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About Arne Rosenfeldt
edit1977 birth
sailing
1988 computer language basic
1992? Computer language.C++ (Ansi C, with variable declaraions in the middle in the function and other C++ comforts)
interest in computer Graphic
2002 diploma in physics
Occupation with lasers and UHV.
Other Wikis
editAnd in the German Wiki and the Commons and de.unecyclopedia I have the same user name.
Politics
editThe wiki content is free. So a profit organization can distribute it, but do not allow advertising on wikipedia itselft. Do not upgrade the server, do not hire more people, do not complicate the software. If an edit takes an hour to arrive at the server, edit wars will stop and a good edit needs more than one hour anyways, you will have to live with typos though.
Philosophy
editOn what base is an analogy choosen? I have not played with Barbie, so I think humans are quite complicated, they may even be more complicated than math. But most people have a built in Intuition (knowledge) about humans and use it for pets, but even for wild animals and for the genesis. Pretty long stretch, in my opinion.
Looking for a home outside Wikipedia: Application of the fresnel equation on multilayers
editThe following m-code can calculate multilayers as needed for optical coating, polarizer#Thin_film_polarizers, ellipsometry, resist:
%2006-10-14: Code checked with Freesnell and wikipedia.org/wiki/fresnel and references therein layer=[1 0;3+i 0.2;2+i/4 0.2;3+i 0.2;1 0]; % n+i*k width si=sin(60/180*pi); wavenumber= 2*pi/0.263; %%%%%%%%%%%%%%%%%%%%%%%%%% Core{ snellsius=wavenumber*sqrt( layer(:,1).^2 - si^2); fresnel = { @(k,r) [ k(1) - k(2) 2* k(1) ] / ( k(1) + k(2) ) , ... %s-polarization @(k,r) [ k(1)*r - k(2)/r 2* k(1) ] / ( k(1)*r+ k(2)/r ) }; %p-polarization s=size(layer); s=s(1); G=zeros(s*2,s*2);adr=@(l,d) l*2+d-1; % Global matrix for p=1:2 %polarization for l=1:s-1 %layer for d=0:1 %initial (due to fresnel equations traditionally formulated in push fashion) E=fresnel{p}(snellsius([l+d l+(1-d)]),layer(l+(1-d),1)/layer(l+d,1)) * exp(i*snellsius(l+d)*layer(l+d,2)); for f=0:1 %final. flattening G( adr(l+f,1-f) , adr(l+d, d) )=E(f+1); end end end t = inv(eye(2*s-2,2*s-2)-G(2:2*s-1,2:2*s-1)) * G(2:2*s-1,[1 2*s]); t = [1 0 ; t; 0 1]; for l=1:s %unflattening Eg(l,:,:,p)=permute([t(adr(l,0),:) ; t(adr(l,1),:)],[3 1 2]); end end %%%%%%%%%%%%%%%%%%%%%%%%%% }Core for l=1:s E=fresnel{1}([snellsius(1) snellsius(l)],layer(l,1)); %should work the same for fresnel{2} Flux_into_layer(l,:)=(1-abs(E(1))^2)/abs(E(2))^2*abs(Eg(l,:,1,1)).^2; %specialize for (coming from the bottum, unity s polarzation). All (layers, directions) Flux_gain(l,:)=sum(Flux_into_layer(l,:)) * (abs(exp(i*snellsius(l)*layer(l,2)))^2-1) ; end Flux_gain
Particle-Wave Duality
edit... as the hardest part right at the beginning of quantum mechanics compared to relativistic effects like spin, gauge fields, Schrödinger equation, wich are later or just lengthy:
True, when quantum mechanics was new, some physicists thought that it put humans back into the picture, because the principles of quantum mechanics tell us how to calculate the probabilities of various results that might be found by a human observer. But, starting with the work of Hugh Everett forty years ago, the tendency of physicists who think deeply about these things has been to reformulate quantum mechanics in an entirely objective way, with observers treated just like everything else. I don't know if this program has been completely successful yet, but I think it will be.
from [[1]]
Inlet cone
editmoved to discussion page