From eea0ad61cb5fae87bc1a594baf9b0c1612fcd6f5 Mon Sep 17 00:00:00 2001 From: Andreas Fabri Date: Sun, 20 Apr 2014 17:21:26 +0200 Subject: [PATCH] no need for the word figure --- .../Segment_Delaunay_graph_Linf_2.txt | 4 ++-- 1 file changed, 2 insertions(+), 2 deletions(-) diff --git a/Segment_Delaunay_graph_Linf_2/doc/Segment_Delaunay_graph_Linf_2/Segment_Delaunay_graph_Linf_2.txt b/Segment_Delaunay_graph_Linf_2/doc/Segment_Delaunay_graph_Linf_2/Segment_Delaunay_graph_Linf_2.txt index edb167fabe5..051e0a9472c 100644 --- a/Segment_Delaunay_graph_Linf_2/doc/Segment_Delaunay_graph_Linf_2/Segment_Delaunay_graph_Linf_2.txt +++ b/Segment_Delaunay_graph_Linf_2/doc/Segment_Delaunay_graph_Linf_2/Segment_Delaunay_graph_Linf_2.txt @@ -75,7 +75,7 @@ diagram is employed \cite pl-svdlinf-2001. If two different points \f$ p \f$, \f$ q \f$ share one coordinate, then their \f$ L_{\infty} \f$ bisector is bi-dimensional as shown -in figure \cgalFigureRef{figbispointsbidim}. In this special case, +in \cgalFigureRef{figbispointsbidim}. In this special case, we 1-dimensionalize the bisector, by taking instead the Euclidean bisector of the two points. @@ -86,7 +86,7 @@ The \f$ L_{\infty} \f$ bisector between two points with the same Similarly, the bisector between the interior of an axis-parallel segment and one of its endpoints is also bi-dimensional as shown -in figure \cgalFigureRef{figbisspbidim}. We 1-dimensionalize this +in \cgalFigureRef{figbisspbidim}. We 1-dimensionalize this bisector by taking instead the line passing through the endpoint that is perpendicular to the segment.