English

Laminations with transverse measures in ordered abelian semigroups

Geometric Topology 2016-07-28 v2 Classical Analysis and ODEs Probability

Abstract

We describe a construction of ordered algebraic structures (ordered abelian semigroups, ordered commutative semirings, etc.) and describe applications to codimension-1 laminations. For a suitable ordered semi- algebraic structure L\mathbb L and measurable space XX we define L\mathbb L-measures ν\nu on XX. If LL is a codimension-1 lamination in a manifold, it often admits transverse L\mathbb L-measures for some L\mathbb L. Transverse L\mathbb L-measures can be used to understand classes of laminations much larger than the class of laminations admitting transverse positive R\mathbb R-measures. In particular, we show that "finite or infinite depth measured laminations" are laminations admitting transverse measures with values in a certain ordered semiring Oˉ\bar{\mathbb O} satisfying the additional property that locally the values lie in a smaller semiring P\mathbb P. We consider the "realization problem:" In one version, this deals with the problem whether an P\mathbb P-invariant weight vector assigned to a branched manifold BB (satisfying certain branch equations) determines a lamination LL carried by BB with a transverse Oˉ\bar{\mathbb O}-measure inducing the weights on BB. We describe further laminations which may not be L\mathbb L-measured, but are "well-covered" by laminations with transverse L\mathbb L-measures. We also investigate actions on L\mathbb L-trees which are associated to essential laminations with transverse L\mathbb L-measures. In appendices, we develop ideas about L\mathbb L-measures a little further, for example showing that a P\mathbb P-measure can be interpreted as a kind of probability measure.

Keywords

Cite

@article{arxiv.1407.7066,
  title  = {Laminations with transverse measures in ordered abelian semigroups},
  author = {Ulrich Oertel},
  journal= {arXiv preprint arXiv:1407.7066},
  year   = {2016}
}

Comments

48 pages, 12 figures. This version contains extensive corrections, changes, additional material. The title was changed

R2 v1 2026-06-22T05:13:44.439Z