nohup: ignoring input
0
Tue Aug 30 13:15:59 JST 2011
machine specs:
[    0.000000] Initializing cgroup subsys cpuset
[    0.000000] Initializing cgroup subsys cpu
[    0.000000] Linux version 2.6.39-2-amd64 (Debian 2.6.39-3) (ben@decadent.org.uk) (gcc version 4.4.6 (Debian 4.4.6-6) ) #1 SMP Tue Jul 5 02:51:22 UTC 2011
[    0.000000] Command line: BOOT_IMAGE=/boot/vmlinuz-2.6.39-2-amd64 root=UUID=7bd382f9-e883-4d6d-abc1-19dbab839dc7 ro quiet
[    0.000000] BIOS-provided physical RAM map:
[    0.000000]  BIOS-e820: 0000000000000000 - 000000000009dc00 (usable)
[    0.000000]  BIOS-e820: 000000000009dc00 - 00000000000a0000 (reserved)
[    0.000000]  BIOS-e820: 00000000000e4000 - 0000000000100000 (reserved)
[    0.000000]  BIOS-e820: 0000000000100000 - 00000000bf780000 (usable)
[    0.000000]  BIOS-e820: 00000000bf78e000 - 00000000bf790000 (reserved)
procs -----------memory---------- ---swap-- -----io---- -system-- ----cpu----
 r  b   swpd   free   buff  cache   si   so    bi    bo   in   cs us sy id wa
 3  0      0 90745536 219112 5078992    0    0     0     0    1    1  2  0 98  0



hgd_test.rr:

DataType=comets, H=1/100000

Data[S,Xs,Fs,DFs,Region]=[
[0.257,0.044,0.189,0.158,-0.052,-0.146,0.079,0.765,0.004],
[2.953,0.2,0.871,-0.423,-0.317,2.39,0.378,5.566,0.251],
30.67416,
[7.884903,1.351263,5.7975603,4.847065,-1.595791,-4.4795863,2.424318,23.462736,0.1208437],
[[2.952,2.954],[0.199,0.201],[0.87,0.872],[-0.424,-0.422],[-0.318,-0.316],[2.389,2.391],[0.377,0.379],[5.565,5.567],[0.25,0.252]]
]

C=0.008051426486164965
Fs=30.67416
Region=[[2.952,2.954],[0.199,0.201],[0.87,0.872],[-0.424,-0.422],[-0.318,-0.316],[2.389,2.391],[0.377,0.379],[5.565,5.567],[0.25,0.252]]
H=1/100000
Step <0>
Xp=[2.953,0.2,0.871,-0.423,-0.317,2.39,0.378,5.566,0.251]
Yp=[ 0.2469707442648619 0.007378264463000687 1.051464677984137 0.0002442140058834095 ]
Gp=-(grad f)(Xp)=[ -1.322827777284867e-05 -1.288589415499833e-05 -1.157087969710403e-06 -4.410186496816952e-06 5.913482858625123e-06 9.340748389902176e-06 -8.529359162384037e-06 2.412529432310739e-05 1.491881019327461e-05 ]
|Gp|=3.689704256439786e-05
Gp=Normalize(-(grad f)(Xp))=[ -0.3585186468471243 -0.3492392142949688 -0.03135991096551687 -0.1195268289896048 0.1602698332340346 0.2531571025943177 -0.2311664721501028 0.6538544188467291 0.40433620573346 ]
X(t)=[-0.3585186468471243*t+2.953,-0.3492392142949688*t+0.2,-0.03135991096551687*t+0.871,-0.1195268289896048*t-0.423,0.1602698332340346*t-0.317,0.2531571025943177*t+2.39,-0.2311664721501028*t+0.378,0.6538544188467291*t+5.566,0.40433620573346*t+0.251]
Singular locus = [0.40433620573346*t+0.251,0.6538544188467291*t+5.566,-0.2311664721501028*t+0.378,0.2531571025943177*t+2.39,-0.1195268289896048*t-0.423,-0.3492392142949688*t+0.2,-0.3585186468471243*t+2.953,-0.1007249939303454*t^2-3.059731343159419*t-13.382307,0.03997308229317548*t^2-0.0004913769451723032*t+0.279418,-0.09920317958497901*t^2+0.4631044067417917*t-0.851501,-0.01311991364255919*t^2-0.05854654081165731*t-1.312519,0.06507196260971503*t^2+1.155461985498908*t+6.470741,0.2505036489384601*t^2-2.257106813997103*t+8.760208999999998,-0.1030782087041282*t^3-0.2805416014373198*t^2+5.018894298738958*t-2.875502713,0.06165387809810821*t^3-0.4777560946163554*t^2-5.400940425203868*t+4.425464449,0.01403554217707447*t^3+0.3683227641092089*t^2+0.8196883164474282*t-1.326273903,0.01193895939925514*t^4+0.7100302206448248*t^3+13.44354756713957*t^2+86.18373196223457*t+185.098820074362,-0.01313201932253884*t^4-0.01278534298647372*t^3+0.2322788896262957*t^2+1.479604109649758*t+5.281664779189002,-0.002499331970591418*t^4+0.02827028451091457*t^3-0.1793796154155909*t^2-5.413174442590289*t+11.15286876356899,0.0639195063521492*t^5+1.101258602282535*t^4+1.273432617886859*t^3-58.53322149247278*t^2-254.0018204266056*t-51.53211691500803,-0.006108320874419738*t^6+0.01076711260710188*t^5+2.337341063146078*t^4+9.449845045582643*t^3-38.71586367103527*t^2+42.00478897604245*t-14.69696972933449,0.02515572260589444*t^6+0.1686678614116077*t^5+0.2978452524077984*t^4+18.32763648144106*t^3+155.5716670789122*t^2+170.496055433277*t+578.7982460249864,0.001725505153569003*t^8-0.03177809818797098*t^7-0.1323264058684654*t^6+1.505293772722926*t^5-6.974887282210505*t^4+34.28051233169751*t^3-360.4549232518365*t^2+390.9477462252316*t-123.9405158845657,-0.0001287486930940791*t^9-0.003485414787617302*t^8-0.04029196985135235*t^7-0.1104540772730736*t^6+1.345181103910885*t^5+7.048052242015497*t^4-18.89083167234106*t^3-148.7252073167242*t^2-39.37890261909751*t+54.38958377610863,-0.001021054117055403*t^10+0.4018664663383529*t^9+18.66028580558014*t^8+377.1781150079612*t^7+4419.662057531635*t^6+27438.92960744309*t^5+33811.13738847851*t^4-513854.5139173741*t^3-2200533.114507833*t^2-617995.3230633871*t+6235759.934453785,-0.02530932256670176*t^12-0.9873548676098166*t^11-14.0196709935688*t^10-58.67774489941694*t^9+738.038646036586*t^8+17988.26347633722*t^7+208392.3450654561*t^6+1355937.609353242*t^5+4670800.414593769*t^4+6350036.800136153*t^3-8101198.945961067*t^2-38557878.71202026*t-58306588.32576911,0.007681820277001697*t^12+0.223476518784632*t^11+0.3618154052105956*t^10-9.738285423429545*t^9+810.8122285677093*t^8+16198.0612698985*t^7+122149.6862485228*t^6+479175.0819196573*t^5+1015696.868578049*t^4+324911.8599036926*t^3-1739297.32642331*t^2-1980680.534146939*t+4628669.448210657]
Nearest singular point at t=0.47759128768126229550800367375384139196
oh_hash.push_restrict
Te=0.001529392432285061

..........................................................................................................................................................
t = [0 -> 0.001529392432285061] (154)
y0 = [0.2469707442648619,0.246970743898995,0.2469707435393352,0.2469707431858824,0.2469707428386367,0.2469707424975981,0.2469707421627665,0.246970741834142,0.2469707415117246,0.2469707411955142,0.2469707408855109,0.2469707405817147,0.2469707402841255,0.2469707399927434,0.2469707397075683,0.2469707394286003,0.2469707391558393,0.2469707388892854,0.2469707386289386,0.2469707383747988,0.2469707381268661,0.2469707378851405,0.2469707376496219,0.2469707374203103,0.2469707371972058,0.2469707369803084,0.246970736769618,0.2469707365651347,0.2469707363668585,0.2469707361747892,0.2469707359889271,0.246970735809272,0.2469707356358239,0.2469707354685829,0.246970735307549,0.2469707351527221,0.2469707350041022,0.2469707348616894,0.2469707347254837,0.246970734595485,0.2469707344716933,0.2469707343541087,0.2469707342427312,0.2469707341375607,0.2469707340385972,0.2469707339458408,0.2469707338592915,0.2469707337789492,0.2469707337048139,0.2469707336368857,0.2469707335751645,0.2469707335196503,0.2469707334703432,0.2469707334272432,0.2469707333903502,0.2469707333596642,0.2469707333351853,0.2469707333169134,0.2469707333048485,0.2469707332989907,0.24697073329934,0.2469707333058963,0.2469707333186596,0.2469707333376299,0.2469707333628073,0.2469707333941917,0.2469707334317832,0.2469707334755817,0.2469707335255873,0.2469707335817999,0.2469707336442195,0.2469707337128461,0.2469707337876798,0.2469707338687206,0.2469707339559683,0.2469707340494231,0.2469707341490849,0.2469707342552691,0.2469707343677233,0.2469707344863846,0.246970734611253,0.2469707347423283,0.2469707348796107,0.2469707350231002,0.2469707351727967,0.2469707353287002,0.2469707354908107,0.2469707356591283,0.2469707358336529,0.2469707360143845,0.2469707362013232,0.2469707363944689,0.2469707365938216,0.2469707367993814,0.2469707370111481,0.2469707372291219,0.2469707374533028,0.2469707376836907,0.2469707379202856,0.2469707381630875,0.2469707384120964,0.2469707386673124,0.2469707389287354,0.2469707391963654,0.2469707394702025,0.2469707397502466,0.2469707400364977,0.2469707403289558,0.2469707406276209,0.2469707409324931,0.2469707412435723,0.2469707415608585,0.2469707418843518,0.246970742214052,0.2469707425499593,0.2469707428920736,0.2469707432403949,0.2469707435949233,0.2469707439556587,0.246970744322601,0.2469707446957504,0.2469707450751068,0.2469707454606703,0.2469707458524407,0.2469707462504182,0.2469707466546027,0.2469707470649942,0.2469707474815927,0.2469707479043982,0.2469707483334107,0.2469707487686303,0.2469707492100569,0.2469707496576904,0.246970750111531,0.2469707505715786,0.2469707510378333,0.2469707515102949,0.2469707519889635,0.2469707524738392,0.2469707529649219,0.2469707534622115,0.2469707539657082,0.2469707544754119,0.2469707549913226,0.2469707555134403,0.246970756041765,0.2469707565762968,0.2469707571170355,0.2469707576639812,0.246970758217134,0.2469707587764937,0.2469707593420605,0.2469707599138343,0.246970760491815]
min(y0) = y0[59]
DtY=PY has min Y = [ 0.2469707332989907 0.007372290273923875 1.051573684439691 0.0002485451832850499 ] at t=59/100000,X=[2.95278847399836,0.199793948863566,0.8709814976525303,-0.4230705208291038,-0.3169054407983919,2.390149362690531,0.3778636117814315,5.566385774107119,0.2512385583613828]

Step <1>
Xp=[2.95278847399836,0.199793948863566,0.8709814976525303,-0.4230705208291038,-0.3169054407983919,2.390149362690531,0.3778636117814315,5.566385774107119,0.2512385583613828]
Yp=[ 0.2469707332989907 0.007372290273923875 1.051573684439691 0.0002485451832850499 ]
Gp=-(grad f)(Xp)=[ 1.806336206895687e-05 -4.585058751984056e-06 7.145420552501745e-06 2.481070488549383e-06 -7.083897478057921e-06 -1.619432337817903e-05 2.34835739444661e-07 1.76260779192472e-05 -1.396677808417112e-06 ]
|Gp|=3.208804686065717e-05
Gp=Normalize(-(grad f)(Xp))=[ 0.5629311795572131 -0.1428899294461499 0.2226816915199246 0.07732070759318789 -0.2207643708830224 -0.5046839855508539 0.007318480319616794 0.5493035458277877 -0.04352642011781541 ]
X(t)=[0.5629311795572131*t+2.95278847399836,-0.1428899294461499*t+0.199793948863566,0.2226816915199246*t+0.8709814976525303,0.07732070759318789*t-0.4230705208291038,-0.2207643708830224*t-0.3169054407983919,-0.5046839855508539*t+2.390149362690531,0.007318480319616794*t+0.3778636117814315,0.5493035458277877*t+5.566385774107119,-0.04352642011781541*t+0.2512385583613828]
Singular locus = [-0.04352642011781541*t+0.2512385583613828,0.5493035458277877*t+5.566385774107119,0.007318480319616794*t+0.3778636117814315,-0.5046839855508539*t+2.390149362690531,0.07732070759318789*t-0.4230705208291038,-0.1428899294461499*t+0.199793948863566,0.5629311795572131*t+2.95278847399836,0.2868337855396837*t^2+1.454677474681624*t-13.38411227655483,0.05471539927408793*t^2+0.0744986364698781*t+0.2794177240022323,-0.1132267972526688*t^2-0.9061671697806096*t-0.8512278029326492,0.07507124250933037*t^2-0.008672682493965814*t-1.312553547026121,0.3042930610096694*t^2-2.024636946489335*t+6.471422745222995,0.337309044854801*t^2+3.267336310787915*t+8.758877394180061,-0.04908048910671104*t^3-1.198597667700506*t^2-5.864503261961247*t-2.872541663041446,-0.05731858107020267*t^3-0.7205089748056133*t^2-0.6208035673812728*t+4.422277727854895,-0.006226714148222512*t^3+0.01554755403993198*t^2+0.335117580912195*t-1.325790158677259,0.08421749737964419*t^4+0.8596589983958787*t^3-5.634650083639152*t^2-40.63366928092527*t+185.1496731560644,-0.006844943015935523*t^4+0.01568274021598144*t^3+0.01153546766941194*t^2-0.6345464071852818*t+5.282537826467347,-0.0163604489746635*t^4-0.5446466555810388*t^3+0.05820526595525993*t^2+11.06534745062497*t+11.14967492821163,-0.01496622669192547*t^5-0.296506493865519*t^4-1.13446517900751*t^3+5.703714169937602*t^2+19.08837729944739*t-51.6819983642125,0.0005429619445852856*t^6+0.05462574565259257*t^5+1.047544653908465*t^4+3.968596981273676*t^3-15.33781956973143*t^2-26.70259031654339*t-14.67220037888969,0.008180481461246513*t^6+0.2079493499574833*t^5+4.473900152757182*t^4+49.12330958107726*t^3+261.9674693342015*t^2+640.7399049678914*t+578.8988928559532,-0.0008086002155242515*t^8+0.01661074714572633*t^7-0.2881875801735969*t^6-6.638369654172034*t^5-4.443180357104534*t^4+219.6332273437845*t^3+667.8557812757479*t^2-94.64939195071408*t-123.709982181612,-9.207879431162695e-05*t^9-0.004128110088019926*t^8-0.03002738447845351*t^7-0.2085672254495537*t^6-0.3081473109682571*t^5+6.630614930343172*t^4+25.55606588274183*t^3-55.55014151752804*t^2+159.1138268471976*t+54.36629844843979,-0.01231682880522232*t^10+0.01305963214993536*t^9+6.714367011033526*t^8+74.17026910196587*t^7-140.5301618790542*t^6-10018.53604357198*t^5-112603.8025135561*t^4-556178.9518556879*t^3-457115.6618551199*t^2+4457961.393479699*t+6235394.551102073,7.743520241820559e-05*t^12-0.00316130836225423*t^11-1.562103757291827*t^10-103.5489116453627*t^9-2489.536442036188*t^8-58855.4113173361*t^7-837696.3910878969*t^6-6426403.322179205*t^5-28129510.14926042*t^4-75073086.41972868*t^3-127532655.1033029*t^2-132924103.490338*t-58329340.29293171,1.224926629734148e-05*t^12+0.001970520289237179*t^11+0.1083560514083665*t^10+3.835499967397758*t^9+146.5397414890334*t^8+2252.408477590704*t^7+40601.44758999088*t^6+595231.6287977427*t^5+4425958.663339529*t^4+15794027.28940693*t^3+26400247.94150064*t^2+18017693.95699647*t+4627500.241312984]
Nearest singular point at t=0.46737600035452351797418164128248234857
oh_hash.push_restrict
Te=0.001118190293047054

.................................................................................................................
t = [0 -> 0.001118190293047054] (113)
y0 = [0.2469707332989907,0.2469707329842039,0.2469707326816045,0.2469707323911924,0.2469707321129677,0.2469707318469301,0.2469707315930798,0.2469707313514167,0.2469707311219407,0.2469707309046518,0.24697073069955,0.2469707305066352,0.2469707303259075,0.2469707301573667,0.2469707300010128,0.2469707298568458,0.2469707297248657,0.2469707296050724,0.2469707294974659,0.2469707294020461,0.2469707293188131,0.2469707292477667,0.2469707291889069,0.2469707291422338,0.2469707291077472,0.2469707290854472,0.2469707290753336,0.2469707290774066,0.2469707290916659,0.2469707291181116,0.2469707291567437,0.2469707292075621,0.2469707292705667,0.2469707293457576,0.2469707294331348,0.246970729532698,0.2469707296444474,0.2469707297683829,0.2469707299045045,0.2469707300528121,0.2469707302133057,0.2469707303859852,0.2469707305708506,0.2469707307679019,0.2469707309771391,0.246970731198562,0.2469707314321707,0.2469707316779652,0.2469707319359454,0.2469707322061112,0.2469707324884626,0.2469707327829997,0.2469707330897222,0.2469707334086303,0.2469707337397239,0.2469707340830029,0.2469707344385804,0.2469707348069087,0.2469707351874224,0.2469707355801212,0.2469707359850053,0.2469707364020746,0.246970736831329,0.2469707372727686,0.2469707377263932,0.2469707381922029,0.2469707386701975,0.2469707391603772,0.2469707396627417,0.2469707401772912,0.2469707407040255,0.2469707412429446,0.2469707417940485,0.2469707423573372,0.2469707429328106,0.2469707435204687,0.2469707441203114,0.2469707447323387,0.2469707453565506,0.246970745992947,0.2469707466415279,0.2469707473022933,0.2469707479752431,0.2469707486603773,0.2469707493576958,0.2469707500671987,0.2469707507888858,0.2469707515227572,0.2469707522688127,0.2469707530270525,0.2469707537974764,0.2469707545800844,0.2469707553748764,0.2469707561818525,0.2469707570010126,0.2469707578323566,0.2469707586758846,0.2469707595315964,0.2469707603994921,0.2469707612795715,0.2469707621718348,0.2469707630762818,0.2469707639929125,0.2469707649217268,0.2469707658627248,0.2469707668159064,0.2469707677812716,0.2469707687588202,0.2469707697485523,0.2469707707504679,0.2469707717645669,0.2469707727908493,0.246970773829315]
min(y0) = y0[26]
DtY=PY has min Y = [ 0.2469707290753336 0.00737172820161309 1.051618903547012 0.0002476973806692127 ] at t=13/50000,X=[2.952934836105045,0.19975679748191,0.8710393948923255,-0.4230504174451296,-0.3169628395348215,2.390018144854287,0.3778655145863146,5.566528593029035,0.2512272414921521]

Step <2>
Xp=[2.952934836105045,0.19975679748191,0.8710393948923255,-0.4230504174451296,-0.3169628395348215,2.390018144854287,0.3778655145863146,5.566528593029035,0.2512272414921521]
Yp=[ 0.2469707290753336 0.00737172820161309 1.051618903547012 0.0002476973806692127 ]
Gp=-(grad f)(Xp)=[ -5.670893366404445e-06 -4.879895339079086e-07 5.369662942856721e-07 -4.57348984606986e-06 -4.635506127588691e-06 1.005454783286827e-05 1.820243222015044e-06 1.434639318625974e-05 1.933386313957572e-06 ]
|Gp|=1.972446253247563e-05

Finished
min Y = [ 0.2469707290753336 0.00737172820161309 1.051618903547012 0.0002476973806692127 ]
X = [2.952934836105045,0.19975679748191,0.8710393948923255,-0.4230504174451296,-0.3169628395348215,2.390018144854287,0.3778655145863146,5.566528593029035,0.2512272414921521]

Xs=[2.953,0.2,0.871,-0.423,-0.317,2.39,0.378,5.566,0.251]
Xp=[2.952934836105045,0.19975679748191,0.8710393948923255,-0.4230504174451296,-0.3169628395348215,2.390018144854287,0.3778655145863146,5.566528593029035,0.2512272414921521]
Ys0=0.2469707442648619
Yp0=0.2469707290753336
hgd_test: time = 1283.805107116699
Calling the registered quit callbacks...done.