HOMCUBES, ver. 3.01, 11/29/02. Copyright (C) 1997-2002 by Pawel Pilarczyk. This is free software. No warranty. Consult 'license.txt' for details. Reading the domain of the map from 'vpol6.map'... 814 cubes read. Reading the image of the map from 'vpol6.map'... 814 cubes read. 103705 bit fields allocated (9 MB) to speed up full-dimensional reduction. Reducing full-dim cubes from X... 590 removed, 224 left. Reading the image of the map from 'vpol6.map'... 0 cubes read. Reading the map restricted to cubes in X from 'vpol6.map'... Done. Computing the image of the map... 570 cubes. Expanding B in Y... 0 cubes moved to B, 814 left in Y\B. Reducing full-dim cubes from Y... 244 cubes removed. 75 bit fields were in use. Transforming X into a set of cells... 224 cells created. Collapsing faces in X... ...... 121196 removed, 1924 left. Note: The dimension of X decreased from 6 to 1. Transforming Y into a set of cells... 570 cells created. Adding to Y boundaries of cells in Y... 234330 cells added. Creating the map F on cells in X... 12304 cubes added. Creating a cell map for F... .. Done. Creating the graph of F... . 6636 cells added. Transforming Ykeep into a set of cells... 570 cells created. Computing the image of F... 4456 cells. Collapsing Y towards F(X)... ...... 0 cells removed, 234900 left. Creating the chain complex of the graph of F... . Done. Creating the chain complex of Y... ...... Done. Creating the chain map of the projection... Done. Vertices used: 14361 of dim 6, 3318 of dim 12. Time used so far: 81.0 sec (1.35 min). Computing the homology of the graph of F over the ring of integers... Reducing D_1: 0 + 3317 reductions made. H_0 = Z H_1 = Z Computing the homology of Y over the ring of integers... Reducing D_2: 0 + 37280 reductions made. Reducing D_1: 8798 + 5281 reductions made. H_0 = Z H_1 = Z The map induced in homology is as follows: Dim 0: f (x1) = y1 Dim 1: f (x1) = -y1 Total time used: 111 sec (1.9 min). Thank you for using this software. We appreciate your business.