#
# erf-func.txt, 18 May 10

!msgpostfix Complementary error function, Numerical recipes in C:1988\n

!need all
-1.26551223
 1.00002368
 0.37409196
 0.09678418
-0.18628806
 0.27886807
-1.13520398
 1.48851587
-0.82215223
 0.17087277


!msgpostfix Complementary error function (Cephes double precision)\n

!need all
2.46196981473530512524E-10
5.64189564831068821977E-1
7.46321056442269912687E0
4.86371970985681366614E1
1.96520832956077098242E2
5.26445194995477358631E2
9.34528527171957607540E2
1.02755188689515710272E3
5.57535335369399327526E2

1.32281951154744992508E1
8.67072140885989742329E1
3.54937778887819891062E2
9.75708501743205489753E2
1.82390916687909736289E3
2.24633760818710981792E3
1.65666309194161350182E3
5.57535340817727675546E2

5.64189583547755073984E-1
1.27536670759978104416E0
5.01905042251180477414E0
6.16021097993053585195E0
7.40974269950448939160E0
2.97886665372100240670E0

2.26052863220117276590E0
9.39603524938001434673E0
1.20489539808096656605E1
1.70814450747565897222E1
9.60896809063285878198E0
3.36907645100081516050E0

9.60497373987051638749E0
9.00260197203842689217E1
2.23200534594684319226E3
7.00332514112805075473E3
5.55923013010394962768E4

3.35617141647503099647E1
5.21357949780152679795E2
4.59432382970980127987E3
2.26290000613890934246E4
4.92673942608635921086E4


# 1977 Fortran, 1993 James G. MacKinnon modified
# Rational Chebyshev approximation

!msgpostfix Complementary error function (x > 4)\n

!need all
-6.58749161529837803157d-04
-1.60837851487422766278d-02
-1.25781726111229246204d-01
-3.60344899949804439429d-01
-3.05326634961232344035d-01
-1.63153871373020978498d-02

2.33520497626869185443d-03
6.05183413124413191178d-02
5.27905102951428412248d-01
1.87295284992346047209d00
2.56852019228982242072d00

!msgpostfix Complementary error function (0.477 <= x <= 4)\n

!need all
1.23033935479799725272d03
2.05107837782607146532d03
1.71204761263407058314d03
8.81952221241769090411d02
2.98635138197400131132d02
6.61191906371416294775d01
8.88314979438837594118d00
5.64188496988670089180d-01
2.15311535474403846343d-08

1.23033935480374942043d03
3.43936767414372163696d03
4.36261909014324715820d03
3.29079923573345962678d03
1.62138957456669018874d03
5.37181101862009857509d02
1.17693950891312499305d02
1.57449261107098347253d01

!msgpostfix Complementary error function (x < 0.477)\n

!need all
3.209377589138469472562d03
3.774852376853020208137d02
1.138641541510501556495d02
3.161123743870565596947d00
1.857777061846031526730d-01

2.844236833439170622273d03
1.282616526077372275645d03
2.440246379344441733056d02
2.360129095234412093499d01


# Rational Chebyshev Approximations for the Inverse of the Error Function
# J. M. Blair, C. A. Edwards, and J. H. Johnson
# Mathematics of Computation, 30 (1976) 827-830 + microfiche appendix.

!msgpostfix Inverse error function (abs(x) < 0.75, error < 4.47e-8)\n

!need all
-13.0959967422
 26.785225760
-9.289057635

-12.0749426297
 30.960614529
-17.149977991
#  1.00000000

!msgpostfix Inverse error function (0.75 <= abs(x) <= 0.9375, error < 4.17e-8)\n

!need all
-0.12402565221
 1.0688059574
-1.9594556078
 0.4230581357

-0.08827697997
 0.8900743359
-2.1757031196
#  1.0000000000

!msgpostfix Inverse error function (0.9375 <= abs(x) < 1.0, error < 2.45e-8)\n

!need all
 0.1550470003116
 1.382719649631
 0.690969348887
-1.128081391617
 0.680544246825
-0.16444156791

 0.155024849822
 1.385228141995
# 1.000000000000


# Rational Chebyshev Approximations for the Inverse of the Error Function
# J. M. Blair, C. A. Edwards, and J. H. Johnson
# Mathematics of Computation, 30 (1976) 827-830 + microfiche appendix.
# Table 50 and 70.

!msgpostfix Inverse complementary error function (1e-100 <= x < 0.0625)\n

!need all
 0.1550470003116
 1.382719649631
 0.690969348887
-1.128081391617
 0.680544246825
-0.16444156791

 0.155024849822
 1.385228141995
# 1.000000000000

!msgpostfix Inverse complementary error function (1e-1000 <= x < 1e-100, error < 2.45e-8)\n

!need all
 0.00980456202915
 0.363667889171
 0.97302949837
-0.5374947401

 0.00980451277802
 0.363699971544
# 1.000000000000

