2024-04-08 18:30:52 +05:30
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module math
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implicit none
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contains
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function math_axisAngleToR(axis,omega) result(math_axisAngleToR1)
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implicit none
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real, dimension(3), intent(in) :: axis
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real, intent(in) :: omega
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real, dimension(3) :: n
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real :: norm,s,c,c1
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real, dimension(3,3), parameter :: &
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I3 = real(reshape([&
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1, 0, 0, &
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0, 1, 0, &
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0, 0, 1 &
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2024-04-09 16:48:50 +05:30
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],shape(I3))) !< 3x3 Identity
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real, dimension(3,3) :: math_axisAngleToR1
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norm = norm2(axis)
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wellDefined: if (norm > 1.0e-8) then
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n = axis/norm ! normalize axis to be sure
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s = sin(omega)
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c = cos(omega)
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c1 = 1.0 - c
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math_axisAngleToR1(1,1) = c + c1*n(1)**2.0
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math_axisAngleToR1(1,2) = c1*n(1)*n(2) - s*n(3)
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math_axisAngleToR1(1,3) = c1*n(1)*n(3) + s*n(2)
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math_axisAngleToR1(2,1) = c1*n(1)*n(2) + s*n(3)
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math_axisAngleToR1(2,2) = c + c1*n(2)**2.0
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math_axisAngleToR1(2,3) = c1*n(2)*n(3) - s*n(1)
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math_axisAngleToR1(3,1) = c1*n(1)*n(3) - s*n(2)
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math_axisAngleToR1(3,2) = c1*n(2)*n(3) + s*n(1)
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math_axisAngleToR1(3,3) = c + c1*n(3)**2.0
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else wellDefined
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math_axisAngleToR1 = I3
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endif wellDefined
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end function
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end module math
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2024-03-22 18:31:13 +05:30
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program corresponcence_matrix
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2024-04-08 18:30:52 +05:30
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use math
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implicit none
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2024-03-22 18:31:13 +05:30
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integer, dimension(4) :: &
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active = [6,6,6,6], & !< number of active twin systems
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potential = [6,6,6,6] !< all the potential twin systems
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real, dimension(3) :: &
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direction, normal
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2024-04-08 18:30:52 +05:30
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real, dimension(3,24) :: normal_vector, direction_vector
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real, dimension(3,3,24) :: SchmidMatrix, corresponcenceMatrix
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real, dimension(24) :: characteristicShear
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real :: cOverA = 1.6235
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2024-04-08 18:30:52 +05:30
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real :: pi = 3.14159274
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2024-03-22 18:31:13 +05:30
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real, dimension(8,24) :: &
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system = reshape(real([&
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! <-10.1>{10.2} systems, shear = (3-(c/a)^2)/(sqrt(3) c/a)
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! tension in Co, Mg, Zr, Ti, and Be; compression in Cd and Zn
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-1, 0, 1, 1, 1, 0, -1, 2, & !
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0, -1, 1, 1, 0, 1, -1, 2, &
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1, -1, 0, 1, -1, 1, 0, 2, &
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1, 0, -1, 1, -1, 0, 1, 2, &
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0, 1, -1, 1, 0, -1, 1, 2, &
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-1, 1, 0, 1, 1, -1, 0, 2, &
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! <11.6>{-1-1.1} systems, shear = 1/(c/a)
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! tension in Co, Re, and Zr
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-1, -1, 2, 6, 1, 1, -2, 1, &
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1, -2, 1, 6, -1, 2, -1, 1, &
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2, -1, -1, 6, -2, 1, 1, 1, &
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1, 1, -2, 6, -1, -1, 2, 1, &
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-1, 2, -1, 6, 1, -2, 1, 1, &
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-2, 1, 1, 6, 2, -1, -1, 1, &
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! <10.-2>{10.1} systems, shear = (4(c/a)^2-9)/(4 sqrt(3) c/a)
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! compression in Mg
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1, 0, -1, -2, 1, 0, -1, 1, &
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0, 1, -1, -2, 0, 1, -1, 1, &
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-1, 1, 0, -2, -1, 1, 0, 1, &
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-1, 0, 1, -2, -1, 0, 1, 1, &
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0, -1, 1, -2, 0, -1, 1, 1, &
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1, -1, 0, -2, 1, -1, 0, 1, &
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! <11.-3>{11.2} systems, shear = 2((c/a)^2-2)/(3 c/a)
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! compression in Ti and Zr
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1, 1, -2, -3, 1, 1, -2, 2, &
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-1, 2, -1, -3, -1, 2, -1, 2, &
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-2, 1, 1, -3, -2, 1, 1, 2, &
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-1, -1, 2, -3, -1, -1, 2, 2, &
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1, -2, 1, -3, 1, -2, 1, 2, &
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2, -1, -1, -3, 2, -1, -1, 2 &
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]),shape(system))
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2024-04-08 18:30:52 +05:30
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real, dimension(3,3), parameter :: &
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I3 = real(reshape([&
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1, 0, 0, &
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0, 1, 0, &
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0, 0, 1 &
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2024-04-09 16:48:50 +05:30
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],shape(I3))) !< 3x3 Identity
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2024-03-22 18:31:13 +05:30
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integer :: &
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a, & !< index of active system
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p, & !< index in potential system matrix
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f, & !< index of my family
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s, & !< index of my system in current family
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f1, s1, e1, i, j, k !< indices for similar loops
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2024-04-09 16:48:50 +05:30
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!--------------------------------------------------------------------
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!> Normal vector to twin plane and direction vector of the twin
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!--------------------------------------------------------------------
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a = 0
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2024-04-09 16:48:50 +05:30
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do f = 1, size(active,1) !< Active Twin Modes
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do s = 1, active(f) !< Active twin systems
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a = a + 1
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p = sum(potential(1:f-1))+s
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direction = [ system(1,p)*1.5, &
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(system(1,p)+2.0*system(2,p))*sqrt(0.75), &
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system(4,p)*cOverA ] ! direction [uvtw]->[3u/2 (u+2v)*sqrt(3)/2 w*(p/a)])
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normal = [ system(5,p), &
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(system(5,p)+2.0*system(6,p))/sqrt(3.0), &
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system(8,p)/cOverA ] ! plane (hkil)->(h (h+2k)/sqrt(3) l/(p/a))
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2024-04-08 18:30:52 +05:30
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normal_vector(1:3,a) = normal /norm2(normal)
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direction_vector(1:3,a) = direction / norm2(direction)
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2024-03-22 18:31:13 +05:30
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end do
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end do
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2024-04-09 16:48:50 +05:30
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!--------------------------------------------------------------------
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!> Magnitude of Characteristic shear for twinning modes
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!--------------------------------------------------------------------
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do f1 = 1,size(active,1) !< Active twin modes
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s1 = sum(active(:f1-1)) + 1
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e1 = sum(active(:f1))
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select case(f1)
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case (1)
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characteristicShear(s1:e1) = (3.0-cOverA**2)/sqrt(3.0)/cOverA
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case (2)
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characteristicShear(s1:e1) = 1.0/cOverA
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case (3)
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characteristicShear(s1:e1) = (4.0*cOverA**2-9.0)/sqrt(48.0)/cOverA
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case (4)
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characteristicShear(s1:e1) = 2.0*(cOverA**2-2.0)/3.0/cOverA
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end select
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enddo
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2024-04-09 16:48:50 +05:30
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!> Write results for characteristic shear
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write(6,*)'characteristic shear, for [1, 0, -1, 1],(-1, 0, 1, 2)'
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write(6,*)characteristicShear(4)
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write(6,*)'characteristic shear, for [-1, -1, 2, 6],(1, 1, -2, 1)'
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write(6,*)characteristicShear(7)
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write(6,*)'characteristic shear, for [1, 0, -1, -2],(1, 0, -1, 1)'
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write(6,*)characteristicShear(13)
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write(6,*)'characteristic shear, for [1, 1, -2, -3],(1, 1, -2, 2)'
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write(6,*)characteristicShear(19)
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!--------------------------------------------------------------------
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!> SchmidMatrix = Outer product of direction and normal vectors.
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!--------------------------------------------------------------------
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2024-04-08 18:30:52 +05:30
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do i = 1, sum(active)
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forall(j=1:3, k=1:3) SchmidMatrix(j,k,i) = direction_vector(j,i) * normal_vector(k,i)
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enddo
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2024-04-09 16:48:50 +05:30
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!--------------------------------------------------------------------
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!> Correspondence Matrix = Reorientation * Shear
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!--------------------------------------------------------------------
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2024-04-08 18:30:52 +05:30
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do i = 1, sum(active)
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corresponcenceMatrix(1:3,1:3,i) = matmul(math_axisAngleToR(normal_vector(1:3,i),pi),&
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I3+characteristicShear(i)*SchmidMatrix(1:3,1:3,i))
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enddo
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!> Write results for Correspondence Matrix
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write(6,*)'correspondence matrix for [1, 0, -1, 1],(-1, 0, 1, 2)'
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write(6,*)corresponcenceMatrix(1:3,1:3,4)
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write(6,*)'oxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxox'
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write(6,*)'correspondence matrix for [-1, -1, 2, 6],(1, 1, -2, 1)'
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write(6,*)corresponcenceMatrix(1:3,1:3,7)
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write(6,*)'oxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxox'
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write(6,*)'correspondence matrix for [1, 0, -1, -2],(1, 0, -1, 1)'
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write(6,*)corresponcenceMatrix(1:3,1:3,13)
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write(6,*)'oxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxoxox'
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write(6,*)'correspondence matrix for [1, 1, -2, -3],(1, 1, -2, 2)'
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write(6,*)corresponcenceMatrix(1:3,1:3,19)
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end program corresponcence_matrix
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2024-03-22 18:31:13 +05:30
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