#
# The data in this file was extracted from a direct numerical simulation
# of fully developed plane turbulent channel flow.
#
# References:
#
# - Statistics:  Oliver et al (2013) 'Estimating Uncertainties in Statistics Computed from DNS', J. of Fluid Mech, in preparation.
# - Numerical Method: Kim, Moin & Moser, 1987, J. Fluid Mech. vol 177, 133-166
# - Codebase: Lee, Malaya & Moser (2013) 'Petascale direct numerical simulation of turbulent channel flow on up to 768K cores',
#            Proceedings of the International Conference for High Performance Computing, Networking, Storage and Analysis (SC13)
#
# Date created: 2013-10-07 15:18
# ---End of Header---
#
# Large Box coarsest mesh
# Grid pts: 064
# Quantity: dudy
#
# index y+ mu mu_sigma
1 0.0 12.3068652069 0.01049996697
2 0.0247013826935 12.3052419132 0.010499245328
3 0.091465709539 12.3008255705 0.0104972306793
4 0.217627032827 12.2923409408 0.0104930903104
5 0.420480559207 12.2780916437 0.0104847507952
6 0.717271338623 12.2547322238 0.010464772629
7 1.12518298605 12.2139048216 0.0104087597695
8 1.6613264434 12.1359382718 0.0102536524477
9 2.3180274063 11.9876024825 0.00988463593175
10 3.09485639226 11.7170090943 0.00912679313352
11 3.99130535507 11.2650398857 0.00780665040288
12 5.00678801705 10.5940734615 0.00597462239189
13 6.14064025247 9.71219712032 0.00459883821965
14 7.39212052187 8.67444177275 0.00370338815257
15 8.76041035709 7.56585971277 0.00371869147008
16 10.2446148965 6.47521416545 0.00385952133502
17 11.8437634701 5.46999046694 0.00384911467145
18 13.5568102348 4.58503832604 0.00368362418282
19 15.3826348578 3.8290263054 0.00340695355379
20 17.3200432496 3.19722599088 0.00304307892092
21 19.3677683451 2.67776710354 0.00287502419129
22 21.5244709318 2.25409959745 0.00247392541701
23 23.7887405262 1.90929150658 0.0020895032879
24 26.1590962958 1.62943382146 0.00188413343908
25 28.6339880277 1.40322256997 0.00177777373005
26 31.2117971425 1.22043027801 0.00173371745363
27 33.890837753 1.07224241788 0.00172308605366
28 36.6693577663 0.952021466218 0.0016850122568
29 39.5455400302 0.854598474209 0.00159960812054
30 42.5175035213 0.775237568959 0.00152226751494
31 45.5833045752 0.709791544386 0.00149220744467
32 48.7409381579 0.655288682122 0.00150111120509
33 51.9883391767 0.609700059875 0.00150848130594
34 55.3233838312 0.571274406867 0.00148256566629
35 58.7438910018 0.53836092329 0.00142788641186
36 62.2476236768 0.509630810958 0.0013655315309
37 65.8322904146 0.484143584928 0.00130743307026
38 69.495546843 0.461218080885 0.00123078197464
39 73.234997192 0.440360018736 0.0011208582906
40 77.0481958608 0.42124823931 0.0010144492525
41 80.9326490173 0.40363294006 0.000954809309595
42 84.8858162287 0.387208838815 0.000951173678954
43 88.9051121234 0.371653869812 0.000978931931767
44 92.9879080816 0.356778383382 0.000881634009532
45 97.1315339546 0.342529992084 0.000859946734575
46 101.333279811 0.328825232663 0.000906688137664
47 105.590397708 0.3154391865 0.000872657052546
48 109.90010349 0.302070455438 0.00081042665117
49 114.259578611 0.288482625098 0.000827228249753
50 118.665971972 0.274588473633 0.000844032149457
51 123.116401792 0.260396163868 0.000938643915061
52 127.607957489 0.245856593419 0.000936604250582
53 132.137701587 0.230794198332 0.000955237722487
54 136.702671632 0.215010475633 0.000974880004718
55 141.299882133 0.198401910764 0.000971299206228
56 145.926326514 0.180942371671 0.000953070175911
57 150.57897908 0.162602544593 0.000945663750227
58 155.254796997 0.143331912111 0.000958993193887
59 159.950722278 0.12310253591 0.000965323565788
60 164.663683789 0.101951496178 0.000936498072864
61 169.390599253 0.0799865374146 0.000891032995305
62 174.128377265 0.0573545485476 0.000857534904055
63 178.87391932 0.0342113709888 0.000837126419788
64 183.624121832 0.0107362283137 0.000807221705235