[1262] | 1 | ! MATH_LIB: Mathematics procedures for F90 |
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| 2 | ! Compiled/Modified: |
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| 3 | ! 07/01/06 John Haynes (haynes@atmos.colostate.edu) |
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| 4 | ! |
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| 5 | ! gamma (function) |
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| 6 | ! path_integral (function) |
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| 7 | ! avint (subroutine) |
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| 8 | |
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| 9 | module math_lib |
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| 10 | implicit none |
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| 11 | |
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| 12 | contains |
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| 13 | |
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| 14 | ! ---------------------------------------------------------------------------- |
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| 15 | ! function GAMMA |
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| 16 | ! ---------------------------------------------------------------------------- |
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| 17 | function gamma(x) |
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| 18 | implicit none |
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| 19 | ! |
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| 20 | ! Purpose: |
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| 21 | ! Returns the gamma function |
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| 22 | ! |
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| 23 | ! Input: |
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| 24 | ! [x] value to compute gamma function of |
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| 25 | ! |
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| 26 | ! Returns: |
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| 27 | ! gamma(x) |
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| 28 | ! |
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| 29 | ! Coded: |
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| 30 | ! 02/02/06 John Haynes (haynes@atmos.colostate.edu) |
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| 31 | ! (original code of unknown origin) |
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| 32 | |
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| 33 | ! ----- INPUTS ----- |
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| 34 | real*8, intent(in) :: x |
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| 35 | |
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| 36 | ! ----- OUTPUTS ----- |
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| 37 | real*8 :: gamma |
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| 38 | |
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| 39 | ! ----- INTERNAL ----- |
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| 40 | real*8 :: pi,ga,z,r,gr |
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| 41 | real*8 :: g(26) |
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| 42 | integer :: k,m1,m |
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| 43 | |
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| 44 | pi = acos(-1.) |
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| 45 | if (x ==int(x)) then |
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| 46 | if (x > 0.0) then |
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| 47 | ga=1.0 |
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| 48 | m1=x-1 |
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| 49 | do k=2,m1 |
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| 50 | ga=ga*k |
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| 51 | enddo |
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| 52 | else |
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| 53 | ga=1.0+300 |
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| 54 | endif |
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| 55 | else |
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| 56 | if (abs(x) > 1.0) then |
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| 57 | z=abs(x) |
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| 58 | m=int(z) |
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| 59 | r=1.0 |
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| 60 | do k=1,m |
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| 61 | r=r*(z-k) |
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| 62 | enddo |
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| 63 | z=z-m |
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| 64 | else |
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| 65 | z=x |
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| 66 | endif |
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| 67 | data g/1.0,0.5772156649015329, & |
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| 68 | -0.6558780715202538, -0.420026350340952d-1, & |
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| 69 | 0.1665386113822915,-.421977345555443d-1, & |
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| 70 | -.96219715278770d-2, .72189432466630d-2, & |
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| 71 | -.11651675918591d-2, -.2152416741149d-3, & |
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| 72 | .1280502823882d-3, -.201348547807d-4, & |
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| 73 | -.12504934821d-5, .11330272320d-5, & |
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| 74 | -.2056338417d-6, .61160950d-8, & |
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| 75 | .50020075d-8, -.11812746d-8, & |
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| 76 | .1043427d-9, .77823d-11, & |
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| 77 | -.36968d-11, .51d-12, & |
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| 78 | -.206d-13, -.54d-14, .14d-14, .1d-15/ |
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| 79 | gr=g(26) |
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| 80 | do k=25,1,-1 |
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| 81 | gr=gr*z+g(k) |
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| 82 | enddo |
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| 83 | ga=1.0/(gr*z) |
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| 84 | if (abs(x) > 1.0) then |
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| 85 | ga=ga*r |
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| 86 | if (x < 0.0) ga=-pi/(x*ga*sin(pi*x)) |
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| 87 | endif |
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| 88 | endif |
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| 89 | gamma = ga |
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| 90 | return |
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| 91 | end function gamma |
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| 92 | |
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| 93 | ! ---------------------------------------------------------------------------- |
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| 94 | ! function PATH_INTEGRAL |
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| 95 | ! ---------------------------------------------------------------------------- |
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| 96 | function path_integral(f,s,i1,i2) |
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| 97 | use m_mrgrnk |
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| 98 | use array_lib |
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| 99 | implicit none |
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| 100 | ! |
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| 101 | ! Purpose: |
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| 102 | ! evalues the integral (f ds) between f(index=i1) and f(index=i2) |
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| 103 | ! using the AVINT procedure |
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| 104 | ! |
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| 105 | ! Inputs: |
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| 106 | ! [f] functional values |
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| 107 | ! [s] abscissa values |
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| 108 | ! [i1] index of lower limit |
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| 109 | ! [i2] index of upper limit |
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| 110 | ! |
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| 111 | ! Returns: |
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| 112 | ! result of path integral |
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| 113 | ! |
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| 114 | ! Notes: |
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| 115 | ! [s] may be in forward or reverse numerical order |
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| 116 | ! |
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| 117 | ! Requires: |
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| 118 | ! mrgrnk package |
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| 119 | ! |
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| 120 | ! Created: |
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| 121 | ! 02/02/06 John Haynes (haynes@atmos.colostate.edu) |
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| 122 | |
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| 123 | ! ----- INPUTS ----- |
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| 124 | real*8, intent(in), dimension(:) :: f,s |
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| 125 | integer, intent(in) :: i1, i2 |
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| 126 | |
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| 127 | ! ---- OUTPUTS ----- |
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| 128 | real*8 :: path_integral |
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| 129 | |
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| 130 | ! ----- INTERNAL ----- |
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| 131 | real*8 :: sumo, deltah, val |
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| 132 | integer*4 :: nelm, j |
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| 133 | integer*4, dimension(i2-i1+1) :: idx |
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| 134 | real*8, dimension(i2-i1+1) :: f_rev, s_rev |
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| 135 | |
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| 136 | nelm = i2-i1+1 |
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| 137 | if (nelm > 3) then |
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| 138 | call mrgrnk(s(i1:i2),idx) |
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| 139 | s_rev = s(idx) |
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| 140 | f_rev = f(idx) |
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| 141 | call avint(f_rev(i1:i2),s_rev(i1:i2),(i2-i1+1), & |
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| 142 | s_rev(i1),s_rev(i2), val) |
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| 143 | path_integral = val |
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| 144 | else |
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| 145 | sumo = 0. |
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| 146 | do j=i1,i2 |
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| 147 | deltah = abs(s(i1+1)-s(i1)) |
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| 148 | sumo = sumo + f(j)*deltah |
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| 149 | enddo |
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| 150 | path_integral = sumo |
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| 151 | endif |
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| 152 | ! print *, sumo |
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| 153 | |
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| 154 | return |
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| 155 | end function path_integral |
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| 156 | |
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| 157 | ! ---------------------------------------------------------------------------- |
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| 158 | ! subroutine AVINT |
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| 159 | ! ---------------------------------------------------------------------------- |
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| 160 | subroutine avint ( ftab, xtab, ntab, a_in, b_in, result ) |
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| 161 | implicit none |
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| 162 | ! |
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| 163 | ! Purpose: |
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| 164 | ! estimate the integral of unevenly spaced data |
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| 165 | ! |
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| 166 | ! Inputs: |
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| 167 | ! [ftab] functional values |
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| 168 | ! [xtab] abscissa values |
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| 169 | ! [ntab] number of elements of [ftab] and [xtab] |
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| 170 | ! [a] lower limit of integration |
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| 171 | ! [b] upper limit of integration |
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| 172 | ! |
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| 173 | ! Outputs: |
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| 174 | ! [result] approximate value of integral |
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| 175 | ! |
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| 176 | ! Reference: |
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| 177 | ! From SLATEC libraries, in public domain |
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| 178 | ! |
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| 179 | !*********************************************************************** |
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| 180 | ! |
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| 181 | ! AVINT estimates the integral of unevenly spaced data. |
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| 182 | ! |
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| 183 | ! Discussion: |
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| 184 | ! |
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| 185 | ! The method uses overlapping parabolas and smoothing. |
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| 186 | ! |
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| 187 | ! Modified: |
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| 188 | ! |
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| 189 | ! 30 October 2000 |
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| 190 | ! 4 January 2008, A. Bodas-Salcedo. Error control for XTAB taken out of |
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| 191 | ! loop to allow vectorization. |
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| 192 | ! |
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| 193 | ! Reference: |
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| 194 | ! |
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| 195 | ! Philip Davis and Philip Rabinowitz, |
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| 196 | ! Methods of Numerical Integration, |
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| 197 | ! Blaisdell Publishing, 1967. |
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| 198 | ! |
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| 199 | ! P E Hennion, |
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| 200 | ! Algorithm 77, |
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| 201 | ! Interpolation, Differentiation and Integration, |
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| 202 | ! Communications of the Association for Computing Machinery, |
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| 203 | ! Volume 5, page 96, 1962. |
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| 204 | ! |
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| 205 | ! Parameters: |
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| 206 | ! |
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| 207 | ! Input, real ( kind = 8 ) FTAB(NTAB), the function values, |
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| 208 | ! FTAB(I) = F(XTAB(I)). |
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| 209 | ! |
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| 210 | ! Input, real ( kind = 8 ) XTAB(NTAB), the abscissas at which the |
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| 211 | ! function values are given. The XTAB's must be distinct |
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| 212 | ! and in ascending order. |
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| 213 | ! |
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| 214 | ! Input, integer NTAB, the number of entries in FTAB and |
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| 215 | ! XTAB. NTAB must be at least 3. |
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| 216 | ! |
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| 217 | ! Input, real ( kind = 8 ) A, the lower limit of integration. A should |
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| 218 | ! be, but need not be, near one endpoint of the interval |
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| 219 | ! (X(1), X(NTAB)). |
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| 220 | ! |
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| 221 | ! Input, real ( kind = 8 ) B, the upper limit of integration. B should |
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| 222 | ! be, but need not be, near one endpoint of the interval |
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| 223 | ! (X(1), X(NTAB)). |
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| 224 | ! |
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| 225 | ! Output, real ( kind = 8 ) RESULT, the approximate value of the integral. |
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| 226 | |
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| 227 | integer, intent(in) :: ntab |
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| 228 | |
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| 229 | integer,parameter :: KR8 = selected_real_kind(15,300) |
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| 230 | real ( kind = KR8 ), intent(in) :: a_in |
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| 231 | real ( kind = KR8 ) a |
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| 232 | real ( kind = KR8 ) atemp |
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| 233 | real ( kind = KR8 ), intent(in) :: b_in |
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| 234 | real ( kind = KR8 ) b |
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| 235 | real ( kind = KR8 ) btemp |
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| 236 | real ( kind = KR8 ) ca |
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| 237 | real ( kind = KR8 ) cb |
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| 238 | real ( kind = KR8 ) cc |
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| 239 | real ( kind = KR8 ) ctemp |
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| 240 | real ( kind = KR8 ), intent(in) :: ftab(ntab) |
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| 241 | integer i |
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| 242 | integer ihi |
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| 243 | integer ilo |
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| 244 | integer ind |
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| 245 | real ( kind = KR8 ), intent(out) :: result |
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| 246 | real ( kind = KR8 ) sum1 |
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| 247 | real ( kind = KR8 ) syl |
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| 248 | real ( kind = KR8 ) term1 |
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| 249 | real ( kind = KR8 ) term2 |
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| 250 | real ( kind = KR8 ) term3 |
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| 251 | real ( kind = KR8 ) x1 |
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| 252 | real ( kind = KR8 ) x2 |
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| 253 | real ( kind = KR8 ) x3 |
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| 254 | real ( kind = KR8 ), intent(in) :: xtab(ntab) |
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| 255 | logical lerror |
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| 256 | |
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| 257 | lerror = .false. |
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| 258 | a = a_in |
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| 259 | b = b_in |
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| 260 | |
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| 261 | if ( ntab < 3 ) then |
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| 262 | write ( *, '(a)' ) ' ' |
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| 263 | write ( *, '(a)' ) 'AVINT - Fatal error!' |
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| 264 | write ( *, '(a,i6)' ) ' NTAB is less than 3. NTAB = ', ntab |
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| 265 | stop |
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| 266 | end if |
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| 267 | |
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| 268 | do i = 2, ntab |
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| 269 | if ( xtab(i) <= xtab(i-1) ) then |
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| 270 | lerror = .true. |
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| 271 | exit |
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| 272 | end if |
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| 273 | end do |
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| 274 | |
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| 275 | if (lerror) then |
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| 276 | write ( *, '(a)' ) ' ' |
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| 277 | write ( *, '(a)' ) 'AVINT - Fatal error!' |
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| 278 | write ( *, '(a)' ) ' XTAB(I) is not greater than XTAB(I-1).' |
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| 279 | write ( *, '(a,i6)' ) ' Here, I = ', i |
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| 280 | write ( *, '(a,g14.6)' ) ' XTAB(I-1) = ', xtab(i-1) |
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| 281 | write ( *, '(a,g14.6)' ) ' XTAB(I) = ', xtab(i) |
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| 282 | stop |
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| 283 | end if |
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| 284 | |
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| 285 | result = 0.0D+00 |
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| 286 | |
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| 287 | if ( a == b ) then |
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| 288 | write ( *, '(a)' ) ' ' |
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| 289 | write ( *, '(a)' ) 'AVINT - Warning!' |
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| 290 | write ( *, '(a)' ) ' A = B, integral=0.' |
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| 291 | return |
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| 292 | end if |
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| 293 | ! |
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| 294 | ! If B < A, temporarily switch A and B, and store sign. |
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| 295 | ! |
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| 296 | if ( b < a ) then |
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| 297 | syl = b |
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| 298 | b = a |
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| 299 | a = syl |
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| 300 | ind = -1 |
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| 301 | else |
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| 302 | syl = a |
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| 303 | ind = 1 |
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| 304 | end if |
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| 305 | ! |
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| 306 | ! Bracket A and B between XTAB(ILO) and XTAB(IHI). |
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| 307 | ! |
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| 308 | ilo = 1 |
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| 309 | ihi = ntab |
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| 310 | |
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| 311 | do i = 1, ntab |
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| 312 | if ( a <= xtab(i) ) then |
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| 313 | exit |
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| 314 | end if |
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| 315 | ilo = ilo + 1 |
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| 316 | end do |
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| 317 | |
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| 318 | ilo = max ( 2, ilo ) |
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| 319 | ilo = min ( ilo, ntab - 1 ) |
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| 320 | |
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| 321 | do i = 1, ntab |
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| 322 | if ( xtab(i) <= b ) then |
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| 323 | exit |
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| 324 | end if |
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| 325 | ihi = ihi - 1 |
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| 326 | end do |
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| 327 | |
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| 328 | ihi = min ( ihi, ntab - 1 ) |
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| 329 | ihi = max ( ilo, ihi - 1 ) |
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| 330 | ! |
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| 331 | ! Carry out approximate integration from XTAB(ILO) to XTAB(IHI). |
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| 332 | ! |
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| 333 | sum1 = 0.0D+00 |
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| 334 | |
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| 335 | do i = ilo, ihi |
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| 336 | |
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| 337 | x1 = xtab(i-1) |
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| 338 | x2 = xtab(i) |
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| 339 | x3 = xtab(i+1) |
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| 340 | |
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| 341 | term1 = ftab(i-1) / ( ( x1 - x2 ) * ( x1 - x3 ) ) |
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| 342 | term2 = ftab(i) / ( ( x2 - x1 ) * ( x2 - x3 ) ) |
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| 343 | term3 = ftab(i+1) / ( ( x3 - x1 ) * ( x3 - x2 ) ) |
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| 344 | |
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| 345 | atemp = term1 + term2 + term3 |
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| 346 | |
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| 347 | btemp = - ( x2 + x3 ) * term1 & |
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| 348 | - ( x1 + x3 ) * term2 & |
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| 349 | - ( x1 + x2 ) * term3 |
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| 350 | |
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| 351 | ctemp = x2 * x3 * term1 + x1 * x3 * term2 + x1 * x2 * term3 |
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| 352 | |
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| 353 | if ( i <= ilo ) then |
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| 354 | ca = atemp |
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| 355 | cb = btemp |
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| 356 | cc = ctemp |
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| 357 | else |
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| 358 | ca = 0.5D+00 * ( atemp + ca ) |
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| 359 | cb = 0.5D+00 * ( btemp + cb ) |
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| 360 | cc = 0.5D+00 * ( ctemp + cc ) |
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| 361 | end if |
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| 362 | |
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| 363 | sum1 = sum1 & |
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| 364 | + ca * ( x2**3 - syl**3 ) / 3.0D+00 & |
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| 365 | + cb * 0.5D+00 * ( x2**2 - syl**2 ) & |
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| 366 | + cc * ( x2 - syl ) |
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| 367 | |
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| 368 | ca = atemp |
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| 369 | cb = btemp |
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| 370 | cc = ctemp |
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| 371 | |
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| 372 | syl = x2 |
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| 373 | |
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| 374 | end do |
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| 375 | |
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| 376 | result = sum1 & |
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| 377 | + ca * ( b**3 - syl**3 ) / 3.0D+00 & |
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| 378 | + cb * 0.5D+00 * ( b**2 - syl**2 ) & |
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| 379 | + cc * ( b - syl ) |
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| 380 | ! |
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| 381 | ! Restore original values of A and B, reverse sign of integral |
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| 382 | ! because of earlier switch. |
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| 383 | ! |
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| 384 | if ( ind /= 1 ) then |
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| 385 | ind = 1 |
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| 386 | syl = b |
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| 387 | b = a |
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| 388 | a = syl |
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| 389 | result = -result |
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| 390 | end if |
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| 391 | |
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| 392 | return |
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| 393 | end subroutine avint |
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| 394 | |
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| 395 | end module math_lib |
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