#FIG 3.2  Produced by xfig version 3.2.6a
Landscape
Center
Metric
A4
100.00
Single
-2
1200 2
6 3060 3060 4590 4500
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 3060 3330 4500 3330
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 4500 4500 4500 3060 3060 3060 3060 4500 4500 4500
4 0 0 50 -1 0 14 0.0000 4 225 795 3150 3285 Package\001
4 0 0 50 -1 0 12 0.0000 4 195 855 3150 3510 .depth = 1\001
4 0 0 50 -1 0 12 0.0000 4 195 1455 3150 3735 .logical_index =0\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 3150 3960 .os_index = 0\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 3150 4185 .sibling_rank=0\001
4 0 0 50 -1 0 12 0.0000 4 195 675 3150 4410 .arity=2\001
-6
6 4500 3375 8505 3915
2 1 0 1 1 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 4500 3600 8415 3600
2 1 0 1 1 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 8415 3690 4500 3690
4 0 1 50 -1 0 12 0.0000 4 195 1020 4545 3510 next_sibling\001
4 0 1 50 -1 0 12 0.0000 4 195 1035 7470 3870 prev_sibling\001
-6
6 7290 2250 8640 2610
4 2 0 50 -1 0 12 0.0000 4 195 810 8640 2565 last_child\001
4 2 0 50 -1 0 12 0.0000 4 195 945 8190 2385 children[1]\001
-6
6 2205 4590 3285 4950
4 0 0 50 -1 0 12 0.0000 4 195 945 2385 4725 children[0]\001
4 0 0 50 -1 0 12 0.0000 4 195 840 2205 4905 first_child\001
-6
6 4185 4590 5265 4950
4 0 0 50 -1 0 12 0.0000 4 195 945 4185 4725 children[1]\001
4 0 0 50 -1 0 12 0.0000 4 195 810 4455 4905 last_child\001
-6
6 7605 4590 8685 4950
4 0 0 50 -1 0 12 0.0000 4 195 945 7785 4725 children[0]\001
4 0 0 50 -1 0 12 0.0000 4 195 840 7605 4905 first_child\001
-6
6 4275 2250 5625 2610
4 0 0 50 -1 0 12 0.0000 4 195 840 4275 2565 first_child\001
4 0 0 50 -1 0 12 0.0000 4 195 945 4725 2385 children[0]\001
-6
6 4770 810 5445 1440
4 0 4 50 -1 0 12 0.0000 4 150 765 4770 945 Machine\001
4 0 4 50 -1 0 12 0.0000 4 150 405 4770 1170 level\001
4 0 4 50 -1 0 12 0.0000 4 195 705 4770 1395 depth=0\001
-6
6 2115 3150 2790 3780
4 0 4 50 -1 0 12 0.0000 4 195 750 2115 3285 Package\001
4 0 4 50 -1 0 12 0.0000 4 150 405 2115 3510 level\001
4 0 4 50 -1 0 12 0.0000 4 195 705 2115 3735 depth=1\001
-6
6 3105 5625 4455 6795
6 3105 5625 4455 6165
2 1 0 1 1 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 3105 5850 4365 5850
2 1 0 1 1 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 4365 5940 3105 5940
4 0 1 50 -1 0 12 0.0000 4 195 1020 3150 5760 next_sibling\001
4 0 1 50 -1 0 12 0.0000 4 195 1035 3420 6120 prev_sibling\001
-6
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 3105 6480 4365 6480
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 4365 6570 3105 6570
4 0 4 50 -1 0 12 0.0000 4 195 1035 3150 6390 next_cousin\001
4 0 4 50 -1 0 12 0.0000 4 195 1050 3375 6750 prev_cousin\001
-6
6 5805 6255 7080 6795
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 5805 6480 7065 6480
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 7065 6570 5805 6570
4 0 4 50 -1 0 12 0.0000 4 195 1035 5850 6390 next_cousin\001
4 0 4 50 -1 0 12 0.0000 4 195 1050 6075 6750 prev_cousin\001
-6
6 765 5490 1440 6120
4 0 4 50 -1 0 12 0.0000 4 150 570 765 5625 Cache\001
4 0 4 50 -1 0 12 0.0000 4 150 405 765 5850 level\001
4 0 4 50 -1 0 12 0.0000 4 195 705 765 6075 depth=2\001
-6
6 4230 6930 5130 7560
4 0 0 50 -1 0 12 0.0000 4 195 840 4230 7290 first_child\001
4 0 0 50 -1 0 12 0.0000 4 195 810 4230 7515 last_child\001
4 0 0 50 -1 0 12 0.0000 4 195 945 4230 7065 children[0]\001
-6
6 6930 6930 7830 7560
4 0 0 50 -1 0 12 0.0000 4 195 840 6930 7290 first_child\001
4 0 0 50 -1 0 12 0.0000 4 195 810 6930 7515 last_child\001
4 0 0 50 -1 0 12 0.0000 4 195 945 6930 7065 children[0]\001
-6
6 1530 6930 2430 7560
4 0 0 50 -1 0 12 0.0000 4 195 840 1530 7290 first_child\001
4 0 0 50 -1 0 12 0.0000 4 195 810 1530 7515 last_child\001
4 0 0 50 -1 0 12 0.0000 4 195 945 1530 7065 children[0]\001
-6
6 9765 7740 11340 9180
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 9765 8010 11205 8010
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 11205 9180 11205 7740 9765 7740 9765 9180 11205 9180
4 0 0 50 -1 0 14 0.0000 4 165 480 9855 7965 Core\001
4 0 0 50 -1 0 12 0.0000 4 195 675 9855 9090 .arity=1\001
4 0 0 50 -1 0 12 0.0000 4 195 855 9855 8190 .depth = 3\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 9855 8415 .logical_index = 3\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 9855 8640 .os_index = 1\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 9855 8865 .sibling_rank=0\001
-6
6 5805 8595 7080 9135
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 5805 8820 7065 8820
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 7065 8910 5805 8910
4 0 4 50 -1 0 12 0.0000 4 195 1035 5850 8730 next_cousin\001
4 0 4 50 -1 0 12 0.0000 4 195 1050 6075 9090 prev_cousin\001
-6
6 765 7830 1440 8460
4 0 4 50 -1 0 12 0.0000 4 150 435 765 7965 Core\001
4 0 4 50 -1 0 12 0.0000 4 150 405 765 8190 level\001
4 0 4 50 -1 0 12 0.0000 4 195 705 765 8415 depth=3\001
-6
6 4230 9270 5130 9900
4 0 0 50 -1 0 12 0.0000 4 195 840 4230 9630 first_child\001
4 0 0 50 -1 0 12 0.0000 4 195 810 4230 9855 last_child\001
4 0 0 50 -1 0 12 0.0000 4 195 945 4230 9405 children[0]\001
-6
6 6930 9270 7830 9900
4 0 0 50 -1 0 12 0.0000 4 195 840 6930 9630 first_child\001
4 0 0 50 -1 0 12 0.0000 4 195 810 6930 9855 last_child\001
4 0 0 50 -1 0 12 0.0000 4 195 945 6930 9405 children[0]\001
-6
6 1530 9270 2430 9900
4 0 0 50 -1 0 12 0.0000 4 195 840 1530 9630 first_child\001
4 0 0 50 -1 0 12 0.0000 4 195 810 1530 9855 last_child\001
4 0 0 50 -1 0 12 0.0000 4 195 945 1530 9405 children[0]\001
-6
6 9630 9270 10530 9900
4 0 0 50 -1 0 12 0.0000 4 195 840 9630 9630 first_child\001
4 0 0 50 -1 0 12 0.0000 4 195 810 9630 9855 last_child\001
4 0 0 50 -1 0 12 0.0000 4 195 945 9630 9405 children[0]\001
-6
6 3105 10935 4380 11475
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 3105 11160 4365 11160
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 4365 11250 3105 11250
4 0 4 50 -1 0 12 0.0000 4 195 1035 3150 11070 next_cousin\001
4 0 4 50 -1 0 12 0.0000 4 195 1050 3375 11430 prev_cousin\001
-6
6 5805 10935 7080 11475
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 5805 11160 7065 11160
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 7065 11250 5805 11250
4 0 4 50 -1 0 12 0.0000 4 195 1035 5850 11070 next_cousin\001
4 0 4 50 -1 0 12 0.0000 4 195 1050 6075 11430 prev_cousin\001
-6
6 765 10170 1440 10800
4 0 4 50 -1 0 12 0.0000 4 150 270 765 10305 PU\001
4 0 4 50 -1 0 12 0.0000 4 150 405 765 10530 level\001
4 0 4 50 -1 0 12 0.0000 4 195 705 765 10755 depth=4\001
-6
6 9540 4590 10620 4950
4 0 0 50 -1 0 12 0.0000 4 195 945 9540 4725 children[1]\001
4 0 0 50 -1 0 12 0.0000 4 195 810 9810 4905 last_child\001
-6
6 9765 10080 11340 11520
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 9765 10350 11205 10350
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 11205 11520 11205 10080 9765 10080 9765 11520 11205 11520
4 0 0 50 -1 0 12 0.0000 4 195 1140 9855 10980 .os_index = 3\001
4 0 0 50 -1 0 14 0.0000 4 165 315 9855 10305 PU\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 9855 11205 .sibling_rank=0\001
4 0 0 50 -1 0 12 0.0000 4 195 675 9855 11430 .arity=0\001
4 0 0 50 -1 0 12 0.0000 4 195 855 9855 10530 .depth = 4\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 9855 10755 .logical_index = 3\001
-6
6 8505 10935 9780 11475
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 8505 11160 9765 11160
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 9765 11250 8505 11250
4 0 4 50 -1 0 12 0.0000 4 195 1035 8550 11070 next_cousin\001
4 0 4 50 -1 0 12 0.0000 4 195 1050 8775 11430 prev_cousin\001
-6
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 9036 4488 7686 5388
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 2
	1 1 1.00 60.00 120.00
	 9135 4500 7785 5400
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 8415 3330 9855 3330
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 9855 4500 9855 3060 8415 3060 8415 4500 9855 4500
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 2
	1 1 1.00 60.00 120.00
	 6435 2160 3735 3060
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 6210 2160 3510 3060
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 4500 4050 8415 4050
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 8415 4140 4500 4140
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 3831 4492 5181 5392
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 3636 4488 2286 5388
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 5085 5400 3735 4500
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 2
	1 1 1.00 60.00 120.00
	 3735 4500 2385 5400
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 6660 2160 9360 3060
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 2
	1 1 1.00 60.00 120.00
	 6435 2160 9135 3060
2 2 0 1 4 7 50 -1 -1 0.000 0 0 -1 0 0 5
	 10080 3015 2835 3015 2835 4545 10080 4545 10080 3015
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 4365 5670 5805 5670
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 5805 6840 5805 5400 4365 5400 4365 6840 5805 6840
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 7065 5670 8505 5670
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 1665 5670 3105 5670
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 3105 6840 3105 5400 1665 5400 1665 6840 3105 6840
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 8505 6840 8505 5400 7065 5400 7065 6840 8505 6840
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 2340 6840 2340 7740
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 2
	1 1 1.00 60.00 120.00
	 2430 6840 2430 7740
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 5040 6840 5040 7740
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 2
	1 1 1.00 60.00 120.00
	 5130 6840 5130 7740
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 7740 6840 7740 7740
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 2
	1 1 1.00 60.00 120.00
	 7830 6840 7830 7740
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 4365 8010 5805 8010
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 5805 9180 5805 7740 4365 7740 4365 9180 5805 9180
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 7065 8010 8505 8010
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 1665 8010 3105 8010
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 3105 9180 3105 7740 1665 7740 1665 9180 3105 9180
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 8505 9180 8505 7740 7065 7740 7065 9180 8505 9180
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 2340 9180 2340 10080
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 2
	1 1 1.00 60.00 120.00
	 2430 9180 2430 10080
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 5040 9180 5040 10080
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 2
	1 1 1.00 60.00 120.00
	 5130 9180 5130 10080
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 7740 9180 7740 10080
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 2
	1 1 1.00 60.00 120.00
	 7830 9180 7830 10080
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 10440 9180 10440 10080
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 2
	1 1 1.00 60.00 120.00
	 10530 9180 10530 10080
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 4365 10350 5805 10350
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 5805 11520 5805 10080 4365 10080 4365 11520 5805 11520
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 7065 10350 8505 10350
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 8505 11520 8505 10080 7065 10080 7065 11520 8505 11520
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 1665 10350 3105 10350
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 3105 11520 3105 10080 1665 10080 1665 11520 3105 11520
2 2 0 1 4 7 50 -1 -1 0.000 0 0 -1 0 0 5
	 11385 10035 1485 10035 1485 11565 11385 11565 11385 10035
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 3105 8820 4365 8820
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 4365 8910 3105 8910
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 8505 8820 9765 8820
2 1 0 1 4 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 9765 8910 8505 8910
2 1 0 1 1 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 8505 5850 9765 8190
2 1 0 1 1 7 50 -1 -1 0.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 9765 8325 8505 6030
2 2 0 1 4 7 50 -1 -1 0.000 0 0 -1 0 0 5
	 8685 5355 1485 5355 1485 6885 8685 6885 8685 5355
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 1 0 4
	1 1 1.00 60.00 120.00
	 9231 4492 10530 5400 10530 6840 10530 7740
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 4
	1 1 1.00 60.00 120.00
	 9135 4500 10440 5400 10440 6840 10440 7740
2 2 0 1 4 7 50 -1 -1 0.000 0 0 -1 0 0 5
	 11385 7695 1485 7695 1485 9225 11385 9225 11385 7695
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 10530 1755 11970 1755
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 0 2
	 5715 720 7245 720
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 7245 2160 7245 450 5715 450 5715 2160 7245 2160
2 2 0 1 4 7 50 -1 -1 0.000 0 0 -1 0 0 5
	 7515 405 5490 405 5490 2205 7515 2205 7515 405
2 1 0 1 0 7 50 -1 -1 0.000 0 0 -1 0 1 2
	1 1 1.00 60.00 120.00
	 7236 2007 10530 2205
2 4 0 1 0 7 50 -1 -1 0.000 0 0 7 0 0 5
	 12015 2700 12015 1440 10530 1440 10530 2700 12015 2700
2 1 1 2 12 7 50 -1 -1 4.000 0 0 -1 1 0 2
	1 1 1.00 60.00 120.00
	 7245 1935 10530 2160
4 2 0 50 -1 0 12 0.0000 4 165 555 8415 2970 parent\001
4 0 0 50 -1 0 12 0.0000 4 165 555 8145 5310 parent\001
4 0 0 50 -1 0 12 0.0000 4 195 675 8505 4410 .arity=2\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 8505 3735 .logical_index = 1\001
4 0 0 50 -1 0 12 0.0000 4 195 855 8505 3510 .depth = 1\001
4 0 0 50 -1 0 14 0.0000 4 225 795 8505 3285 Package\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 8505 4185 .sibling_rank=1\001
4 0 0 50 -1 0 12 0.0000 4 165 555 4455 2970 parent\001
4 0 4 50 -1 0 12 0.0000 4 195 1035 4545 3960 next_cousin\001
4 0 4 50 -1 0 12 0.0000 4 195 1050 7470 4320 prev_cousin\001
4 0 0 50 -1 0 12 0.0000 4 165 555 2745 5310 parent\001
4 0 0 50 -1 0 12 0.0000 4 165 555 4275 5310 parent\001
4 0 0 50 -1 0 12 0.0000 4 195 675 7155 6750 .arity=1\001
4 0 0 50 -1 0 14 0.0000 4 165 600 1755 5625 Cache\001
4 0 0 50 -1 0 14 0.0000 4 165 600 4455 5625 Cache\001
4 0 0 50 -1 0 14 0.0000 4 165 600 7155 5625 Cache\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 1755 6075 .logical_index = 0\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 4455 6075 .logical_index = 1\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 1755 6300 .os_index = 0\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 1755 6525 .sibling_rank=0\001
4 0 0 50 -1 0 12 0.0000 4 195 675 1755 6750 .arity=1\001
4 0 0 50 -1 0 12 0.0000 4 195 675 4455 6750 .arity=1\001
4 0 0 50 -1 0 12 0.0000 4 195 855 1755 5850 .depth = 2\001
4 0 0 50 -1 0 12 0.0000 4 195 855 4455 5850 .depth = 2\001
4 0 0 50 -1 0 12 0.0000 4 195 855 7155 5850 .depth = 2\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 7155 6075 .logical_index = 2\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 4455 6300 .os_index = 1\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 4455 6525 .sibling_rank=1\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 7155 6300 .os_index = 0\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 7155 6525 .sibling_rank=0\001
4 0 0 50 -1 0 12 0.0000 4 165 555 2475 7650 parent\001
4 0 0 50 -1 0 12 0.0000 4 165 555 5175 7650 parent\001
4 0 0 50 -1 0 12 0.0000 4 165 555 7875 7650 parent\001
4 0 0 50 -1 0 12 0.0000 4 195 675 7155 9090 .arity=1\001
4 0 0 50 -1 0 14 0.0000 4 165 480 1755 7965 Core\001
4 0 0 50 -1 0 14 0.0000 4 165 480 4455 7965 Core\001
4 0 0 50 -1 0 14 0.0000 4 165 480 7155 7965 Core\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 1755 8415 .logical_index = 0\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 4455 8415 .logical_index = 1\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 1755 8640 .os_index = 0\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 1755 8865 .sibling_rank=0\001
4 0 0 50 -1 0 12 0.0000 4 195 675 1755 9090 .arity=1\001
4 0 0 50 -1 0 12 0.0000 4 195 675 4455 9090 .arity=1\001
4 0 0 50 -1 0 12 0.0000 4 195 855 1755 8190 .depth = 3\001
4 0 0 50 -1 0 12 0.0000 4 195 855 4455 8190 .depth = 3\001
4 0 0 50 -1 0 12 0.0000 4 195 855 7155 8190 .depth = 3\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 7155 8415 .logical_index = 2\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 4455 8640 .os_index = 1\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 4455 8865 .sibling_rank=0\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 7155 8640 .os_index = 0\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 7155 8865 .sibling_rank=0\001
4 0 0 50 -1 0 12 0.0000 4 165 555 2475 9990 parent\001
4 0 0 50 -1 0 12 0.0000 4 165 555 5175 9990 parent\001
4 0 0 50 -1 0 12 0.0000 4 165 555 7875 9990 parent\001
4 0 0 50 -1 0 12 0.0000 4 165 555 10575 9990 parent\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 1755 10980 .os_index = 0\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 4455 10980 .os_index = 2\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 7155 10980 .os_index = 1\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 1755 11205 .sibling_rank=0\001
4 0 0 50 -1 0 14 0.0000 4 165 315 1755 10305 PU\001
4 0 0 50 -1 0 14 0.0000 4 165 315 4455 10305 PU\001
4 0 0 50 -1 0 14 0.0000 4 165 315 7155 10305 PU\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 4455 11205 .sibling_rank=0\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 7155 11205 .sibling_rank=0\001
4 0 0 50 -1 0 12 0.0000 4 195 675 1755 11430 .arity=0\001
4 0 0 50 -1 0 12 0.0000 4 195 675 4455 11430 .arity=0\001
4 0 0 50 -1 0 12 0.0000 4 195 675 7155 11430 .arity=0\001
4 0 0 50 -1 0 12 0.0000 4 195 855 7155 10530 .depth = 4\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 7155 10755 .logical_index = 2\001
4 0 0 50 -1 0 12 0.0000 4 195 855 4455 10530 .depth = 4\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 4455 10755 .logical_index = 1\001
4 0 0 50 -1 0 12 0.0000 4 195 855 1755 10530 .depth = 4\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 1755 10755 .logical_index = 0\001
4 0 4 50 -1 0 12 0.0000 4 195 1035 3150 8730 next_cousin\001
4 0 4 50 -1 0 12 0.0000 4 195 1050 3375 9090 prev_cousin\001
4 0 4 50 -1 0 12 0.0000 4 195 1035 8550 8730 next_cousin\001
4 0 4 50 -1 0 12 0.0000 4 195 1050 8775 9090 prev_cousin\001
4 0 1 50 -1 0 12 0.0000 4 195 1035 8820 8280 prev_sibling\001
4 0 1 50 -1 0 12 0.0000 4 195 1020 8730 6120 next_sibling\001
4 0 0 50 -1 0 12 0.0000 4 165 555 9945 7650 parent\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 10620 2160 .logical_index = 0\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 8505 3960 .os_index = 1\001
4 0 0 50 -1 0 12 0.0000 4 195 1410 10620 2610 .sibling_rank = 0\001
4 0 0 50 -1 0 12 0.0000 4 195 1140 10620 2385 .os_index = 0\001
4 0 12 50 -1 0 12 0.0000 4 195 915 10620 1935 .depth = -3\001
4 0 0 50 -1 0 14 0.0000 4 165 855 5805 675 Machine\001
4 0 0 50 -1 0 12 0.0000 4 195 855 5805 900 .depth = 0\001
4 0 0 50 -1 0 12 0.0000 4 195 1500 5805 1125 .logical_index = 0\001
4 0 0 50 -1 0 12 0.0000 4 195 1200 5805 1350 .os_index = -1\001
4 0 0 50 -1 0 12 0.0000 4 195 1320 5805 1575 .sibling_rank=0\001
4 0 0 50 -1 0 12 0.0000 4 195 675 5805 1800 .arity=2\001
4 0 12 50 -1 0 12 0.0000 4 195 1500 5805 2025 .memory_arity=1\001
4 0 0 50 -1 0 14 0.0000 4 165 1350 10620 1710 NUMA Node\001
4 0 0 50 -1 0 12 0.0000 4 165 555 9540 2340 parent\001
4 0 12 50 -1 0 12 0.0000 4 195 1665 8775 2025 memory_first_child\001