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rpn2acv.f.html |
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Source file: rpn2acv.f
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Directory: /Users/rjl/git/rjleveque/clawpack-4.6.3/book/chap21/corner
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Converted: Mon Jan 21 2013 at 20:15:38
using clawcode2html
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This documentation file will
not reflect any later changes in the source file.
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c
c
c =====================================================
subroutine rpn2(ixy,maxm,meqn,mwaves,mbc,mx,ql,qr,
& auxl,auxr,wave,s,amdq,apdq)
c =====================================================
c
c # Riemann solver for the acoustics equations in 2d, with varying
c # material properties rho and kappa
c
c # Note that although there are 3 eigenvectors, the second eigenvalue
c # is always zero and so we only need to compute 2 waves.
c #
c # solve Riemann problems along one slice of data.
c
c # On input, ql contains the state vector at the left edge of each cell
c # qr contains the state vector at the right edge of each cell
c
c # auxl(i,1) holds impedance Z,
c # auxl(i,2) holds sound speed c,
c # Here it is assumed that auxl=auxr gives the cell values.
c
c
c # On output, wave contains the waves,
c # s the speeds,
c # amdq the left-going flux difference A^- \Delta q
c # apdq the right-going flux difference A^+ \Delta q
c
c
c # This data is along a slice in the x-direction if ixy=1
c # or the y-direction if ixy=2.
c
c # Note that the i'th Riemann problem has left state qr(i-1,:)
c # and right state ql(i,:)
c # From the basic clawpack routines, this routine is called with ql = qr
c
c
implicit double precision (a-h,o-z)
c
dimension wave(1-mbc:maxm+mbc, meqn, mwaves)
dimension s(1-mbc:maxm+mbc, mwaves)
dimension ql(1-mbc:maxm+mbc, meqn)
dimension qr(1-mbc:maxm+mbc, meqn)
dimension apdq(1-mbc:maxm+mbc, meqn)
dimension amdq(1-mbc:maxm+mbc, meqn)
dimension auxl(1-mbc:maxm+mbc, 2)
dimension auxr(1-mbc:maxm+mbc, 2)
c
c local arrays
c ------------
dimension delta(3)
c
common /comxyt/ dtcom,dxcom,dycom,tcom,icom,jcom
c
c # set mu to point to the component of the system that corresponds
c # to velocity in the direction of this slice, mv to the orthogonal
c # velocity.
c
c
if (ixy.eq.1) then
mu = 2
mv = 3
else
mu = 3
mv = 2
endif
c
c # note that notation for u and v reflects assumption that the
c # Riemann problems are in the x-direction with u in the normal
c # direciton and v in the orthogonal direcion, but with the above
c # definitions of mu and mv the routine also works with ixy=2
c
c
c # split the jump in q at each interface into waves
c # The jump is split into a leftgoing wave traveling at speed -c
c # relative to the material properties to the left of the interface,
c # and a rightgoing wave traveling at speed +c
c # relative to the material properties to the right of the interface,
c
c # find a1 and a2, the coefficients of the 2 eigenvectors:
do 20 i = 2-mbc, mx+mbc
delta(1) = ql(i,1) - qr(i-1,1)
delta(2) = ql(i,mu) - qr(i-1,mu)
c # impedances:
zi = auxl(i,1)
zim = auxl(i-1,1)
a1 = (-delta(1) + zi*delta(2)) / (zim + zi)
a2 = (delta(1) + zim*delta(2)) / (zim + zi)
c
c # Compute the waves.
c
wave(i,1,1) = -a1*zim
wave(i,mu,1) = a1
wave(i,mv,1) = 0.d0
s(i,1) = -auxl(i-1,2)
c
wave(i,1,2) = a2*zi
wave(i,mu,2) = a2
wave(i,mv,2) = 0.d0
s(i,2) = auxl(i,2)
c
20 continue
c
c
c
c # compute the leftgoing and rightgoing flux differences:
c # Note s(i,1) < 0 and s(i,2) > 0.
c
do 220 m=1,meqn
do 220 i = 2-mbc, mx+mbc
amdq(i,m) = s(i,1)*wave(i,m,1)
apdq(i,m) = s(i,2)*wave(i,m,2)
220 continue
c
return
end