$	=======================================================================================================================================================================================
$	F0	   |	F1	F2	F3	F4	F5	F6	  |	R1	R2	R3	   | TSP |   Supported   | Inconsistency | Solution
$	=======================================================================================================================================================================================
#	280.483	   |	114.838	1	39.135	14.229	16.173	0.093	  |	114.838	89.941	75.704	   |  *  |  $ $ $ $ $ $  |               | [ 0 1 6 7 14 8 0 2 9 10 4 11 0 3 12 5 13 0 ]
#	283.223	   |	-	-	36.395	13.621	15.19	0.086	  |	114.838	89.941	78.444	   |     |      $   $ $  |      x x x x  | [ 0 1 6 7 14 8 0 2 9 10 4 11 0 3 13 5 12 0 ]
#	285.102	   |	-	-	34.516	13.203	14.544	0.081	  |	114.838	89.941	80.323	   |     |            $  |      x x x x  | [ 0 1 6 7 14 8 0 2 9 10 4 11 0 3 12 13 5 0 ]
#	285.675	   |	-	-	33.942	13.076	14.352	0.079	  |	114.838	89.941	80.896	   |     |      $     $  |      x x x x  | [ 0 1 6 7 14 8 0 2 9 10 4 11 0 3 5 13 12 0 ]
#	290.649	   |	-	-	32.384	-	14.103	0.074	  |	116.546	89.941	84.162	   |  *  |               |      x   x x  | [ 0 12 5 6 1 13 0 2 9 10 4 11 0 3 7 14 8 0 ]
#	292.395	   |	-	-	-	12.721	-	-	  |	116.546	93.076	82.774	   |  *  |               |        x      | [ 0 12 5 6 1 13 0 3 11 4 10 9 0 2 8 14 7 0 ]
#	292.435	   |	-	-	-	12.69	-	-	  |	114.838	99.153	78.444	   |     |               |        x      | [ 0 1 6 7 14 8 0 2 9 10 11 4 0 3 13 5 12 0 ]
#	292.583	   |	-	-	-	12.679	-	-	  |	116.546	93.256	82.781	   |     |               |        x      | [ 0 12 5 6 1 13 0 2 9 8 14 7 0 3 10 4 11 0 ]
#	292.655	   |	-	-	30.378	12.663	13.519	0.069	  |	116.546	89.941	86.168	   |     |               |      x x x x  | [ 0 12 5 6 1 13 0 2 9 10 4 11 0 3 8 14 7 0 ]
#	292.814	   |	-	-	-	12.628	-	-	  |	116.546	95.688	80.58	   |     |               |        x      | [ 0 12 5 6 1 13 0 9 8 7 14 0 2 10 4 11 3 0 ]
#	294.314	   |	-	-	-	11.855	-	-	  |	114.838	99.153	80.323	   |     |               |        x      | [ 0 1 6 7 14 8 0 2 9 10 11 4 0 3 12 13 5 0 ]
#	294.34	   |	-	-	28.693	-	13.062	0.065	  |	116.546	89.941	87.853	   |     |               |      x   x x  | [ 0 12 5 6 1 13 0 2 9 10 4 11 0 3 14 7 8 0 ]
#	294.888	   |	-	-	-	11.6	-	-	  |	114.838	99.153	80.896	   |     |               |        x      | [ 0 1 6 7 14 8 0 2 9 10 11 4 0 3 5 13 12 0 ]
#	295.27	   |	-	-	27.764	-	12.824	0.063	  |	116.546	89.941	88.783	   |     |               |      x   x x  | [ 0 12 5 6 1 13 0 2 9 10 4 11 0 3 8 7 14 0 ]
#	296.192	   |	-	-	24.898	10.738	11.406	0.056	  |	114.838	91.413	89.941	   |     |      $     $  |      x x x x  | [ 0 1 6 7 14 8 0 12 3 5 13 0 2 9 10 4 11 0 ]
#	298.359	   |	-	-	-	10.257	10.98	0.056	  |	114.838	93.58	89.941	   |     |               |        x x x  | [ 0 1 6 7 14 8 0 5 13 3 12 0 2 9 10 4 11 0 ]
#	298.498	   |	-	-	-	10.226	10.978	-	  |	114.838	93.901	89.758	   |  *  |               |        x x    | [ 0 1 6 7 14 8 0 2 13 5 12 3 0 9 10 4 11 0 ]
#	298.897	   |	112.698	2	22.758	8.711	9.592	0.051	  |	112.698	96.258	89.941	   |  *  |      $ $ $ $  |               | [ 0 6 7 14 8 0 3 12 5 1 13 0 2 9 10 4 11 0 ]
#	300.616	   |	-	-	-	8.329	9.423	0.05	  |	112.698	97.977	89.941	   |     |               |        x x x  | [ 0 6 7 14 8 0 1 13 5 12 3 0 2 9 10 4 11 0 ]
#	301.099	   |	-	-	21.763	-	-	0.048	  |	114.838	93.185	93.076	   |  *  |               |      x     x  | [ 0 1 6 7 14 8 0 2 13 5 12 0 3 11 4 10 9 0 ]
#	301.637	   |	-	-	-	8.102	9.355	-	  |	112.698	98.998	89.941	   |     |               |        x x    | [ 0 6 7 14 8 0 3 13 1 5 12 0 2 9 10 4 11 0 ]
#	302.581	   |	-	-	-	-	-	0.048	  |	114.838	94.667	93.076	   |     |               |            x  | [ 0 1 6 7 14 8 0 2 12 5 13 0 3 11 4 10 9 0 ]
#	303.516	   |	-	-	-	7.684	9.293	-	  |	112.698	100.877	89.941	   |     |               |        x x    | [ 0 6 7 14 8 0 3 12 13 1 5 0 2 9 10 4 11 0 ]
#	304.089	   |	-	-	-	7.615	9.291	-	  |	112.698	101.45	89.941	   |     |               |        x x    | [ 0 6 7 14 8 0 3 5 1 13 12 0 2 9 10 4 11 0 ]
#	306.498	   |	111.845	3	-	-	9.122	0.048	  |	111.845	104.712	89.941	   |  *  |               |               | [ 0 3 12 5 8 0 13 1 6 7 14 0 2 9 10 4 11 0 ]
#	307.104	   |	-	-	-	-	-	0.047	  |	114.838	99.19	93.076	   |     |               |            x  | [ 0 1 6 7 14 8 0 2 5 13 12 0 3 11 4 10 9 0 ]
#	307.2	   |	-	-	-	-	-	0.047	  |	114.838	99.286	93.076	   |     |               |            x  | [ 0 1 6 7 14 8 0 2 12 13 5 0 3 11 4 10 9 0 ]
#	307.512	   |	-	-	21.653	-	9.093	0.047	  |	114.838	99.488	93.185	   |     |               |      x   x x  | [ 0 1 6 7 14 8 0 3 9 10 4 11 0 2 13 5 12 0 ]
#	307.571	   |	-	-	21.259	-	9.0	0.046	  |	114.838	99.153	93.58	   |     |               |      x   x x  | [ 0 1 6 7 14 8 0 2 9 10 11 4 0 5 13 3 12 0 ]
#	307.602	   |	-	-	21.178	-	-	0.046	  |	116.546	95.688	95.368	   |     |               |      x     x  | [ 0 12 5 6 1 13 0 9 8 7 14 0 3 2 11 4 10 0 ]
#	307.71	   |	-	-	20.937	-	8.919	0.045	  |	114.838	98.97	93.901	   |     |               |      x   x x  | [ 0 1 6 7 14 8 0 4 11 10 9 0 2 13 5 12 3 0 ]
#	308.109	   |	-	-	16.441	6.663	7.166	0.036	  |	112.698	99.153	96.258	   |     |               |      x x x x  | [ 0 6 7 14 8 0 2 9 10 11 4 0 3 12 5 1 13 0 ]
#	309.552	   |	-	-	-	6.343	6.957	0.035	  |	112.698	100.596	96.258	   |     |               |        x x x  | [ 0 6 7 14 8 0 2 11 4 10 9 0 3 12 5 1 13 0 ]
#	309.829	   |	-	-	14.721	6.281	6.68	0.032	  |	112.698	99.153	97.977	   |     |               |      x x x x  | [ 0 6 7 14 8 0 2 9 10 11 4 0 1 13 5 12 3 0 ]
#	310.849	   |	-	-	13.701	6.055	6.422	0.029	  |	112.698	99.153	98.998	   |     |      $     $  |      x x x x  | [ 0 6 7 14 8 0 2 9 10 11 4 0 3 13 1 5 12 0 ]
#	311.272	   |	-	-	-	5.961	6.412	-	  |	112.698	100.596	97.977	   |     |               |        x x    | [ 0 6 7 14 8 0 2 11 4 10 9 0 1 13 5 12 3 0 ]
#	311.648	   |	-	-	-	5.877	-	-	  |	112.698	102.692	96.258	   |     |               |        x      | [ 0 6 7 14 8 0 9 2 10 4 11 0 3 12 5 1 13 0 ]
#	312.292	   |	-	-	-	5.734	6.117	0.029	  |	112.698	100.596	98.998	   |     |               |        x x x  | [ 0 6 7 14 8 0 2 11 4 10 9 0 3 13 1 5 12 0 ]
#	312.728	   |	-	-	13.545	5.637	6.02	0.029	  |	112.698	100.877	99.153	   |     |               |      x x x x  | [ 0 6 7 14 8 0 3 12 13 1 5 0 2 9 10 11 4 0 ]
#	313.302	   |	-	-	-	5.51	5.919	0.029	  |	112.698	101.45	99.153	   |     |               |        x x x  | [ 0 6 7 14 8 0 3 5 1 13 12 0 2 9 10 11 4 0 ]
#	313.368	   |	-	-	-	5.495	-	-	  |	112.698	102.692	97.977	   |     |               |        x      | [ 0 6 7 14 8 0 9 2 10 4 11 0 1 13 5 12 3 0 ]
#	313.563	   |	-	-	-	5.451	5.876	0.029	  |	112.698	101.712	99.153	   |     |               |        x x x  | [ 0 6 7 14 8 0 3 1 13 5 12 0 2 9 10 11 4 0 ]
#	314.171	   |	-	-	12.102	5.316	5.64	0.026	  |	112.698	100.877	100.596	   |     |               |      x x x x  | [ 0 6 7 14 8 0 3 12 13 1 5 0 2 11 4 10 9 0 ]
#	314.388	   |	-	-	-	5.268	-	-	  |	112.698	102.692	98.998	   |     |               |        x      | [ 0 6 7 14 8 0 9 2 10 4 11 0 3 13 1 5 12 0 ]
#	314.745	   |	-	-	-	5.189	5.515	0.026	  |	112.698	101.45	100.596	   |     |               |        x x x  | [ 0 6 7 14 8 0 3 5 1 13 12 0 2 11 4 10 9 0 ]
#	315.006	   |	-	-	-	5.131	5.461	0.026	  |	112.698	101.712	100.596	   |     |               |        x x x  | [ 0 6 7 14 8 0 3 1 13 5 12 0 2 11 4 10 9 0 ]
#	315.71	   |	-	-	-	4.406	5.195	-	  |	111.845	104.712	99.153	   |     |               |          x    | [ 0 3 12 5 8 0 13 1 6 7 14 0 2 9 10 11 4 0 ]
#	316.267	   |	-	-	11.822	-	-	0.025	  |	112.698	102.692	100.877	   |     |               |      x     x  | [ 0 6 7 14 8 0 9 2 10 4 11 0 3 12 13 1 5 0 ]
#	316.841	   |	-	-	11.248	-	5.035	0.024	  |	112.698	102.692	101.45	   |     |               |      x   x x  | [ 0 6 7 14 8 0 9 2 10 4 11 0 3 5 1 13 12 0 ]
#	317.102	   |	-	-	10.986	-	4.964	0.023	  |	112.698	102.692	101.712	   |     |               |      x   x x  | [ 0 6 7 14 8 0 9 2 10 4 11 0 3 1 13 5 12 0 ]
#	317.153	   |	-	-	-	4.085	4.647	-	  |	111.845	104.712	100.596	   |     |               |        x x    | [ 0 3 12 5 8 0 13 1 6 7 14 0 2 11 4 10 9 0 ]
#	319.249	   |	-	-	9.153	3.619	3.926	0.019	  |	111.845	104.712	102.692	   |     |               |        x x x  | [ 0 3 12 5 8 0 13 1 6 7 14 0 9 2 10 4 11 0 ]
#	321.885	   |	-	-	-	3.354	-	-	  |	112.326	106.867	102.692	   |     |               |        x      | [ 0 5 13 14 8 0 3 12 1 6 7 0 9 2 10 4 11 0 ]
#	322.092	   |	-	-	-	3.342	-	-	  |	112.377	107.023	102.692	   |     |               |        x      | [ 0 8 13 5 12 0 3 1 6 7 14 0 9 2 10 4 11 0 ]
#	322.299	   |	-	-	7.134	2.942	3.148	0.015	  |	111.845	105.742	104.712	   |     |               |      x x x x  | [ 0 3 12 5 8 0 2 4 11 10 9 0 13 1 6 7 14 0 ]
#	323.37	   |	-	-	-	2.704	2.993	0.015	  |	111.845	106.813	104.712	   |     |               |        x x x  | [ 0 3 12 5 8 0 2 9 11 4 10 0 13 1 6 7 14 0 ]
#	323.785	   |	109.677	4	4.966	2.144	2.277	0.01	  |	109.677	109.396	104.712	   |  *  |  $ $ $ $ $ $  |               | [ 0 2 8 9 10 4 0 3 12 5 11 0 13 1 6 7 14 0 ]
#	327.687	   |	-	-	-	2.065	-	-	  |	112.326	108.494	106.867	   |     |               |        x      | [ 0 5 13 14 8 0 2 9 4 11 10 0 3 12 1 6 7 0 ]
#	327.692	   |	-	-	-	2.03	2.274	-	  |	112.275	108.603	106.813	   |     |               |        x x    | [ 0 8 14 5 12 0 3 7 6 1 13 0 2 9 11 4 10 0 ]
#	327.895	   |	-	-	-	-	2.259	-	  |	112.377	108.494	107.023	   |     |               |          x    | [ 0 8 13 5 12 0 2 9 4 11 10 0 3 1 6 7 14 0 ]
#	328.13	   |	-	-	-	1.966	2.25	-	  |	112.326	108.937	106.867	   |     |               |        x x    | [ 0 5 13 14 8 0 2 10 4 11 9 0 3 12 1 6 7 0 ]
#	328.337	   |	-	-	-	1.954	2.215	-	  |	112.377	108.937	107.023	   |     |               |        x x    | [ 0 8 13 5 12 0 2 10 4 11 9 0 3 1 6 7 14 0 ]
#	328.584	   |	-	-	4.57	1.832	1.977	0.009	  |	112.275	108.603	107.705	   |     |               |      x x x x  | [ 0 8 14 5 12 0 3 7 6 1 13 0 2 10 9 4 11 0 ]
#	329.373	   |	-	-	3.781	1.656	1.757	0.008	  |	112.275	108.603	108.494	   |     |               |      x x x x  | [ 0 8 14 5 12 0 3 7 6 1 13 0 2 9 4 11 10 0 ]
#	329.815	   |	-	-	3.672	1.558	1.658	0.007	  |	112.275	108.937	108.603	   |     |               |      x x x x  | [ 0 8 14 5 12 0 2 10 4 11 9 0 3 7 6 1 13 0 ]
#	331.497	   |	-	-	-	1.264	1.501	0.007	  |	112.275	110.618	108.603	   |     |               |        x x x  | [ 0 8 14 5 12 0 2 10 11 4 9 0 3 7 6 1 13 0 ]
#	332.103	   |	-	-	-	-	-	0.007	  |	112.275	111.224	108.603	   |     |               |            x  | [ 0 8 14 5 12 0 9 2 11 4 10 0 3 7 6 1 13 0 ]
#	332.442	   |	-	-	3.44	1.252	1.422	0.007	  |	112.377	111.128	108.937	   |     |               |      x x x x  | [ 0 8 13 5 12 0 1 6 7 14 3 0 2 10 4 11 9 0 ]
#	333.384	   |	-	-	3.288	-	1.39	0.007	  |	113.027	110.618	109.739	   |     |               |      x   x x  | [ 0 3 5 13 8 0 2 10 11 4 9 0 12 1 6 7 14 0 ]
#	333.99	   |	-	-	-	1.131	1.344	0.007	  |	113.027	111.224	109.739	   |     |               |        x x x  | [ 0 3 5 13 8 0 9 2 11 4 10 0 12 1 6 7 14 0 ]
#	334.123	   |	-	-	1.759	0.668	0.739	0.004	  |	112.377	111.128	110.618	   |     |               |      x x x x  | [ 0 8 13 5 12 0 1 6 7 14 3 0 2 10 11 4 9 0 ]
#	334.73	   |	-	-	1.249	0.534	0.567	0.002	  |	112.377	111.224	111.128	   |     |      $ $ $ $  |      x x x x  | [ 0 8 13 5 12 0 9 2 11 4 10 0 1 6 7 14 3 0 ]
#	335.41	   |	-	-	-	0.45	0.515	0.002	  |	112.377	111.905	111.128	   |     |        $      |        x x x  | [ 0 8 13 5 12 0 4 11 10 2 9 0 1 6 7 14 3 0 ]
#	336.365	   |	-	-	0.936	0.384	0.412	0.002	  |	112.698	111.905	111.762	   |     |               |      x x x x  | [ 0 6 7 14 8 0 4 11 10 2 9 0 3 13 5 1 12 0 ]
#	336.57	   |	-	-	0.793	0.339	0.36	0.002	  |	112.698	111.967	111.905	   |     |               |      x x x x  | [ 0 6 7 14 8 0 12 3 5 1 13 0 4 11 10 2 9 0 ]
#	338.342	   |	-	-	0.774	0.308	0.333	0.002	  |	113.093	112.93	112.319	   |     |               |      x x x x  | [ 0 3 12 5 13 8 0 4 11 9 10 0 1 6 7 14 2 0 ]
#	339.007	   |	-	-	0.155	0.055	0.064	0.0	  |	113.085	112.992	112.93	   |     |      $ $ $ $  |      x x x x  | [ 0 2 7 6 1 13 0 3 12 5 14 8 0 4 11 9 10 0 ]
#	340.493	   |	-	-	0.061	0.027	0.029	0.0	  |	113.519	113.517	113.457	   |     |      $ $ $ $  |      x x x x  | [ 0 3 12 5 1 6 0 13 8 7 14 0 10 9 2 4 11 0 ]
#	365.428	   |	-	-	0.047	0.018	0.02	0.0	  |	121.829	121.818	121.782	   |     |               |      x x x x  | [ 0 2 14 7 1 5 0 3 12 13 6 8 0 4 10 11 9 0 ]
#	377.356	   |	-	-	0.039	0.017	0.018	0.0	  |	125.799	125.796	125.76	   |     |               |      x x x x  | [ 0 6 1 5 13 12 0 3 7 9 2 10 0 4 11 14 8 0 ]
#	394.696	   |	-	-	0.026	0.009	0.011	0.0	  |	131.579	131.564	131.553	   |     |               |      x x x x  | [ 0 3 7 8 9 4 0 10 11 12 14 0 2 6 1 13 5 0 ]
#	399.364	   |	-	-	0.01	0.004	0.004	0.0	  |	133.127	133.12	133.117	   |     |      $ $ $ $  |      x x x x  | [ 0 3 11 4 10 7 0 5 14 8 12 0 2 9 1 6 13 0 ]
#	419.92	   |	-	-	0.005	0.002	0.002	0.0	  |	139.976	139.973	139.971	   |     |      $ $ $ $  |      x x x x  | [ 0 1 6 8 9 3 0 5 12 10 4 11 0 7 2 14 13 0 ]
#	450.117	   |	-	-	0.005	0.002	0.002	0.0	  |	150.041	150.039	150.036	   |     |               |      x x x x  | [ 0 8 4 3 9 0 2 12 13 10 11 0 1 5 6 7 14 0 ]
#	478.988	   |	-	-	0.002	0.001	0.001	0.0	  |	159.664	159.663	159.661	   |     |      $ $ $ $  |      x x x x  | [ 0 4 12 5 6 0 3 9 10 13 8 0 7 1 14 2 11 0 ]
#	509.848	   |	-	-	0.002	0.001	0.001	0.0	  |	169.95	169.949	169.948	   |     |        $ $    |      x x x x  | [ 0 4 7 2 11 0 3 13 12 10 5 0 6 1 9 14 8 0 ]
#	533.43	   |	-	-	0.001	0.0	0.001	0.0	  |	177.811	177.81	177.81	   |     |      $ $ $ $  |      x x x x  | [ 0 9 6 1 3 14 0 12 7 4 13 0 2 8 5 11 10 0 ]
$	=======================================================================================================================================================================================
&	Nb Total   |	4	4	47	69	68	64	  |	
&	Nb TSP-opt |	4	4	5	5	6	6	  |	
&	Nb Supprtd |	2	2	14	12	12	15	  |	
&	Nb Incons. |	0	0	43	65	64	60	  |	
$	=======================================================================================================================================================================================
&	Overlap F1 |	 	4	3	3	4	4	  |	
&	Overlap F2 |	 	 	3	3	4	4	  |	
&	Overlap F3 |	 	 	 	35	44	47	  |	
&	Overlap F4 |	 	 	 	 	57	47	  |	
&	Overlap F5 |	 	 	 	 	 	57	  |	
$	=======================================================================================================================================================================================
