From d18e7b91ec7807a8c06d008a64d76080d1a00a20 Mon Sep 17 00:00:00 2001 From: Laurent Rineau Date: Tue, 7 Mar 2006 16:12:21 +0000 Subject: [PATCH] Hausdorff, with two ff --- Surface_mesher/doc_tex/Surface_mesher/main.tex | 4 ++-- 1 file changed, 2 insertions(+), 2 deletions(-) diff --git a/Surface_mesher/doc_tex/Surface_mesher/main.tex b/Surface_mesher/doc_tex/Surface_mesher/main.tex index 77f19c706d0..b61297e5069 100644 --- a/Surface_mesher/doc_tex/Surface_mesher/main.tex +++ b/Surface_mesher/doc_tex/Surface_mesher/main.tex @@ -50,7 +50,7 @@ If the surface is smooth enough and the size criteria small enough, the algorithm guarantees that the output mesh is homeomorphic to the surface and within a small bounded distance -(Hausdorf or even Frechet distance) from the surface. +(Hausdorff or even Frechet distance) from the surface. The algorithm can also be used for non smooth surfaces but then there is no guarantee. @@ -192,7 +192,7 @@ The guarantees on the output mesh depend on the mesh criteria. Theoretical guarantees are given in \cite{cgal:sry-mvbss-05}. First, the meshing algorithm is proved to terminate if the angular bound is -not smaller than $20,7^0$. +not smaller than $20,7^o$. Furthermore, if the radius bound is everywhere smaller than the $\epsilon$ times the local feature size (where $\epsilon$ is a constant