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inoutgradvecsdwcapup.m
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inoutgradvecsdwcapup.m
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function [V,C]=inoutgradvecsdwcapup(TH,Lin,Lout,m,rsat,rpotin,rpotout)
% [V,C]=inoutgradvecsdwcapup(TH,Lin,Lout,m,rsat,rpotin,rpotout)
%
% INPUT:
%
% TH Angular extent of the spherical cap, in degrees
% OR: Angles of two spherical caps and we want the ring between
% them [TH1 TH2]
% Lin Maximum spherical-harmonic degree for inner sources
% or passband [Lintmin Lintmax]
% Lout Maximum spherical-harmonic degree for outer sources
% rsat Satellite reference altitude for gradient
% rpotin Reference radius for inner sources potential
% rpotout Reference radius for outer sources potential
%
% OUTPUT:
%
% C Matrix containing vector Slepian function coefficients for the Elm
% and Flm vector spherical harmonics IN ADDMOUT FORMAT
% V Eigenvalues (conditioning values)
%
% See also gradvecsdwcapup, inoutgradvecglmalphaup
%
% Last modified by plattner-at-alumni.ethz.ch, 5/11/2016
if length(Lout)>1
error('No Bandpass for external field')
end
maxLin=max(Lin);
lp=length(Lin)==1;
bp=length(Lin)==2;
if bp
Lin=[min(Lin) max(Lin)];
end
defval('nth',0)%,720)
defval('vcut',-1)%,eps*10)
defval('grd',1)
defval('method','gl')
% Work with the absolute value of m
mor=m;
m=abs(m);
if(m>max(maxLin,Lout))
error('Order cannot exceed degree')
end
% Filename of saved data
dirname=fullfile(getenv('IFILES'),'INOUTGRADVECSDWCAPUP');
if length(TH)==1
if lp
fnpl=fullfile(dirname,sprintf(...
'INOUTGRADVECSDWCAPUP-%g-%i-%i-%i-%g-%g-%g.mat',...
TH,Lin,Lout,m,rsat,rpotin,rpotout));
elseif bp
fnpl=fullfile(dirname,sprintf(...
'INOUTGRADVECSDWCAPUP-%g-%i_%i-%i-%i-%g-%g-%g.mat',...
TH,Lin(1),Lin(2),Lout,m,rsat,rpotin,rpotout));
else
error('The degree range should be either one or two numbers')
end
elseif length(TH)==2
if lp
fnpl=fullfile(dirname,sprintf(...
'INOUTGRADVECSDWUP-%g-%g-%i-%i-%i-%g-%g-%g.mat',...
max(TH),min(TH),Lin,Lout,m,rsat,rpotin,rpotout));
elseif bp
fnpl=fullfile(dirname,sprintf(...
'INOUTGRADVECSDWUP-%g-%g-%i_%i-%i-%i-%g-%g-%g.mat',...
max(TH),min(TH),Lin(1),Lin(2),Lout,m,rsat,rpotin,rpotout));
else
error('The degree range should be either one or two numbers')
end
else
error('Bad choice for TH')
end
if exist(fnpl,'file')==2 %&& (vcut>0) & 1==3
load(fnpl)
disp(sprintf('%s loaded by inoutgradvecsdwcapup.m',fnpl))
else
% First load Pm and Bm for L=max(Lin,Lout)
L=max(maxLin,Lout);
if length(TH)==2
%Pm=kernelpm(max(TH),L,m)-kernelpm(min(TH),L,m);
[~,~,~,~,~,~,~,~,~,~,Pm1]=sdwcap(max(TH),L,m,0,-1);
[~,~,~,~,~,~,~,~,~,~,Pm2]=sdwcap(min(TH),L,m,0,-1);
Pm=Pm1-Pm2;
clear Pm1
clear Pm2
Bm=kernelbm(max(TH),L,m)-kernelbm(min(TH),L,m);
else
%Pm=kernelpm(TH,L,m);
[~,~,~,~,~,~,~,~,~,~,Pm]=sdwcap(max(TH),L,m,0,-1);
Bm=kernelbm(TH,L,m);
end
% Now take different matrix subsets for EE, FF, and EF
% If m>Lin or m>Lout, then some of these matrices will simply be empty.
% For EE
PmEE=Pm(1:maxLin-m+1,1:maxLin-m+1);
if m==0
% In this case we need to add the m=0 zero rows and columns
BmEE=zeros(size(PmEE));
BmEE(2:end,2:end)=Bm(1:maxLin,1:maxLin);
else
BmEE=Bm(1:maxLin-m+1,1:maxLin-m+1);
end
% For FF
if m==0
PmFF=Pm(2:Lout+1,2:Lout+1);
BmFF=Bm(1:Lout,1:Lout);
else
PmFF=Pm(1:Lout-m+1,1:Lout-m+1);
BmFF=Bm(1:Lout-m+1,1:Lout-m+1);
end
% For EF
if m==0
PmEF=Pm(1:maxLin+1,2:Lout+1);
BmEF=zeros(maxLin+1,Lout);
BmEF(2:end,:)=Bm(1:maxLin,1:Lout);
else
PmEF=Pm(1:maxLin-m+1,1:Lout-m+1);
BmEF=Bm(1:maxLin-m+1,1:Lout-m+1);
end
% Now calculate factor matrices for P and B to calculate E and F
theLE=(m:maxLin)';
theLF=(max(m,1):Lout)';
facPE= sqrt( (theLE+1)./(2*theLE+1) );
facPF= sqrt( (theLF )./(2*theLF+1) );
facBE=-sqrt( (theLE )./(2*theLE+1) );
facBF= sqrt( (theLF+1)./(2*theLF+1) );
facPEmat=spdiags(facPE,0,length(facPE),length(facPE));
facPFmat=spdiags(facPF,0,length(facPF),length(facPF));
facBEmat=spdiags(facBE,0,length(facBE),length(facBE));
facBFmat=spdiags(facBF,0,length(facBF),length(facBF));
KEE= facPEmat*PmEE*facPEmat + facBEmat*BmEE*facBEmat;
KFF= facPFmat*PmFF*facPFmat + facBFmat*BmFF*facBFmat;
KEF= facPEmat*PmEF*facPFmat + facBEmat*BmEF*facBFmat;
% Now upward continue the matrices:
% calculate BKB' = (B(BK)')'
% First KEE
%lminin=max(Lin,0);
%lminout=max(Lout,0);
if m<=maxLin % Otherwise this matrix is empty
KEE=vecupderivative(KEE,rsat,rpotin,maxLin,0,theLE);
KEE=KEE';
KEE=vecupderivative(KEE,rsat,rpotin,maxLin,0,theLE);
KEE=KEE';
end
if m<=Lout % Otherwise this matrix is empty
KFF=outupderivative(KFF,rsat,rpotout,Lout,0,theLF);
KFF=KFF';
KFF=outupderivative(KFF,rsat,rpotout,Lout,0,theLF);
KFF=KFF';
end
if m<=maxLin & m<=Lout % Otherwise this matrix is empty
KEF=vecupderivative(KEF,rsat,rpotin,maxLin,0,theLE);
KEF=KEF';
KEF=outupderivative(KEF,rsat,rpotout,Lout,0,theLF);
KEF=KEF';
end
% Plattner 5/11/2016: Now delete the low degrees
if length(Lin)==2 & m<min(Lin);
KEE=KEE(min(Lin)-m+1:end,min(Lin)-m+1:end);
KEF=KEF(min(Lin)-m+1:end,:);
end
% Now assemble the entire matrix
K = [KEE KEF;KEF' KFF];
% And make sure it is symmetric
try
fprintf('Numerical asymmetry %g\n',norm(K-K'));
catch
fprintf('Numerical asymmetry %g\n',norm(full(K-K')));
end
K=(K+K')/2;
% Calculate eigenvalues and eigenvectors; C'*C=I
[C,V]=eig(full(K));
[V,isrt]=sort(sum(V,1),'descend');
C=C(:,isrt);
% Plattner 5/11/2016: Now add zeros for the low degrees
if length(Lin)==2 & m<min(Lin);
C=[zeros(min(Lin)-m,size(C,2));C];
end
save(fnpl,'C','V');
end