$	=======================================================================================================================================================================================
$	F0	   |	F1	F2	F3	F4	F5	F6	  |	R1	R2	R3	   | TSP |   Supported   | Inconsistency | Solution
$	=======================================================================================================================================================================================
#	344.703	   |	141.191	1	40.672	17.527	18.617	0.079	  |	141.191	102.993	100.519	   |  *  |  $ $ $ $ $ $  |               | [ 0 10 11 14 12 13 0 4 3 5 9 0 1 2 7 8 6 0 ]
#	348.492	   |	-	-	38.198	16.685	17.705	0.073	  |	141.191	104.308	102.993	   |     |            $  |      x x x x  | [ 0 10 11 14 12 13 0 1 6 8 7 2 0 4 3 5 9 0 ]
#	350.655	   |	-	-	-	16.204	17.245	0.073	  |	141.191	106.47	102.993	   |     |               |        x x x  | [ 0 10 11 14 12 13 0 1 2 8 7 6 0 4 3 5 9 0 ]
#	350.696	   |	-	-	-	16.195	-	-	  |	141.191	108.986	100.519	   |     |               |        x      | [ 0 10 11 14 12 13 0 3 5 9 4 0 1 2 7 8 6 0 ]
#	353.921	   |	-	-	-	15.478	17.097	-	  |	141.191	112.211	100.519	   |     |               |        x x    | [ 0 10 11 14 12 13 0 4 5 3 9 0 1 2 7 8 6 0 ]
#	354.298	   |	-	-	-	15.394	16.585	0.072	  |	141.191	110.114	102.993	   |     |               |        x x x  | [ 0 10 11 14 12 13 0 1 6 2 7 8 0 4 3 5 9 0 ]
#	354.443	   |	-	-	-	15.362	16.562	0.072	  |	141.191	110.259	102.993	   |     |               |        x x x  | [ 0 10 11 14 12 13 0 1 6 7 8 2 0 4 3 5 9 0 ]
#	354.485	   |	-	-	36.883	15.353	16.396	0.069	  |	141.191	108.986	104.308	   |     |               |      x x x x  | [ 0 10 11 14 12 13 0 3 5 9 4 0 1 6 8 7 2 0 ]
#	355.24	   |	-	-	-	15.185	-	-	  |	141.191	111.056	102.993	   |     |               |        x      | [ 0 10 11 14 12 13 0 1 8 7 2 6 0 4 3 5 9 0 ]
#	356.323	   |	-	-	-	14.944	-	-	  |	141.191	114.613	100.519	   |     |               |        x      | [ 0 10 11 14 12 13 0 3 5 4 9 0 1 2 7 8 6 0 ]
#	356.648	   |	-	-	34.721	14.872	15.808	0.065	  |	141.191	108.986	106.47	   |     |               |      x x x x  | [ 0 10 11 14 12 13 0 3 5 9 4 0 1 2 8 7 6 0 ]
#	357.709	   |	-	-	-	14.636	-	-	  |	141.191	112.211	104.308	   |     |               |        x      | [ 0 10 11 14 12 13 0 4 5 3 9 0 1 6 8 7 2 0 ]
#	357.957	   |	-	-	-	14.581	-	-	  |	141.191	113.773	102.993	   |     |               |        x      | [ 0 10 11 14 12 13 0 1 2 6 7 8 0 4 3 5 9 0 ]
#	357.967	   |	-	-	-	14.579	-	-	  |	141.191	116.258	100.519	   |     |               |        x      | [ 0 10 11 14 12 13 0 5 3 4 9 0 1 2 7 8 6 0 ]
#	358.667	   |	-	-	-	14.423	-	-	  |	141.191	114.483	102.993	   |     |               |        x      | [ 0 10 11 14 12 13 0 1 2 6 8 7 0 4 3 5 9 0 ]
#	359.614	   |	-	-	-	14.213	-	-	  |	141.191	115.43	102.993	   |     |               |        x      | [ 0 10 11 14 12 13 0 1 7 8 2 6 0 4 3 5 9 0 ]
#	359.872	   |	-	-	-	14.156	15.196	0.064	  |	141.191	112.211	106.47	   |     |               |        x x x  | [ 0 10 11 14 12 13 0 4 5 3 9 0 1 2 8 7 6 0 ]
#	360.112	   |	-	-	-	14.102	-	-	  |	141.191	114.613	104.308	   |     |               |        x      | [ 0 10 11 14 12 13 0 3 5 4 9 0 1 6 8 7 2 0 ]
#	360.291	   |	-	-	32.205	14.063	14.923	0.06	  |	141.191	110.114	108.986	   |     |               |      x x x x  | [ 0 10 11 14 12 13 0 1 6 2 7 8 0 3 5 9 4 0 ]
#	360.436	   |	-	-	-	14.03	14.89	0.06	  |	141.191	110.259	108.986	   |     |               |        x x x  | [ 0 10 11 14 12 13 0 1 6 7 8 2 0 3 5 9 4 0 ]
#	360.96	   |	-	-	-	13.914	-	-	  |	141.191	116.776	102.993	   |     |               |        x      | [ 0 10 11 14 12 13 0 1 6 2 8 7 0 4 3 5 9 0 ]
#	361.11	   |	-	-	-	13.881	-	-	  |	141.191	116.926	102.993	   |     |               |        x      | [ 0 10 11 14 12 13 0 1 7 8 6 2 0 4 3 5 9 0 ]
#	361.211	   |	-	-	-	13.858	-	-	  |	141.191	120.381	99.639	   |  *  |               |               | [ 0 10 11 14 12 13 0 1 4 3 5 9 0 2 7 8 6 0 ]
#	361.233	   |	-	-	-	13.853	14.718	0.059	  |	141.191	111.056	108.986	   |     |               |        x x x  | [ 0 10 11 14 12 13 0 1 8 7 2 6 0 3 5 9 4 0 ]
#	361.558	   |	-	-	-	13.781	-	-	  |	141.191	119.848	100.519	   |     |               |        x      | [ 0 10 11 14 12 13 0 4 9 3 5 0 1 2 7 8 6 0 ]
#	361.756	   |	-	-	-	13.737	-	-	  |	141.191	116.258	104.308	   |     |               |        x      | [ 0 10 11 14 12 13 0 5 3 4 9 0 1 6 8 7 2 0 ]
#	362.057	   |	136.882	2	-	11.795	13.875	-	  |	136.882	122.182	102.993	   |  *  |  $ $          |               | [ 0 6 8 7 2 12 0 1 13 14 11 10 0 4 3 5 9 0 ]
#	363.516	   |	-	-	31.077	-	-	0.057	  |	141.191	112.211	110.114	   |     |               |      x     x  | [ 0 10 11 14 12 13 0 4 5 3 9 0 1 6 2 7 8 0 ]
#	363.661	   |	-	-	30.932	-	-	0.057	  |	141.191	112.211	110.259	   |     |               |      x     x  | [ 0 10 11 14 12 13 0 4 5 3 9 0 1 6 7 8 2 0 ]
#	364.457	   |	-	-	30.135	-	-	0.055	  |	141.191	112.211	111.056	   |     |               |      x     x  | [ 0 10 11 14 12 13 0 4 5 3 9 0 1 8 7 2 6 0 ]
#	365.918	   |	-	-	-	-	13.713	-	  |	141.191	114.613	110.114	   |     |               |          x    | [ 0 10 11 14 12 13 0 3 5 4 9 0 1 6 2 7 8 0 ]
#	366.063	   |	-	-	-	-	13.671	-	  |	141.191	114.613	110.259	   |     |               |          x    | [ 0 10 11 14 12 13 0 3 5 4 9 0 1 6 7 8 2 0 ]
#	366.86	   |	-	-	-	-	13.446	0.055	  |	141.191	114.613	111.056	   |     |               |          x x  | [ 0 10 11 14 12 13 0 3 5 4 9 0 1 8 7 2 6 0 ]
#	367.175	   |	-	-	28.98	-	13.308	0.053	  |	141.191	113.773	112.211	   |     |               |      x   x x  | [ 0 10 11 14 12 13 0 1 2 6 7 8 0 4 5 3 9 0 ]
#	367.885	   |	-	-	-	-	13.159	0.053	  |	141.191	114.483	112.211	   |     |               |          x x  | [ 0 10 11 14 12 13 0 1 2 6 8 7 0 4 5 3 9 0 ]
#	368.05	   |	-	-	27.896	9.466	11.394	0.051	  |	136.882	122.182	108.986	   |     |        $      |        x x    | [ 0 6 8 7 2 12 0 1 13 14 11 10 0 3 5 9 4 0 ]
#	369.577	   |	-	-	27.418	-	-	0.049	  |	141.191	114.613	113.773	   |     |               |      x     x  | [ 0 10 11 14 12 13 0 3 5 4 9 0 1 2 6 7 8 0 ]
#	370.287	   |	-	-	26.708	-	-	0.048	  |	141.191	114.613	114.483	   |     |               |      x     x  | [ 0 10 11 14 12 13 0 3 5 4 9 0 1 2 6 8 7 0 ]
#	371.234	   |	-	-	26.578	-	-	0.048	  |	141.191	115.43	114.613	   |     |               |      x     x  | [ 0 10 11 14 12 13 0 1 7 8 2 6 0 3 5 4 9 0 ]
#	371.275	   |	-	-	24.671	8.749	10.133	0.044	  |	136.882	122.182	112.211	   |     |               |      x x x x  | [ 0 6 8 7 2 12 0 1 13 14 11 10 0 4 5 3 9 0 ]
#	373.677	   |	-	-	22.269	8.215	9.245	0.04	  |	136.882	122.182	114.613	   |     |               |      x x x x  | [ 0 6 8 7 2 12 0 1 13 14 11 10 0 3 5 4 9 0 ]
#	374.03	   |	-	3	20.116	8.137	8.756	0.036	  |	136.882	120.381	116.766	   |  *  |      $   $ $  |               | [ 0 6 8 7 2 12 0 1 4 3 5 9 0 10 11 14 13 0 ]
#	374.698	   |	-	-	-	7.989	8.652	0.036	  |	136.882	121.049	116.766	   |     |               |        x x x  | [ 0 6 8 7 2 12 0 1 3 5 9 4 0 10 11 14 13 0 ]
#	375.322	   |	-	-	-	7.85	-	-	  |	136.882	122.182	116.258	   |     |               |        x      | [ 0 6 8 7 2 12 0 1 13 14 11 10 0 5 3 4 9 0 ]
#	378.911	   |	-	-	-	7.052	8.245	0.035	  |	136.882	125.263	116.766	   |     |               |        x x x  | [ 0 6 8 7 2 12 0 1 9 5 3 4 0 10 11 14 13 0 ]
#	378.912	   |	-	-	17.034	7.052	7.54	0.03	  |	136.882	122.182	119.848	   |     |               |      x x x x  | [ 0 6 8 7 2 12 0 1 13 14 11 10 0 4 9 3 5 0 ]
#	379.545	   |	-	-	16.401	6.911	7.363	0.029	  |	136.882	122.182	120.481	   |     |      $     $  |      x x x x  | [ 0 6 8 7 2 12 0 1 13 14 11 10 0 3 4 5 9 0 ]
#	380.023	   |	-	-	-	6.805	-	-	  |	136.882	126.374	116.766	   |     |               |        x      | [ 0 6 8 7 2 12 0 1 4 9 5 3 0 10 11 14 13 0 ]
#	380.324	   |	-	-	-	6.738	-	-	  |	136.882	126.676	116.766	   |     |               |        x      | [ 0 6 8 7 2 12 0 1 3 5 4 9 0 10 11 14 13 0 ]
#	383.136	   |	-	-	14.7	6.113	6.53	0.026	  |	136.882	124.072	122.182	   |     |               |      x x x x  | [ 0 6 8 7 2 12 0 3 9 5 4 0 1 13 14 11 10 0 ]
#	383.18	   |	-	-	-	6.103	-	-	  |	136.882	125.917	120.381	   |     |               |        x      | [ 0 6 8 7 2 12 0 11 10 14 13 0 1 4 3 5 9 0 ]
#	383.848	   |	-	-	-	5.955	-	-	  |	136.882	125.917	121.049	   |     |               |        x      | [ 0 6 8 7 2 12 0 11 10 14 13 0 1 3 5 9 4 0 ]
#	384.78	   |	-	-	-	5.748	6.265	0.025	  |	136.882	125.716	122.182	   |     |               |        x x x  | [ 0 6 8 7 2 12 0 4 3 9 5 0 1 13 14 11 10 0 ]
#	385.953	   |	135.939	4	13.757	4.859	5.646	0.024	  |	135.939	127.832	122.182	   |  *  |  $ $   $      |               | [ 0 8 7 2 12 0 4 9 5 3 6 0 1 13 14 11 10 0 ]
#	386.337	   |	-	-	-	4.773	5.63	0.024	  |	135.939	128.216	122.182	   |     |        $      |        x x x  | [ 0 8 7 2 12 0 4 6 3 5 9 0 1 13 14 11 10 0 ]
#	388.062	   |	-	-	11.619	-	5.33	0.02	  |	136.882	125.917	125.263	   |     |               |      x   x x  | [ 0 6 8 7 2 12 0 11 10 14 13 0 1 9 5 3 4 0 ]
#	389.174	   |	-	-	10.965	4.772	5.065	0.019	  |	136.882	126.374	125.917	   |     |               |      x x x x  | [ 0 6 8 7 2 12 0 1 4 9 5 3 0 11 10 14 13 0 ]
#	389.475	   |	-	-	-	4.705	5.0	0.019	  |	136.882	126.676	125.917	   |     |               |        x x x  | [ 0 6 8 7 2 12 0 1 3 5 4 9 0 11 10 14 13 0 ]
#	392.287	   |	-	-	-	4.46	-	-	  |	136.882	131.333	124.072	   |     |               |        x      | [ 0 6 8 7 2 12 0 1 13 14 10 11 0 3 9 5 4 0 ]
#	392.398	   |	-	-	-	4.055	4.556	0.019	  |	136.882	129.599	125.917	   |     |               |        x x x  | [ 0 6 8 7 2 12 0 1 4 5 3 9 0 11 10 14 13 0 ]
#	393.588	   |	-	-	-	3.791	4.486	0.019	  |	136.882	130.789	125.917	   |     |               |        x x x  | [ 0 6 8 7 2 12 0 1 5 3 4 9 0 11 10 14 13 0 ]
#	393.931	   |	-	-	-	3.729	-	-	  |	136.882	131.333	125.716	   |     |               |        x      | [ 0 6 8 7 2 12 0 1 13 14 10 11 0 4 3 9 5 0 ]
#	394.8	   |	-	-	-	-	4.485	0.019	  |	136.882	132.001	125.917	   |     |               |          x x  | [ 0 6 8 7 2 12 0 4 1 3 5 9 0 11 10 14 13 0 ]
#	395.104	   |	-	-	8.107	2.825	3.32	0.014	  |	135.939	131.333	127.832	   |     |        $      |      x x x x  | [ 0 8 7 2 12 0 1 13 14 10 11 0 4 9 5 3 6 0 ]
#	395.488	   |	-	-	7.723	2.74	3.172	0.013	  |	135.939	131.333	128.216	   |     |               |      x x x x  | [ 0 8 7 2 12 0 1 13 14 10 11 0 4 6 3 5 9 0 ]
#	396.981	   |	-	-	-	-	-	0.013	  |	135.939	132.826	128.216	   |     |               |            x  | [ 0 8 7 2 12 0 1 10 11 14 13 0 4 6 3 5 9 0 ]
#	398.505	   |	-	-	7.283	2.698	3.028	0.012	  |	136.882	132.025	129.599	   |     |               |      x x x x  | [ 0 6 8 7 2 12 0 13 10 11 14 0 1 4 5 3 9 0 ]
#	399.558	   |	-	-	5.549	2.464	2.613	0.009	  |	136.882	131.343	131.333	   |     |               |      x x x x  | [ 0 6 8 7 2 12 0 5 4 3 9 0 1 13 14 10 11 0 ]
#	399.696	   |	-	-	-	2.433	-	-	  |	136.882	132.025	130.789	   |     |               |        x      | [ 0 6 8 7 2 12 0 13 10 11 14 0 1 5 3 4 9 0 ]
#	399.993	   |	-	-	4.606	1.739	1.929	0.008	  |	135.939	132.721	131.333	   |     |               |      x x x x  | [ 0 8 7 2 12 0 4 3 6 5 9 0 1 13 14 10 11 0 ]
#	400.731	   |	-	-	-	1.575	1.882	0.008	  |	135.939	133.459	131.333	   |     |               |        x x x  | [ 0 8 7 2 12 0 6 3 5 4 9 0 1 13 14 10 11 0 ]
#	401.486	   |	-	-	3.218	1.407	1.493	0.005	  |	135.939	132.826	132.721	   |     |      $ $ $ $  |      x x x x  | [ 0 8 7 2 12 0 1 10 11 14 13 0 4 3 6 5 9 0 ]
#	402.224	   |	-	-	3.113	1.243	1.343	0.005	  |	135.939	133.459	132.826	   |     |        $ $    |      x x x x  | [ 0 8 7 2 12 0 6 3 5 4 9 0 1 10 11 14 13 0 ]
#	408.372	   |	-	-	2.73	1.163	1.237	0.004	  |	137.11	136.882	134.38	   |     |               |      x x x x  | [ 0 10 11 13 14 0 6 8 7 2 12 0 1 5 3 9 4 0 ]
#	408.472	   |	-	-	2.63	1.118	1.19	0.004	  |	137.11	136.882	134.48	   |     |               |      x x x x  | [ 0 10 11 13 14 0 6 8 7 2 12 0 1 9 3 5 4 0 ]
#	410.127	   |	-	-	0.975	0.383	0.417	0.002	  |	137.11	136.882	136.135	   |     |               |      x x x x  | [ 0 10 11 13 14 0 6 8 7 2 12 0 1 3 9 5 4 0 ]
#	410.874	   |	-	-	0.228	0.101	0.107	0.0	  |	137.11	136.882	136.882	   |     |      $ $ $ $  |      x x x x  | [ 0 10 11 13 14 0 1 9 4 5 3 0 6 8 7 2 12 0 ]
#	423.234	   |	-	-	0.17	0.075	0.08	0.0	  |	141.191	141.022	141.021	   |     |               |      x x x x  | [ 0 10 11 14 12 13 0 1 4 7 2 8 0 5 3 6 9 0 ]
#	432.97	   |	-	-	0.104	0.04	0.044	0.0	  |	144.367	144.341	144.263	   |     |      $ $ $ $  |      x x x x  | [ 0 1 12 2 8 7 0 3 6 5 4 9 0 11 14 10 13 0 ]
#	438.156	   |	-	-	0.082	0.03	0.034	0.0	  |	146.096	146.044	146.015	   |     |        $      |      x x x x  | [ 0 3 2 7 6 10 0 1 13 12 14 11 0 4 9 5 8 0 ]
#	446.321	   |	-	-	0.045	0.017	0.019	0.0	  |	148.792	148.781	148.748	   |     |               |      x x x x  | [ 0 1 6 7 8 9 0 12 2 14 13 0 4 5 3 10 11 0 ]
#	448.07	   |	-	-	0.028	0.012	0.013	0.0	  |	149.375	149.348	149.347	   |     |      $ $ $ $  |      x x x x  | [ 0 7 6 2 12 14 0 9 11 10 13 0 4 3 1 5 8 0 ]
#	467.368	   |	-	-	0.016	0.006	0.007	0.0	  |	155.796	155.792	155.78	   |     |      $ $ $ $  |      x x x x  | [ 0 6 1 14 11 10 0 2 5 3 8 7 0 9 4 12 13 0 ]
#	485.434	   |	-	-	0.013	0.005	0.005	0.0	  |	161.817	161.812	161.804	   |     |               |      x x x x  | [ 0 7 8 1 14 10 0 2 3 6 12 13 0 4 5 9 11 0 ]
#	495.868	   |	-	-	-	-	-	0.0	  |	165.298	165.285	165.285	   |     |               |            x  | [ 0 1 6 2 8 14 0 10 13 12 11 0 4 5 9 3 7 0 ]
#	514.841	   |	-	-	0.007	0.002	0.003	0.0	  |	171.617	171.613	171.61	   |     |      $ $ $ $  |      x x x x  | [ 0 1 9 11 10 13 0 2 8 12 4 0 6 7 3 5 14 0 ]
#	536.179	   |	-	-	0.004	0.002	0.002	0.0	  |	178.729	178.725	178.725	   |     |               |      x x x x  | [ 0 3 5 6 9 13 0 7 8 1 2 12 0 10 11 4 14 0 ]
#	540.482	   |	-	-	0.003	0.001	0.001	0.0	  |	180.162	180.161	180.159	   |     |               |      x x x x  | [ 0 1 7 6 14 11 0 2 8 13 5 3 0 9 4 10 12 0 ]
#	546.482	   |	-	-	0.001	0.0	0.0	0.0	  |	182.161	182.161	182.16	   |     |      $ $ $ $  |      x x x x  | [ 0 3 4 14 13 11 0 6 2 12 1 9 0 8 5 7 10 0 ]
$	=======================================================================================================================================================================================
&	Nb Total   |	3	4	44	74	59	63	  |	
&	Nb TSP-opt |	3	4	3	5	4	3	  |	
&	Nb Supprtd |	3	3	10	14	10	11	  |	
&	Nb Incons. |	0	0	40	69	55	59	  |	
$	=======================================================================================================================================================================================
&	Overlap F1 |	 	3	2	3	3	2	  |	
&	Overlap F2 |	 	 	3	4	4	3	  |	
&	Overlap F3 |	 	 	 	36	38	44	  |	
&	Overlap F4 |	 	 	 	 	52	50	  |	
&	Overlap F5 |	 	 	 	 	 	55	  |	
$	=======================================================================================================================================================================================
