--- VTK-8.2.0/Utilities/Doxygen/doc_version.pl.orig	2019-01-30 18:15:13.000000000 +0100
+++ VTK-8.2.0/Utilities/Doxygen/doc_version.pl	2021-01-08 17:01:33.913860627 +0100
@@ -152,24 +152,24 @@
   if exists $args{"logo"} && -f $args{"logo"};
 
 print DEST_FILE
-  "  \@par VTK:\n"
-  "   VTK is an open-source software system for image processing, 3D \n"
-  "   graphics, volume rendering and visualization. VTK includes many \n"
-  "   advanced algorithms (e.g., surface reconstruction, implicit modelling, \n"
-  "   decimation) and rendering techniques (e.g., hardware-accelerated \n"
-  "   volume rendering, LOD control).\n"
-  "   \@par \n"
-  "   VTK is used by academicians for teaching and research; by government \n"
-  "   research institutions such as Los Alamos National Lab in the US or \n"
-  "   CINECA in Italy; and by many commercial firms who use VTK to build or \n"
-  "   extend products. \n"
-  "   \@par \n"
-  "   The origin of VTK is with the textbook \"The Visualization Toolkit, an \n"
-  "   Object-Oriented Approach to 3D Graphics\" originally published by \n"
-  "   Prentice Hall and now published by Kitware, Inc. (Third Edition ISBN \n"
-  "   1-930934-07-6). VTK has grown (since its initial release in 1994) to a \n"
-  "   world-wide user base in the commercial, academic, and research \n"
-  "   communities. \n"
+  "  \@par VTK:\n",
+  "   VTK is an open-source software system for image processing, 3D \n",
+  "   graphics, volume rendering and visualization. VTK includes many \n",
+  "   advanced algorithms (e.g., surface reconstruction, implicit modelling, \n",
+  "   decimation) and rendering techniques (e.g., hardware-accelerated \n",
+  "   volume rendering, LOD control).\n",
+  "   \@par \n",
+  "   VTK is used by academicians for teaching and research; by government \n",
+  "   research institutions such as Los Alamos National Lab in the US or \n",
+  "   CINECA in Italy; and by many commercial firms who use VTK to build or \n",
+  "   extend products. \n",
+  "   \@par \n",
+  "   The origin of VTK is with the textbook \"The Visualization Toolkit, an \n",
+  "   Object-Oriented Approach to 3D Graphics\" originally published by \n",
+  "   Prentice Hall and now published by Kitware, Inc. (Third Edition ISBN \n",
+  "   1-930934-07-6). VTK has grown (since its initial release in 1994) to a \n",
+  "   world-wide user base in the commercial, academic, and research \n",
+  "   communities. \n",
   "  \@par Useful links:\n",
   "  \@li VTK Home: http://www.vtk.org\n",
   "  \@li VTK Source: https://gitlab.kitware.com/vtk/vtk\n",
@@ -178,8 +178,8 @@
   "  \@li VTK FAQ: http://www.vtk.org/Wiki/VTK_FAQ\n",
   "  \@li VTK Wiki: http://www.vtk.org/Wiki/\n",
   "  \@li VTK Dashboard: http://www.cdash.org/CDash/index.php?project=VTK\n",
-  "  \@li Commercial <a href=\"https://www.kitware.com/products/support.html\">support</a> "
-  "  and <a href=\"http://www.kitware.com/products/protraining.php\">training<\a> "
+  "  \@li Commercial <a href=\"https://www.kitware.com/products/support.html\">support</a> ",
+  "  and <a href=\"http://www.kitware.com/products/protraining.php\">training<\a> ",
   "  are available from Kitware\n",
   " ",
   "*/\n\n";
--- VTK-8.2.0/Utilities/Doxygen/doxyfile.in.orig	2019-01-30 18:15:13.000000000 +0100
+++ VTK-8.2.0/Utilities/Doxygen/doxyfile.in	2021-01-09 21:30:25.895589327 +0100
@@ -102,6 +102,7 @@
 COLS_IN_ALPHA_INDEX  = 3
 IGNORE_PREFIX        = vtk
 
+EXTRA_PACKAGES       = amstext
 ENABLE_PREPROCESSING = YES
 MACRO_EXPANSION      = YES
 SEARCH_INCLUDES      = YES
--- VTK-8.2.0/Filters/General/vtkCurvatures.h.orig	2019-01-30 18:15:13.000000000 +0100
+++ VTK-8.2.0/Filters/General/vtkCurvatures.h	2021-01-10 16:44:11.212483671 +0100
@@ -21,7 +21,7 @@
  *
  * Gauss Curvature
  * discrete Gauss curvature (K) computation,
- * \f$K(\text{vertex v}) = 2*\pi - \sum_{\text{facet neighbs f of v}} (\text{angle_f at v})\f$.
+ * \f$K(\text{vertex v}) = 2*\pi - \sum_{\text{facet neighbs f of v}} (\text{angle\_f at v})\f$.
  * The contribution of every facet is for the moment weighted by \f$Area(facet)/3\f$.
  * The units of Gaussian Curvature are \f$[1/m^2]\f$.
  *
@@ -34,13 +34,13 @@
  * the computation creates the orientation.
  * The units of Mean Curvature are [1/m].
  *
- * Maximum (\f$k_\max\f$) and Minimum (\f$k_\min\f$) Principal Curvatures
- * \f$k_\max = H + \sqrt{H^2 - K}\f$,
- * \f$k_\min = H - \sqrt{H^2 - K}\f$
+ * Maximum (\f$k_{max}\f$) and Minimum (\f$k_{min}\f$) Principal Curvatures
+ * \f$k_{max} = H + \sqrt{H^2 - K}\f$,
+ * \f$k_{min} = H - \sqrt{H^2 - K}\f$
  * Excepting spherical and planar surfaces which have equal principal
  * curvatures, the curvature at a point on a surface varies with the direction
  * one "sets off" from the point. For all directions, the curvature will pass
- * through two extrema: a minimum (\f$k_\min\f$) and a maximum (\f$k_\max\f$)
+ * through two extrema: a minimum (\f$k_{min}\f$) and a maximum (\f$k_{max}\f$)
  * which occur at mutually orthogonal directions to each other.
  *
  * NB. The sign of the Gauss curvature is a geometric invariant, it should be
@@ -130,12 +130,12 @@
   void GetMeanCurvature(vtkPolyData *output);
 
   /**
-   * Maximum principal curvature \f$k_max = H + sqrt(H^2 -K)\f$
+   * Maximum principal curvature \f$k_{max} = H + sqrt(H^2 -K)\f$
    */
   void GetMaximumCurvature(vtkPolyData *input, vtkPolyData *output);
 
   /**
-   * Minimum principal curvature \f$k_min = H - sqrt(H^2 -K)\f$
+   * Minimum principal curvature \f$k_{min} = H - sqrt(H^2 -K)\f$
    */
   void GetMinimumCurvature(vtkPolyData *input, vtkPolyData *output);