$	===========================================================================================================================================================================================================
$	F0	   |	F1	F2	F3	F4	F5	F6	  |	R1	R2	R3	R4	R5	   | TSP |   Supported   | Inconsistency | Solution
$	===========================================================================================================================================================================================================
#	312.222	   |	75.985	1	24.762	9.443	10.203	0.089	  |	75.985	72.512	60.322	52.18	51.223	   |  *  |  $ $ $ $ $ $  |               | [ 0 5 1 13 0 2 10 4 0 8 12 11 0 6 9 0 3 14 7 0 ]
#	313.015	   |	-	-	23.97	9.316	10.032	0.087	  |	75.985	72.512	60.322	52.18	52.016	   |     |      $   $ $  |      x x x x  | [ 0 5 1 13 0 2 10 4 0 8 12 11 0 6 9 0 7 3 14 0 ]
#	316.131	   |	-	-	-	8.818	9.419	0.081	  |	75.985	72.512	58.305	58.106	51.223	   |  *  |               |               | [ 0 5 1 13 0 2 10 4 0 6 9 8 0 11 12 0 3 14 7 0 ]
#	316.924	   |	-	-	-	8.691	9.22	0.079	  |	75.985	72.512	58.305	58.106	52.016	   |     |          $ $  |        x x x  | [ 0 5 1 13 0 2 10 4 0 6 9 8 0 11 12 0 7 3 14 0 ]
#	323.009	   |	-	-	23.805	7.717	8.62	0.074	  |	75.985	72.512	62.009	60.322	52.18	   |     |               |      x x x x  | [ 0 5 1 13 0 2 10 4 0 3 7 14 0 8 12 11 0 6 9 0 ]
#	325.588	   |	-	-	21.685	-	-	-	  |	77.017	76.673	60.497	56.068	55.332	   |  *  |               |      x        | [ 0 2 10 11 0 5 3 14 0 4 1 13 0 8 12 0 7 6 9 0 ]
#	326.389	   |	-	-	-	7.592	-	-	  |	75.985	72.512	66.315	60.322	51.254	   |  *  |               |        x      | [ 0 5 1 13 0 2 10 4 0 6 3 14 0 8 12 11 0 7 9 0 ]
#	326.918	   |	-	-	17.879	7.092	7.452	0.061	  |	75.985	72.512	62.009	58.305	58.106	   |     |      $   $ $  |      x x x x  | [ 0 5 1 13 0 2 10 4 0 3 7 14 0 6 9 8 0 11 12 0 ]
#	329.077	   |	-	-	-	6.977	-	-	  |	75.985	72.512	66.39	62.009	52.18	   |     |               |        x      | [ 0 5 1 13 0 2 10 4 0 8 11 12 0 3 7 14 0 6 9 0 ]
#	330.297	   |	-	-	-	6.654	-	-	  |	75.985	72.512	66.315	58.106	57.378	   |  *  |               |        x      | [ 0 5 1 13 0 2 10 4 0 6 3 14 0 11 12 0 7 9 8 0 ]
#	332.457	   |	-	-	-	6.206	-	-	  |	75.985	72.512	66.39	66.315	51.254	   |     |               |        x      | [ 0 5 1 13 0 2 10 4 0 8 11 12 0 6 3 14 0 7 9 0 ]
#	336.685	   |	-	-	17.68	5.744	6.509	0.054	  |	75.985	72.511	67.875	62.009	58.305	   |     |               |               | [ 0 5 1 13 0 4 10 0 2 11 12 0 3 7 14 0 6 9 8 0 ]
#	337.145	   |	-	-	-	5.456	6.284	0.052	  |	75.985	72.512	66.315	64.226	58.106	   |     |               |        x x x  | [ 0 5 1 13 0 2 10 4 0 6 3 14 0 7 8 9 0 11 12 0 ]
#	337.64	   |	-	-	-	5.377	6.27	0.052	  |	75.985	72.512	66.81	64.226	58.106	   |     |               |        x x x  | [ 0 5 1 13 0 2 10 4 0 3 14 6 0 7 8 9 0 11 12 0 ]
#	338.917	   |	-	-	15.663	5.245	5.954	0.049	  |	75.985	72.512	67.966	62.131	60.322	   |  *  |               |      x x x x  | [ 0 5 1 13 0 2 10 4 0 3 7 6 0 9 14 0 8 12 11 0 ]
#	339.522	   |	-	-	-	-	-	0.049	  |	75.985	72.512	68.571	62.131	60.322	   |     |               |            x  | [ 0 5 1 13 0 2 10 4 0 3 6 7 0 9 14 0 8 12 11 0 ]
#	340.065	   |	-	-	-	4.988	-	-	  |	75.985	72.511	67.875	66.315	57.378	   |  *  |        $      |               | [ 0 5 1 13 0 4 10 0 2 11 12 0 6 3 14 0 7 9 8 0 ]
#	340.414	   |	-	-	-	-	-	0.049	  |	75.985	72.512	69.463	62.131	60.322	   |     |               |            x  | [ 0 5 1 13 0 2 10 4 0 6 3 7 0 9 14 0 8 12 11 0 ]
#	340.56	   |	-	-	-	4.909	-	-	  |	75.985	72.511	67.875	66.81	57.378	   |     |               |        x      | [ 0 5 1 13 0 4 10 0 2 11 12 0 3 14 6 0 7 9 8 0 ]
#	342.826	   |	-	-	-	4.547	-	0.047	  |	75.985	72.512	68.256	67.966	58.106	   |  *  |               |        x   x  | [ 0 5 1 13 0 2 10 4 0 8 9 14 0 3 7 6 0 11 12 0 ]
#	343.431	   |	-	-	-	4.45	-	0.047	  |	75.985	72.512	68.571	68.256	58.106	   |     |               |        x   x  | [ 0 5 1 13 0 2 10 4 0 3 6 7 0 8 9 14 0 11 12 0 ]
#	344.322	   |	-	-	-	-	-	0.046	  |	75.985	72.512	69.463	68.256	58.106	   |     |               |            x  | [ 0 5 1 13 0 2 10 4 0 6 3 7 0 8 9 14 0 11 12 0 ]
#	344.985	   |	-	-	13.854	4.201	4.821	0.039	  |	75.985	72.512	67.966	66.39	62.131	   |     |               |      x x x x  | [ 0 5 1 13 0 2 10 4 0 3 7 6 0 8 11 12 0 9 14 0 ]
#	345.59	   |	-	-	-	4.105	4.801	0.039	  |	75.985	72.512	68.571	66.39	62.131	   |     |               |        x x x  | [ 0 5 1 13 0 2 10 4 0 3 6 7 0 8 11 12 0 9 14 0 ]
#	346.482	   |	-	-	-	4.029	4.794	0.039	  |	75.985	72.512	69.463	66.39	62.131	   |     |               |        x x x  | [ 0 5 1 13 0 2 10 4 0 6 3 7 0 8 11 12 0 9 14 0 ]
#	346.913	   |	-	-	11.759	3.892	4.281	0.034	  |	75.985	72.511	67.875	66.315	64.226	   |     |               |      x x x x  | [ 0 5 1 13 0 4 10 0 2 11 12 0 6 3 14 0 7 8 9 0 ]
#	347.29	   |	-	-	-	3.832	-	-	  |	75.985	72.511	68.91	67.875	62.009	   |     |               |        x      | [ 0 5 1 13 0 4 10 0 8 6 9 0 2 11 12 0 3 7 14 0 ]
#	347.407	   |	-	-	-	3.813	4.214	0.034	  |	75.985	72.511	67.875	66.81	64.226	   |     |        $      |        x x x  | [ 0 5 1 13 0 4 10 0 2 11 12 0 3 14 6 0 7 8 9 0 ]
#	351.326	   |	-	-	-	3.798	4.207	0.033	  |	75.985	72.511	71.794	66.81	64.226	   |     |               |        x x x  | [ 0 5 1 13 0 4 10 0 2 12 11 0 3 14 6 0 7 8 9 0 ]
#	352.066	   |	-	-	10.047	3.429	3.823	0.03	  |	75.985	72.512	71.316	66.315	65.938	   |  *  |               |      x x x x  | [ 0 5 1 13 0 2 10 4 0 9 12 0 6 3 14 0 7 8 11 0 ]
#	352.561	   |	-	-	-	3.31	3.721	0.029	  |	75.985	72.512	71.316	66.81	65.938	   |     |               |        x x x  | [ 0 5 1 13 0 2 10 4 0 9 12 0 3 14 6 0 7 8 11 0 ]
#	352.593	   |	-	-	8.11	2.983	3.24	0.024	  |	75.985	72.511	68.256	67.966	67.875	   |  *  |      $   $ $  |      x x x x  | [ 0 5 1 13 0 4 10 0 8 9 14 0 3 7 6 0 2 11 12 0 ]
#	353.198	   |	-	-	-	2.887	3.152	0.023	  |	75.985	72.511	68.571	68.256	67.875	   |     |          $    |        x x x  | [ 0 5 1 13 0 4 10 0 3 6 7 0 8 9 14 0 2 11 12 0 ]
#	354.09	   |	-	-	-	2.744	3.054	0.023	  |	75.985	72.511	69.463	68.256	67.875	   |     |        $ $    |        x x x  | [ 0 5 1 13 0 4 10 0 6 3 7 0 8 9 14 0 2 11 12 0 ]
#	355.87	   |	-	-	-	2.734	-	-	  |	76.673	72.511	69.901	68.91	67.875	   |     |               |        x      | [ 0 5 3 14 0 4 10 0 7 1 13 0 8 6 9 0 2 11 12 0 ]
#	356.007	   |	-	-	-	2.484	-	-	  |	75.985	72.512	71.316	69.878	66.315	   |     |               |        x      | [ 0 5 1 13 0 2 10 4 0 9 12 0 7 11 8 0 6 3 14 0 ]
#	356.502	   |	-	-	-	2.365	3.02	-	  |	75.985	72.512	71.316	69.878	66.81	   |     |        $      |        x x    | [ 0 5 1 13 0 2 10 4 0 9 12 0 7 11 8 0 3 14 6 0 ]
#	356.512	   |	-	-	8.019	-	2.968	0.023	  |	75.985	72.511	71.794	68.256	67.966	   |     |               |      x   x x  | [ 0 5 1 13 0 4 10 0 2 12 11 0 8 9 14 0 3 7 6 0 ]
#	357.117	   |	-	-	7.729	-	2.839	0.022	  |	75.985	72.511	71.794	68.571	68.256	   |     |               |      x   x x  | [ 0 5 1 13 0 4 10 0 2 12 11 0 3 6 7 0 8 9 14 0 ]
#	358.009	   |	-	-	-	2.194	2.678	0.021	  |	75.985	72.511	71.794	69.463	68.256	   |     |        $      |        x x x  | [ 0 5 1 13 0 4 10 0 2 12 11 0 6 3 7 0 8 9 14 0 ]
#	359.789	   |	-	-	-	2.107	-	0.02	  |	76.673	72.511	71.794	69.901	68.91	   |     |               |        x   x  | [ 0 5 3 14 0 4 10 0 2 12 11 0 7 1 13 0 8 6 9 0 ]
#	360.601	   |	-	-	7.414	-	2.614	-	  |	75.985	73.532	72.512	70.0	68.571	   |     |               |      x   x    | [ 0 5 1 13 0 8 12 9 0 2 10 4 0 11 14 0 3 6 7 0 ]
#	361.224	   |	-	-	-	1.878	2.478	0.018	  |	76.673	72.511	71.794	71.074	69.173	   |     |               |        x x x  | [ 0 5 3 14 0 4 10 0 2 12 11 0 6 8 9 0 1 13 7 0 ]
#	361.492	   |	-	-	6.522	-	2.387	-	  |	75.985	73.532	72.512	70.0	69.463	   |     |               |      x   x    | [ 0 5 1 13 0 8 12 9 0 2 10 4 0 11 14 0 6 3 7 0 ]
#	361.952	   |	-	-	-	1.761	2.308	0.017	  |	76.673	72.511	71.794	71.074	69.901	   |     |        $   $  |        x x x  | [ 0 5 3 14 0 4 10 0 2 12 11 0 6 8 9 0 7 1 13 0 ]
#	363.188	   |	-	-	-	1.673	2.261	0.017	  |	76.673	72.785	72.512	71.316	69.901	   |     |               |        x x x  | [ 0 5 3 14 0 6 8 11 0 2 10 4 0 9 12 0 7 1 13 0 ]
#	364.109	   |	-	-	-	-	2.227	-	  |	75.985	74.356	72.511	71.794	69.463	   |     |               |          x    | [ 0 5 1 13 0 9 8 14 0 4 10 0 2 12 11 0 6 3 7 0 ]
#	368.574	   |	-	-	4.669	1.441	1.642	0.013	  |	75.985	74.721	74.039	72.512	71.316	   |  *  |               |      x x x x  | [ 0 5 1 13 0 7 6 11 0 3 14 8 0 2 10 4 0 9 12 0 ]
#	368.849	   |	-	-	4.191	1.294	1.501	0.011	  |	75.985	74.696	73.863	72.511	71.794	   |     |      $   $ $  |      x x x x  | [ 0 5 1 13 0 3 7 8 0 6 9 14 0 4 10 0 2 12 11 0 ]
#	372.636	   |	-	-	-	1.285	-	0.011	  |	75.985	75.789	74.825	74.721	71.316	   |     |               |        x   x  | [ 0 5 1 13 0 2 4 10 0 8 3 14 0 7 6 11 0 9 12 0 ]
#	373.215	   |	-	-	3.474	0.929	1.204	0.009	  |	75.985	75.57	74.696	74.453	72.511	   |  *  |      $ $ $ $  |      x x x x  | [ 0 5 1 13 0 9 12 11 0 3 7 8 0 2 14 6 0 4 10 0 ]
#	378.563	   |	-	-	3.019	-	-	-	  |	77.017	76.673	76.518	74.356	73.999	   |     |               |      x        | [ 0 2 10 11 0 5 3 14 0 4 1 7 0 9 8 12 0 6 13 0 ]
#	381.648	   |	-	-	-	-	-	0.008	  |	77.441	77.017	76.673	76.518	73.999	   |     |               |            x  | [ 0 8 9 12 0 2 10 11 0 5 3 14 0 4 1 7 0 6 13 0 ]
#	384.719	   |	-	-	2.217	0.731	0.838	0.006	  |	78.202	77.441	77.016	76.075	75.985	   |     |               |      x x x x  | [ 0 3 6 14 0 8 9 12 0 10 11 0 4 2 7 0 5 1 13 0 ]
#	385.13	   |	-	-	2.058	0.727	0.778	0.006	  |	78.126	77.744	76.673	76.518	76.068	   |     |               |      x x x x  | [ 0 10 13 0 2 9 6 0 5 3 14 0 4 1 7 0 11 8 12 0 ]
#	386.685	   |	-	-	1.687	0.663	0.71	0.005	  |	78.205	78.126	77.162	76.673	76.518	   |     |      $ $ $ $  |      x x x x  | [ 0 6 9 11 0 10 13 0 2 8 12 0 5 3 14 0 4 1 7 0 ]
#	411.749	   |	-	-	-	0.649	-	-	  |	83.462	82.602	82.558	82.4	80.727	   |     |               |        x      | [ 0 7 6 12 0 4 1 5 0 8 10 0 2 11 13 0 9 3 14 0 ]
#	417.366	   |	-	-	-	0.536	0.631	0.004	  |	84.419	83.697	83.643	83.048	82.558	   |     |               |        x x x  | [ 0 2 11 4 0 1 5 14 0 3 13 7 0 6 9 12 0 8 10 0 ]
#	422.428	   |	-	-	-	0.492	0.63	0.004	  |	85.622	84.579	84.256	84.239	83.732	   |     |               |        x x x  | [ 0 7 10 0 9 11 12 0 3 5 14 0 2 13 6 0 1 4 8 0 ]
#	426.766	   |	-	-	1.392	0.382	0.468	0.003	  |	85.955	85.622	85.437	85.188	84.563	   |     |        $ $ $  |      x x x x  | [ 0 3 9 8 0 7 10 0 1 2 4 0 5 13 14 0 6 12 11 0 ]
#	453.646	   |	-	-	1.382	0.372	0.464	0.003	  |	91.35	91.038	90.655	90.636	89.968	   |     |               |      x x x x  | [ 0 5 14 6 0 4 10 8 0 1 11 2 0 3 9 7 0 12 13 0 ]
#	468.794	   |	-	-	1.275	-	-	-	  |	94.438	94.297	93.697	93.2	93.163	   |     |               |      x        | [ 0 8 3 13 0 10 12 0 1 5 4 0 9 2 14 0 6 11 7 0 ]
#	492.522	   |	-	-	-	0.355	-	0.003	  |	99.186	98.708	98.507	98.43	97.691	   |     |               |        x   x  | [ 0 5 11 0 1 2 12 0 4 10 14 0 3 8 6 0 7 13 9 0 ]
#	501.279	   |	-	-	-	0.349	-	0.002	  |	101.128	100.238	100.171	100.043	99.699	   |     |               |        x   x  | [ 0 3 14 12 0 5 2 7 0 4 1 9 0 6 10 0 8 13 11 0 ]
#	502.922	   |	-	-	0.694	0.274	0.291	0.002	  |	100.932	100.922	100.487	100.343	100.238	   |     |               |      x x x x  | [ 0 3 6 11 0 1 12 8 0 4 14 13 0 9 10 0 5 2 7 0 ]
#	513.746	   |	-	-	0.623	0.17	0.215	0.001	  |	103.147	102.776	102.668	102.631	102.523	   |     |        $ $ $  |      x x x x  | [ 0 10 2 12 0 5 9 0 3 4 7 0 13 11 14 0 1 6 8 0 ]
#	514.313	   |	-	-	0.516	-	-	-	  |	103.147	103.091	102.776	102.668	102.631	   |     |      $        |      x        | [ 0 10 2 12 0 1 8 6 0 5 9 0 3 4 7 0 13 11 14 0 ]
$	===========================================================================================================================================================================================================
&	Nb Total   |	1	1	28	54	43	49	  |	
&	Nb TSP-opt |	1	1	7	11	7	8	  |	
&	Nb Supprtd |	1	1	8	11	12	11	  |	
&	Nb Incons. |	0	0	26	50	40	46	  |	
$	===========================================================================================================================================================================================================
&	Overlap F1 |	 	1	1	1	1	1	  |	
&	Overlap F2 |	 	 	1	1	1	1	  |	
&	Overlap F3 |	 	 	 	20	24	22	  |	
&	Overlap F4 |	 	 	 	 	38	43	  |	
&	Overlap F5 |	 	 	 	 	 	39	  |	
$	===========================================================================================================================================================================================================
