark: How would you have a chance of something happening which is *above* 1?
gollark: There are 8 of those, so multiply by 8.
gollark: Basically, with the (1/6) * (5/6)^7, you are calculating the probability of one particular outcome where you get one six and 7 notsixes.
gollark: Sum what?
gollark: https://www4d.wolframalpha.com/Calculate/MSP/MSP2455164a65cf7ge765eb00001ageb44fb884861c?MSPStoreType=image/gif&s=16

See also

Notes

  1. Herman, Richard H. and Putnam, Ian F. and Skau, Christian F.Ordered Bratteli diagrams, dimension groups and topological dynamics. International Journal of Mathematics, volume 3, number 6. 1992, pp. 827–864.

Further reading

  • Dooley, Anthony H. (2003). "Markov odometers". In Bezuglyi, Sergey; Kolyada, Sergiy (eds.). Topics in dynamics and ergodic theory. Survey papers and mini-courses presented at the international conference and US-Ukrainian workshop on dynamical systems and ergodic theory, Katsiveli, Ukraine, August 21–30, 2000. Lond. Math. Soc. Lect. Note Ser. 310. Cambridge: Cambridge University Press. pp. 60–80. ISBN 0-521-53365-1. Zbl 1063.37005.
This article is issued from Wikipedia. The text is licensed under Creative Commons - Attribution - Sharealike. Additional terms may apply for the media files.