$	=================================================================================================================================================================================================
$	F0	   |	F1	F2	F3	F4	F5	F6	  |	R1	R2	R3	R4	   | TSP |   Supported   | Inconsistency | Solution
$	=================================================================================================================================================================================================
#	357.529	   |	113.104	1	58.962	17.62	21.909	0.131	  |	113.104	100.098	90.184	54.142	   |  *  |  $ $ $ $ $ $  |               | [ 0 9 10 12 11 0 2 1 3 4 0 5 6 7 0 8 13 14 0 ]
#	358.775	   |	-	-	57.716	17.153	21.409	0.128	  |	113.104	100.098	90.184	55.388	   |     |               |      x x x x  | [ 0 9 10 12 11 0 2 1 3 4 0 5 6 7 0 13 8 14 0 ]
#	364.32	   |	105.019	2	21.09	6.97	8.484	0.048	  |	105.019	90.802	84.569	83.929	   |  *  |  $ $ $ $ $ $  |               | [ 0 2 9 10 8 0 13 12 11 14 0 6 7 0 1 3 4 5 0 ]
#	368.833	   |	100.098	3	12.349	3.945	4.696	0.026	  |	100.098	90.802	90.184	87.749	   |  *  |  $ $ $ $ $ $  |               | [ 0 2 1 3 4 0 13 12 11 14 0 5 6 7 0 8 10 9 0 ]
#	369.889	   |	-	-	-	3.813	4.639	-	  |	100.098	91.858	90.184	87.749	   |     |               |        x x    | [ 0 2 1 3 4 0 11 12 13 14 0 5 6 7 0 8 10 9 0 ]
#	370.276	   |	-	-	10.906	3.764	4.385	0.023	  |	100.098	90.802	90.184	89.192	   |     |          $    |      x x x x  | [ 0 2 1 3 4 0 13 12 11 14 0 5 6 7 0 8 9 10 0 ]
#	371.136	   |	-	4	9.988	3.657	4.23	0.021	  |	100.098	90.744	90.184	90.11	   |  *  |    $ $   $ $  |               | [ 0 2 1 3 4 0 11 12 13 0 5 6 7 0 9 10 8 14 0 ]
#	371.332	   |	-	-	-	3.632	-	-	  |	100.098	91.858	90.184	89.192	   |     |               |        x      | [ 0 2 1 3 4 0 11 12 13 14 0 5 6 7 0 8 9 10 0 ]
#	371.784	   |	-	-	9.914	3.576	4.136	0.02	  |	100.098	90.777	90.725	90.184	   |  *  |        $ $ $  |      x x x x  | [ 0 2 1 3 4 0 9 10 8 13 0 12 11 14 0 5 6 7 0 ]
#	371.857	   |	-	-	-	3.567	4.126	-	  |	100.098	90.831	90.744	90.184	   |     |          $    |        x x    | [ 0 2 1 3 4 0 8 10 9 14 0 11 12 13 0 5 6 7 0 ]
#	372.141	   |	-	-	-	3.531	4.092	-	  |	100.098	91.134	90.725	90.184	   |     |        $      |        x x    | [ 0 2 1 3 4 0 8 9 10 13 0 12 11 14 0 5 6 7 0 ]
#	372.47	   |	-	-	-	3.49	4.053	-	  |	100.098	91.411	90.777	90.184	   |     |               |        x x    | [ 0 2 1 3 4 0 11 12 14 0 9 10 8 13 0 5 6 7 0 ]
#	372.517	   |	-	-	-	3.484	4.05	-	  |	100.098	91.492	90.744	90.184	   |     |        $      |        x x    | [ 0 2 1 3 4 0 8 9 10 14 0 11 12 13 0 5 6 7 0 ]
#	372.578	   |	-	-	-	3.477	4.044	-	  |	100.098	91.553	90.744	90.184	   |     |               |        x x    | [ 0 2 1 3 4 0 10 9 8 14 0 11 12 13 0 5 6 7 0 ]
#	372.827	   |	-	-	-	3.446	4.005	-	  |	100.098	91.411	91.134	90.184	   |     |          $    |        x x    | [ 0 2 1 3 4 0 11 12 14 0 8 9 10 13 0 5 6 7 0 ]
#	373.227	   |	-	-	-	3.396	3.991	-	  |	100.098	92.22	90.725	90.184	   |     |               |        x x    | [ 0 2 1 3 4 0 10 9 8 13 0 12 11 14 0 5 6 7 0 ]
#	373.243	   |	-	-	-	3.394	3.99	-	  |	100.098	92.236	90.725	90.184	   |     |        $      |        x x    | [ 0 2 1 3 4 0 8 10 9 13 0 12 11 14 0 5 6 7 0 ]
#	373.913	   |	-	-	-	3.31	3.89	-	  |	100.098	92.22	91.411	90.184	   |     |               |        x x    | [ 0 2 1 3 4 0 10 9 8 13 0 11 12 14 0 5 6 7 0 ]
#	373.929	   |	-	-	-	3.308	3.889	-	  |	100.098	92.236	91.411	90.184	   |     |               |        x x    | [ 0 2 1 3 4 0 8 10 9 13 0 11 12 14 0 5 6 7 0 ]
#	374.497	   |	-	-	9.431	3.237	3.847	-	  |	100.098	92.955	90.777	90.667	   |  *  |               |      x x x    | [ 0 2 1 3 4 0 5 6 7 14 0 9 10 8 13 0 11 12 0 ]
#	374.854	   |	-	-	-	3.192	3.784	-	  |	100.098	92.955	91.134	90.667	   |     |               |        x x    | [ 0 2 1 3 4 0 5 6 7 14 0 8 9 10 13 0 11 12 0 ]
#	375.728	   |	-	-	-	3.094	-	-	  |	100.098	93.955	91.492	90.184	   |     |               |        x      | [ 0 2 1 3 4 0 12 11 13 0 8 9 10 14 0 5 6 7 0 ]
#	375.789	   |	-	-	-	3.079	-	-	  |	100.098	93.955	91.553	90.184	   |     |               |        x      | [ 0 2 1 3 4 0 12 11 13 0 10 9 8 14 0 5 6 7 0 ]
#	375.939	   |	-	-	-	3.057	3.625	0.019	  |	100.098	92.955	92.22	90.667	   |     |        $ $    |        x x x  | [ 0 2 1 3 4 0 5 6 7 14 0 10 9 8 13 0 11 12 0 ]
#	375.956	   |	-	-	-	3.055	3.623	0.019	  |	100.098	92.955	92.236	90.667	   |     |        $ $    |        x x x  | [ 0 2 1 3 4 0 5 6 7 14 0 8 10 9 13 0 11 12 0 ]
#	378.971	   |	-	-	-	2.984	3.599	-	  |	100.098	95.355	93.334	90.184	   |     |               |        x x    | [ 0 2 1 3 4 0 8 12 11 0 10 9 13 14 0 5 6 7 0 ]
#	380.157	   |	-	-	-	2.687	3.519	-	  |	100.098	95.355	94.519	90.184	   |     |               |        x x    | [ 0 2 1 3 4 0 8 12 11 0 13 9 10 14 0 5 6 7 0 ]
#	384.498	   |	-	-	9.358	-	-	-	  |	100.769	100.098	92.22	91.411	   |     |               |      x        | [ 0 5 7 6 0 2 1 3 4 0 10 9 8 13 0 11 12 14 0 ]
#	386.313	   |	-	-	9.278	-	-	-	  |	100.769	100.098	93.955	91.492	   |     |               |      x        | [ 0 5 7 6 0 2 1 3 4 0 12 11 13 0 8 9 10 14 0 ]
#	386.374	   |	-	-	9.216	-	-	-	  |	100.769	100.098	93.955	91.553	   |     |               |      x        | [ 0 5 7 6 0 2 1 3 4 0 12 11 13 0 10 9 8 14 0 ]
#	388.501	   |	-	-	8.549	-	3.504	-	  |	100.769	100.098	95.414	92.22	   |     |               |      x   x    | [ 0 5 7 6 0 2 1 3 4 0 8 12 11 14 0 10 9 13 0 ]
#	388.979	   |	-	-	8.012	-	3.327	0.018	  |	100.769	100.098	95.355	92.757	   |     |               |      x   x x  | [ 0 5 7 6 0 2 1 3 4 0 8 12 11 0 13 10 9 14 0 ]
#	389.557	   |	-	-	7.435	-	3.136	0.017	  |	100.769	100.098	95.355	93.334	   |     |               |      x   x x  | [ 0 5 7 6 0 2 1 3 4 0 8 12 11 0 10 9 13 14 0 ]
#	390.742	   |	-	-	6.25	-	2.774	0.015	  |	100.769	100.098	95.355	94.519	   |     |               |      x   x x  | [ 0 5 7 6 0 2 1 3 4 0 8 12 11 0 13 9 10 14 0 ]
#	399.843	   |	-	-	-	2.655	-	-	  |	103.138	101.489	100.566	94.651	   |     |               |        x      | [ 0 9 10 12 13 0 3 1 2 8 0 7 11 0 6 4 5 14 0 ]
#	400.516	   |	-	-	-	2.546	-	-	  |	104.58	100.769	100.098	95.069	   |     |               |        x      | [ 0 9 8 10 0 5 7 6 0 2 1 3 4 0 12 11 13 14 0 ]
#	401.356	   |	-	-	-	2.406	-	0.015	  |	104.721	100.769	98.383	97.482	   |     |               |        x   x  | [ 0 2 10 9 0 5 7 6 0 11 12 8 13 0 4 1 3 14 0 ]
#	401.616	   |	-	-	-	2.341	2.757	0.015	  |	104.721	100.769	98.643	97.482	   |     |               |        x x x  | [ 0 2 10 9 0 5 7 6 0 8 12 11 13 0 4 1 3 14 0 ]
#	401.793	   |	-	-	5.211	1.403	1.85	0.01	  |	103.138	100.566	100.164	97.926	   |  *  |               |      x x x x  | [ 0 9 10 12 13 0 7 11 0 5 3 4 6 0 1 2 8 14 0 ]
#	402.638	   |	-	-	1.346	0.518	0.552	0.003	  |	101.444	100.912	100.184	100.098	   |     |      $   $ $  |      x x x x  | [ 0 8 10 12 13 0 9 11 0 7 6 5 14 0 2 1 3 4 0 ]
#	403.281	   |	-	-	-	0.387	0.484	0.003	  |	101.444	100.97	100.769	100.098	   |     |        $ $ $  |        x x x  | [ 0 8 10 12 13 0 9 11 14 0 5 7 6 0 2 1 3 4 0 ]
#	405.499	   |	-	-	1.221	-	-	0.002	  |	101.787	101.703	101.444	100.566	   |     |      $     $  |      x     x  | [ 0 1 2 9 14 0 3 4 6 5 0 8 10 12 13 0 7 11 0 ]
#	412.33	   |	-	-	0.979	0.322	0.386	0.002	  |	103.417	103.337	103.138	102.438	   |     |      $ $ $ $  |      x x x x  | [ 0 4 3 6 0 11 7 14 0 9 10 12 13 0 5 1 2 8 0 ]
#	465.167	   |	-	-	-	-	-	0.002	  |	116.941	116.257	116.034	115.935	   |     |               |            x  | [ 0 10 9 12 13 0 6 11 0 4 5 14 7 0 1 3 2 8 0 ]
#	465.591	   |	-	-	0.846	0.252	0.31	0.001	  |	116.88	116.42	116.257	116.034	   |     |               |      x x x x  | [ 0 8 10 9 12 0 2 1 3 13 0 6 11 0 4 5 14 7 0 ]
#	471.67	   |	-	-	0.793	-	-	-	  |	118.339	118.238	117.547	117.546	   |     |               |      x        | [ 0 2 10 12 0 7 11 8 13 0 6 3 1 14 0 4 5 9 0 ]
#	471.962	   |	-	-	0.752	0.229	0.283	0.001	  |	118.448	117.981	117.837	117.696	   |     |               |      x x x x  | [ 0 3 1 4 6 0 8 11 7 14 0 5 10 12 0 2 13 9 0 ]
#	472.159	   |	-	-	0.612	-	0.255	0.001	  |	118.339	118.238	117.855	117.727	   |     |               |      x   x x  | [ 0 2 10 12 0 7 11 8 13 0 1 5 6 14 0 3 4 9 0 ]
#	472.421	   |	-	-	0.422	0.123	0.153	0.001	  |	118.339	118.117	118.048	117.917	   |     |               |      x x x x  | [ 0 2 10 12 0 4 6 7 0 1 3 13 5 0 9 11 8 14 0 ]
#	472.686	   |	-	-	0.358	0.111	0.131	0.001	  |	118.339	118.226	118.14	117.981	   |     |      $ $ $ $  |      x x x x  | [ 0 2 10 12 0 3 13 9 0 1 4 6 5 0 8 11 7 14 0 ]
#	498.019	   |	-	-	0.234	0.1	0.102	0.0	  |	124.606	124.603	124.439	124.372	   |     |      $     $  |      x x x x  | [ 0 5 1 9 10 0 8 2 12 0 11 7 13 0 3 4 14 6 0 ]
#	511.748	   |	-	-	-	0.084	0.099	0.0	  |	128.065	127.976	127.913	127.794	   |     |               |        x x x  | [ 0 4 12 0 2 3 5 6 0 1 8 10 9 0 7 11 14 13 0 ]
#	535.655	   |	-	-	-	0.08	-	0.0	  |	134.057	133.929	133.896	133.772	   |     |               |        x   x  | [ 0 3 10 12 0 6 11 8 13 0 5 7 9 0 2 4 1 14 0 ]
#	536.013	   |	-	-	0.222	-	0.093	0.0	  |	134.118	134.069	133.929	133.896	   |     |               |      x   x x  | [ 0 2 12 10 0 3 1 14 4 0 6 11 8 13 0 5 7 9 0 ]
#	536.177	   |	-	-	-	0.074	0.089	0.0	  |	134.128	134.096	134.057	133.896	   |     |               |        x x x  | [ 0 4 8 13 11 0 2 1 6 14 0 3 10 12 0 5 7 9 0 ]
#	539.874	   |	-	-	0.131	0.036	0.047	0.0	  |	135.04	134.966	134.958	134.909	   |     |      $ $ $ $  |      x x x x  | [ 0 3 13 8 11 0 2 9 7 0 5 6 12 0 4 1 10 14 0 ]
#	599.053	   |	-	-	0.098	-	0.041	0.0	  |	149.806	149.8	149.74	149.708	   |     |      $   $ $  |      x   x x  | [ 0 4 10 11 0 6 14 8 7 0 12 3 13 0 1 5 2 9 0 ]
$	=================================================================================================================================================================================================
&	Nb Total   |	3	4	29	44	44	32	  |	
&	Nb TSP-opt |	3	4	7	7	7	6	  |	
&	Nb Supprtd |	3	4	11	13	16	13	  |	
&	Nb Incons. |	0	0	25	40	40	28	  |	
$	=================================================================================================================================================================================================
&	Overlap F1 |	 	3	3	3	3	3	  |	
&	Overlap F2 |	 	 	4	4	4	4	  |	
&	Overlap F3 |	 	 	 	17	24	23	  |	
&	Overlap F4 |	 	 	 	 	37	24	  |	
&	Overlap F5 |	 	 	 	 	 	28	  |	
$	=================================================================================================================================================================================================
