The Poisson Boundary of Teichmüller Space

## Abstract The goal of this article is to consider the role played by finite‐order elements in the mapping class groups and special loci on moduli spaces, within the framework of Grothendieck–Teichmüller theory, and in particularly in the genus zero case. Quotienting topological surfaces by finite

## Abstract **Petra Blaisse** of Inside Outside describes how the studio focuses on the boundary of interior and exterior space, adding and subtracting highly tactile and sensuous layers. She highlights the significance of the invisible to her work ‐ whether light, scent or texture ‐ and how the fu

## Abstract We describe a three‐stage procedure to analyze the dependence of Poisson Boltzmann calculations on the shape, size and geometry of the boundary between solute and solvent. Our study is carried out within the boundary element formalism, but our results are also of interest to finite diff

## Abstract The space of probability measures on a Riemannian manifold is endowed with the Fisher information metric. In [4] T. Friedrich showed that this space admits also Poisson structures {, }. In this note, we give directly another proof for the structure {, } being Poisson. (© 2007 WILEY‐VCH