function p = hex_grid_01_points ( nodes_per_layer, layers, n ) %*****************************************************************************80 % %% HEX_GRID_01_POINTS returns unit square hex grid points. % % Discussion: % % This routine determines the coordinates of the elements of % a hexagonal grid in the unit square. % % A hexagonal grid is defined in the unit square [0,1] x [0,1]. % % All nodes of the grid lie on one of LAYERS horizontal lines. % The first of these lines is the X axis, and each successive % line is HY units higher. % % On all the odd numbered lines, there are NODES_PER_LAYER points, % equally spaced from 0 to 1, with a spacing of HX. % % On the even numbered lines, there are NODES_PER_LAYER-1 points, % whose values are the midpoints of successive intervals on % an odd numbered line. (The grid is staggered). % % HY = HX * sqrt ( 3 ) / 2. % % Licensing: % % This code is distributed under the GNU LGPL license. % % Modified: % % 08 March 2005 % % Author: % % John Burkardt % % Parameters: % % Input, integer NODES_PER_LAYER, the number of grid points on the first % horizontal layer of points. % % Input, integer LAYERS, the number of horizontal layers. % % Input, integer N, the total number of hex grid points. % % Output, real P(2,N), the coordinates of the % mesh points, listed one horizontal layer at a time. % ndim = 2; if ( nodes_per_layer < 1 ) p = []; return end if ( nodes_per_layer == 1 ) p(1:ndim,1) = 0.5; return end [ hx, hy ] = hex_grid_01_h ( nodes_per_layer ); k = 0; for j = 1 : layers y = hy * ( j - 1 ); jmod = mod ( j, 2 ); if ( jmod == 1 ) for i = 1 : nodes_per_layer x = ( i - 1 ) / ( nodes_per_layer - 1 ); k = k + 1; if ( k <= n ) p(1,k) = x; p(2,k) = y; end end else for i = 1 : nodes_per_layer-1 x = ( 2 * i - 1 ) / ( 2 * nodes_per_layer - 2 ); k = k + 1; if ( k <= n ) p(1,k) = x; p(2,k) = y; end end end end return end