Problem 52338. ICFP2021 Hole-In-Wall: Solve Score=0, where number Hole Vertices = Figure Vertices
The contest folds the figure in Red to fit within the hole shown in light grey
This Challenge is to solve ICFP problems 11, 13, 16, 17, 18, and 23 according to the Specification when given the hole vertices in hxy, original figure vertices in pxy, segment matrix mseg, and epsilon. The hxy matrix is [N+1,2] where N is number of hole vertices. A repeat of the first vertex occurs for drawing the hole. The pxy(original) and npxy(final) matrices are [P,2] where P is the number of figure vertices. The mseg indicates connected vertices that must maintain a length as a function of epsilon from the original length. The final figure vertices must be integer thus the allowed fuzziness of segment lengths.
Valid is 1) all npxy vertices on or inside the hole, hxy 2) all lengths squared of npxy segments must match the pxy segments within an allowed epsilon, abs(Lsqr(npxy,seg(i,:))/Lsqr(pxy,seg(i,:))-1)<= epsilon/1000000. Lsqr is length squared.
Score is sum of minimum square distances to the figure from each unique hole vertex.
npxy=Solve_nPeqnH(hxy, pxy, mseg, epsilon)
This challenge set all have optimal Scores of zero. The npxy vertices set must be a permutation of the hole vertices as number of figure vertices,nP, equals hole vertices, nH.
The function template includes routines to read ICFP problem files and to write ICFP solution files.
The ICFP 2021 Hole In Wall contest site has enabled a public user login to allow submissions. A login must be created to access all the problems and to submit solutions. Solutions are simple text files. Other challenges will show reading files, drawing figures, and producing submission files. To fully access the ICFP/Problems site use Register Team. Anyone can select Problems Page and then click problem numbers to see the puzzles and to download problem files.
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