Uniformization and the Poincaré metric on the leaves of a foliation by curves

Let D be a bounded strictly convex domain in Euclidean n-space equipped with its Hilbert metric h(x; y). It is shown that as the points x and y of D approach distinct points on the boundary of D, for any a in D the sum h(x; a) + h(a; y) is asymptotic to h(x; y).

A n algorithm is given for computing a metric on piecewise linear curves. A bound for the distance between a piecewise linear approximation and a general curve alia ws the approximate computation of the metric on general curves. The algorithm has been successfully implemented in Fortran. geometry~ m

Elliptic curves over finite fields have found applications in many areas including cryptography. In the current work we define a metric on the set of elliptic curves defined over a prime field F p , p > 3. Computing this metric requires us to solve an instance of a discrete log problem in F \* p . T

## Abstract The diffraction of tidal waves (Poincaré waves) by islands and barriers on water of constant finite depth is governed by the two‐dimensional Helmholtz equation. One effect of the Earth's rotation is to complicate the boundary condition on rigid boundaries: a linear combination of the no

The last years many results have been published about the existence of a RIEMANNian metric on a differentiable manifold, with prescribed RICCI tensor. However, if the RIEMANNian manifold (M, (,)) has positive RICCI curvature, then the RICCI tensor defines a new RIEMANNian metric on M, which is denot