NRG Ljubljana  (c) Rok Zitko, rok.zitko@ijs.si, 2005-2018
Mathematica version: 11.0.0 for Linux x86 (64-bit) (July 28, 2016)
sneg version: 1.250
Loading module initialparse.m
Options: {}
def1ch, NRDOTS=1
COEFCHANNELS:1
H0=coefzeta[1, 0]*(-1 + nc[f[0, 0, 0], f[1, 0, 0]] + nc[f[0, 0, 1], f[1, 0, 1]])
adddots, nrdots=1
Loading module models.m
"models started"
Loading module custommodels.m
models $Id: custommodels.m,v 1.1 2015/11/09 12:23:47 rokzitko Exp rokzitko $
custommodels.m done
params={gammaPol -> Sqrt[gammaA*theta0]/Sqrt[Pi], gammaPolCh[ch_] :> Sqrt[1/Pi*theta0Ch[ch]*gammaA], hybV[i_, j_] :> Sqrt[1/Pi]*V[i, j], coefzeta[ch_, j__] :> N[bandrescale*zeta[ch][j]], coefxi[ch_, j__] :> N[bandrescale*xi[ch][j]], 
   coefrung[ch_, j__] :> N[bandrescale*zetaR[ch][j]], coefdelta[ch_, j__] :> N[bandrescale*scdelta[ch][j]], coefkappa[ch_, j__] :> N[bandrescale*sckappa[ch][j]], U -> 0.01, delta -> 0, t -> 0., 
   gammaPol2 -> Sqrt[extraGamma2*gammaA*thetaCh[1]]/Sqrt[Pi], gammaPol2to2 -> Sqrt[extraGamma2to2*gammaA*thetaCh[2]]/Sqrt[Pi], gammaPolch1 -> Sqrt[extraGamma1*gammaA*thetaCh[1]]/Sqrt[Pi], 
   gammaPolch2 -> Sqrt[extraGamma2*gammaA*thetaCh[2]]/Sqrt[Pi], gammaPolch3 -> Sqrt[extraGamma3*gammaA*thetaCh[3]]/Sqrt[Pi], Jspin -> extraJspin*gammaA, Jcharge -> extraJcharge*gammaA, Jcharge1 -> extraJcharge1*gammaA, 
   Jcharge2 -> extraJcharge2*gammaA, Jkondo -> extraJkondo*gammaA, Jkondo1 -> extraJkondo1*gammaA, Jkondo2 -> extraJkondo2*gammaA, Jkondo3 -> extraJkondo3*gammaA, Jkondo1P -> extraJkondo1P*gammaA, Jkondo2P -> extraJkondo2P*gammaA, 
   Jkondo1Z -> extraJkondo1Z*gammaA, Jkondo2Z -> extraJkondo2Z*gammaA, JkondoP -> extraJkondoP*gammaA, JkondoZ -> extraJkondoZ*gammaA, Jkondo1ch2 -> extraJkondo1ch2*gammaA, Jkondo2ch2 -> extraJkondo2ch2*gammaA, gep -> extrag, dd -> extrad, 
   hybV11 -> Sqrt[extraGamma11*gammaA*thetaCh[1]]/Sqrt[Pi], hybV12 -> Sqrt[extraGamma12*gammaA*thetaCh[2]]/Sqrt[Pi], hybV21 -> Sqrt[extraGamma21*gammaA*thetaCh[1]]/Sqrt[Pi], hybV22 -> Sqrt[extraGamma22*gammaA*thetaCh[2]]/Sqrt[Pi]}
NRDOTS:1
CHANNELS:1
basis:{d[], f[0]}
lrchain:{}
lrextrarule:{}
NROPS:2
Hamiltonian generated. U/2 - coefzeta[1, 0] + delta*nc[d[0, 0], d[1, 0]] - (U*nc[d[0, 0], d[1, 0]])/2 + gammaPolCh[1]*nc[d[0, 0], f[1, 0, 0]] + delta*nc[d[0, 1], d[1, 1]] - (U*nc[d[0, 1], d[1, 1]])/2 + 
   gammaPolCh[1]*nc[d[0, 1], f[1, 0, 1]] + gammaPolCh[1]*nc[f[0, 0, 0], d[1, 0]] + coefzeta[1, 0]*nc[f[0, 0, 0], f[1, 0, 0]] + gammaPolCh[1]*nc[f[0, 0, 1], d[1, 1]] + coefzeta[1, 0]*nc[f[0, 0, 1], f[1, 0, 1]] - 
   U*nc[d[0, 0], d[0, 1], d[1, 0], d[1, 1]]
H-conj[H]=0
SCALE[0]=1.4426950408889634
faktor=0.9802581434685472
Generating basis
Basis states generated.
BASIS NR=16
Basis: basis.SIAM..QS
PREC=1000
Tmin=1.*^-10
Tmin=1.*^-10 ==> Nmax=67
DISCNMAX=67
mMAX=134
Diagonalisation.
Discretization checksum [-1] (channel 1): 3.246875104347335874645939544192267024`10.*^-41
BAND="flat" thetaCh={"2."}
Discretization (channel 1)
"xitable" (channel 1)
0.5953226115
0.5603099649
0.5064499029
0.3760615863
0.2584236143
0.1802987598
0.1273062622
0.09006951794
0.06372036782
0.04507012295
0.03187428225
0.02254029972
0.01593903604
0.01127082725
0.007969758817
0.005635498988
0.003984909629
0.002817760186
0.001992458596
0.00140888143
0.0009962297707
0.0007044408822
0.0004981149445
0.000352220462
0.0002490574796
0.0001761102336
0.0001245287407
0.00008805511713
0.00006226437048
0.00004402755861
0.00003113218526
0.00002201377931
0.00001556609263
0.00001100688966
7.783046315e-6
5.503444828e-6
3.891523157e-6
2.751722414e-6
1.945761579e-6
1.375861207e-6
9.728807894e-7
6.879306035e-7
4.864403947e-7
3.439653017e-7
2.432201973e-7
1.719826509e-7
1.216100987e-7
8.599132543e-8
6.080504934e-8
4.299566272e-8
3.040252467e-8
2.149783136e-8
1.520126233e-8
1.074891568e-8
7.600631167e-9
5.374457839e-9
3.800315583e-9
2.68722892e-9
1.900157792e-9
1.34361446e-9
9.500788959e-10
6.718072299e-10
4.750394479e-10
3.35903615e-10
2.37519724e-10
1.679518075e-10
1.18759862e-10
8.397590374e-11
"zetatable" (channel 1)
0.e-999
0.e-998
0.e-997
0.e-997
0.e-996
0.e-995
0.e-994
0.e-993
0.e-992
0.e-991
0.e-991
0.e-990
0.e-989
0.e-988
0.e-987
0.e-986
0.e-986
0.e-985
0.e-984
0.e-983
0.e-982
0.e-981
0.e-980
0.e-980
0.e-979
0.e-978
0.e-977
0.e-976
0.e-975
0.e-975
0.e-974
0.e-973
0.e-972
0.e-971
0.e-970
0.e-969
0.e-969
0.e-968
0.e-967
0.e-966
0.e-965
0.e-964
0.e-964
0.e-963
0.e-962
0.e-961
0.e-960
0.e-959
0.e-959
0.e-958
0.e-957
0.e-956
0.e-955
0.e-954
0.e-953
0.e-953
0.e-952
0.e-951
0.e-950
0.e-949
0.e-948
0.e-948
0.e-947
0.e-946
0.e-945
0.e-944
0.e-943
0.e-942
Precision last xi:932.7100523449728
Precision last zeta: 0.
Discretization done.
--EOF--
           {{# Input file for NRG Ljubljana, Rok Zitko, rok.zitko@ijs.si, 2005-2015}, {# symtype , QS}, {# Using sneg version , 1.250}, {#!8}, {# Number of channels, impurities, chain sites, subspaces: }, {1, 1, 67, 6}}

maketable[]

exnames={d, g, Gamma1, Gamma11, Gamma12, Gamma2, Gamma21, Gamma22, Gamma2to2, Gamma3, Jcharge, Jcharge1, Jcharge2, Jkondo, Jkondo1, Jkondo1ch2, Jkondo1P, Jkondo1Z, Jkondo2, Jkondo2ch2, Jkondo2P, Jkondo2Z, Jkondo3, JkondoP, JkondoZ, Jspin}
thetaCh={"2."}
theta0Ch={"0.002"}
gammaPolCh={"0.025231325220201602"}
checkdefinitions[] -> 0.08592530088080641
calcgsenergy[]
diagvc[{-2, 1}]
Generating matrix: ham.SIAM..QS_-2.1
hamil={{(U - 2*coefzeta[1, 0])/2}}
dim={1, 1}
det[vec]=1. 1-abs=0.
orthogonality check=0.
diagvc[{-1, 2}]
Generating matrix: ham.SIAM..QS_-1.2
hamil={{U/2, gammaPolCh[1]}, {gammaPolCh[1], delta - coefzeta[1, 0]}}
dim={2, 2}
det[vec]=-1. 1-abs=0.
orthogonality check=4.440892098500626*^-16
diagvc[{0, 1}]
Generating matrix: ham.SIAM..QS_0.1
hamil={{U/2 + coefzeta[1, 0], Sqrt[2]*gammaPolCh[1], 0}, {Sqrt[2]*gammaPolCh[1], delta, Sqrt[2]*gammaPolCh[1]}, {0, Sqrt[2]*gammaPolCh[1], (4*delta + U - 2*coefzeta[1, 0])/2}}
dim={3, 3}
det[vec]=1. 1-abs=0.
orthogonality check=1.3322676295501878*^-15
diagvc[{0, 3}]
Generating matrix: ham.SIAM..QS_0.3
hamil={{delta}}
dim={1, 1}
det[vec]=1. 1-abs=0.
orthogonality check=0.
diagvc[{1, 2}]
Generating matrix: ham.SIAM..QS_1.2
hamil={{delta + coefzeta[1, 0], -gammaPolCh[1]}, {-gammaPolCh[1], (4*delta + U)/2}}
dim={2, 2}
det[vec]=1. 1-abs=0.
orthogonality check=4.440892098500626*^-16
diagvc[{2, 1}]
Generating matrix: ham.SIAM..QS_2.1
hamil={{2*delta + U/2 + coefzeta[1, 0]}}
dim={1, 1}
det[vec]=1. 1-abs=0.
orthogonality check=0.
Lowest energies (absolute):{-0.048024539478062775, -0.022854876697936857, -0.022854876697936857, 0., 0.004999999999999999, 0.005, 0.005, 0.027854876697936858, 0.027854876697936858, 0.0530245394780628}
Lowest energies (GS shifted):{0., 0.025169662780125918, 0.025169662780125918, 0.048024539478062775, 0.05302453947806277, 0.05302453947806277, 0.05302453947806277, 0.07587941617599964, 0.07587941617599964, 0.10104907895612558}
Scale factor SCALE(Ninit):1.4426950408889634
Lowest energies (shifted and scaled):{0., 0.017446280791688872, 0.017446280791688872, 0.033288074136909, 0.03675381003970872, 0.03675381003970872, 0.03675381003970872, 0.05259560338492885, 0.05259560338492885, 0.07004188417661775}
makeireducf GENERAL
ireducTable: f[0]{}
Loading module operators.m
"operators.m started"
d: A_d d
ireducTable: d{}
operators.m done
Loading module customoperators.m
"customoperators $Id: customoperators.m,v 1.1 2015/11/09 12:23:54 rokzitko Exp rokzitko $"
Customoperators done.
Loading module modeloperators.m
Can't load modeloperators.m. Continuing.
-- maketable[] done --
Timing report
{basis, 0.012719`4.555997960818262}
{ham, 0.026411`4.09517858832758}
{maketable, 0.318701`5.95492841967382}
{xi, 1.006969`6.4545610943016545}
{_, 0}
data
gammaPol=0.0252313252202016
"Success!"