6533b7cefe1ef96bd125792d

RESEARCH PRODUCT

Conformal measures for multidimensional piecewise invertible maps

Frédéric PaccautJérôme BuzziBernard Schmitt

subject

Applied MathematicsGeneral MathematicsBoundary (topology)Measure (mathematics)law.inventionCombinatoricsDistortion (mathematics)Invertible matrixlawBounded functionPiecewiseIrreducibilityMathematicsProbability measure

description

Given a piecewise invertible map T:X\to X and a weight g:X\rightarrow\ ]0,\infty[ , a conformal measure \nu is a probability measure on X such that, for all measurable A\subset X with T:A\to TA invertible, \nu(TA)= \lambda \int_{A}\frac{1}{g}\ d\nu with a constant \lambda>0 . Such a measure is an essential tool for the study of equilibrium states. Assuming that the topological pressure of the boundary is small, that \log g has bounded distortion and an irreducibility condition, we build such a conformal measure.

yearjournalcountryeditionlanguage
2001-08-01Ergodic Theory and Dynamical Systems
https://doi.org/10.1017/s0143385701001493