re-indroduced special spectral decomposition for 33 tensors
This commit is contained in:
parent
5d0900ee2e
commit
76b67e88eb
|
@ -2009,21 +2009,90 @@ end function math_spectralDecompositionSym
|
|||
function math_spectralDecompositionSym33(m)
|
||||
|
||||
implicit none
|
||||
real(pReal), dimension(3,3), intent(in) :: m
|
||||
real(pReal), dimension(3,3) :: math_spectralDecompositionSym33
|
||||
real(pReal), dimension(3) :: values
|
||||
real(pReal), dimension(3,3) :: vectors
|
||||
logical :: error
|
||||
integer(pInt) :: i
|
||||
real(pReal), dimension(3) :: invariants, values
|
||||
real(pReal), dimension(3,3), intent(in) :: m
|
||||
real(pReal) :: EW1,EW2,EW3
|
||||
real(pReal) :: P, Q, RHO, PHI, Y1, Y2, Y3, D1, D2, D3
|
||||
real(pReal), parameter :: TOL=1.e-14_pReal
|
||||
real(pReal), dimension(3,3) :: M1, M2, M3,EB1, EB2, EB3
|
||||
real(pReal) C1,C2,C3
|
||||
|
||||
math_spectralDecompositionSym33 = 0.0_pReal
|
||||
call math_eigenValuesVectorsSym33(m,values,vectors)
|
||||
if(error) return
|
||||
invariants = math_invariantsSym33(m)
|
||||
|
||||
do i=1_pInt, 3_pInt
|
||||
math_spectralDecompositionSym33 = math_spectralDecompositionSym33 &
|
||||
+ sqrt(values(i)) * math_tensorproduct(vectors(:,i),vectors(:,i))
|
||||
enddo
|
||||
P=invariants(2)-invariants(1)**2.0_pReal/3.0_pReal
|
||||
Q=-2.0_pReal/27.0_pReal*invariants(1)**3.0_pReal+invariants(1)*invariants(2)/3.0_pReal-invariants(3)
|
||||
|
||||
EB1=0.0_pReal
|
||||
EB2=0.0_pReal
|
||||
EB3=0.0_pReal
|
||||
if((ABS(P) < TOL).AND.(ABS(Q) < TOL)) then
|
||||
! DREI GLEICHE EIGENWERTE
|
||||
values = invariants(1)/3.0_pReal
|
||||
! this is not really correct, but this way U is calculated
|
||||
! correctly in PDECOMPOSITION (correct is EB?=I)
|
||||
EB1(1,1)=1.0_pReal
|
||||
EB2(2,2)=1.0_pReal
|
||||
EB3(3,3)=1.0_pReal
|
||||
else
|
||||
rho=sqrt(-3.0_pReal*P**3.0_pReal)/9.0_pReal
|
||||
phi=acos(math_limit(-Q/rho*0.5_pReal,-1.0_pReal,1.0_pReal))
|
||||
Y1=2.0_pReal*RHO**(1.0_pReal/3.0_pReal)*cos(PHI/3.0_pReal)
|
||||
Y2=2.0_pReal*RHO**(1.0_pReal/3.0_pReal)*cos(PHI/3.0_pReal+2.0_pReal/3.0_pReal*PI)
|
||||
Y3=2.0_pReal*RHO**(1.0_pReal/3.0_pReal)*cos(PHI/3.0_pReal+4.0_pReal/3.0_pReal*PI)
|
||||
EW1=Y1+invariants(1)/3.0_pReal
|
||||
EW2=Y2+invariants(1)/3.0_pReal
|
||||
EW3=Y3+invariants(1)/3.0_pReal
|
||||
C1=ABS(EW1-EW2)
|
||||
C2=ABS(EW2-EW3)
|
||||
C3=ABS(EW3-EW1)
|
||||
|
||||
if (C1 < TOL) then
|
||||
! EW1 is equal to EW2
|
||||
D3=1.0_pReal/(EW3-EW1)/(EW3-EW2)
|
||||
M1=M-EW1*math_I3
|
||||
M2=M-EW2*math_I3
|
||||
EB3=math_mul33x33(M1,M2)*D3
|
||||
|
||||
EB1=math_I3-EB3
|
||||
! both EB2 and EW2 are set to zero so that they do not
|
||||
! contribute to U in PDECOMPOSITION
|
||||
EW2=0.0_pReal
|
||||
elseif (C2 < TOL) then
|
||||
! EW2 is equal to EW3
|
||||
D1=1.0_pReal/(EW1-EW2)/(EW1-EW3)
|
||||
M2=M-math_I3*EW2
|
||||
M3=M-math_I3*EW3
|
||||
EB1=math_mul33x33(M2,M3)*D1
|
||||
EB2=math_I3-EB1
|
||||
! both EB3 and EW3 are set to zero so that they do not
|
||||
! contribute to U in PDECOMPOSITION
|
||||
EW3=0.0_pReal
|
||||
elseif(C3 < TOL) then
|
||||
! EW1 is equal to EW3
|
||||
D2=1.0_pReal/(EW2-EW1)/(EW2-EW3)
|
||||
M1=M-math_I3*EW1
|
||||
M3=M-math_I3*EW3
|
||||
EB2=math_mul33x33(M1,M3)*D2
|
||||
EB1=math_I3-EB2
|
||||
! both EB3 and EW3 are set to zero so that they do not
|
||||
! contribute to U in PDECOMPOSITION
|
||||
EW3=0.0_pReal
|
||||
else
|
||||
! all three eigenvectors are different
|
||||
D1=1.0_pReal/(EW1-EW2)/(EW1-EW3)
|
||||
D2=1.0_pReal/(EW2-EW1)/(EW2-EW3)
|
||||
D3=1.0_pReal/(EW3-EW1)/(EW3-EW2)
|
||||
M1=M-EW1*math_I3
|
||||
M2=M-EW2*math_I3
|
||||
M3=M-EW3*math_I3
|
||||
EB1=math_mul33x33(M2,M3)*D1
|
||||
EB2=math_mul33x33(M1,M3)*D2
|
||||
EB3=math_mul33x33(M1,M2)*D3
|
||||
endif
|
||||
endif
|
||||
|
||||
math_spectralDecompositionSym33 = sqrt(EW1) * EB1 + sqrt(EW2) * EB2 + sqrt(EW3) * EB3
|
||||
|
||||
end function math_spectralDecompositionSym33
|
||||
|
||||
|
|
Loading…
Reference in New Issue