Hi bil,
Define psi
syms x real
L = 100;
psi(x) = sqrt(sym(2)/L)*sin(sym(pi)*x/L)*rectangularPulse(0,L,x); %particle in a box ground state%
Its energy computed in the space domain is
Ecs = int(psi(x)*conj(psi(x)),x,-inf,inf)
Hmm, int can't handle that with the inf limits. Recompute with finite limits
Ecs = int(psi(x)*conj(psi(x)),x,-1e10,1e10)
Its Continuous Fourier Transform (CFT)
syms w real
Psi(w) = simplify(fourier(psi(x),x,w))
figure
fplot(abs(Psi(w)))
hold on
xlabel('rad/sec')
Its energy computed in the frequency domain is
Ecf = int(Psi(w)*conj(Psi(w)),w,-inf,inf)/2/sym(pi)
Can't find a closed form expression.
Verify the imaginary part of the integrand is 0
imag(Psi(w)*conj(Psi(w)))
Integrate just the real part
Ecf = int(simplify(real(Psi(w)*conj(Psi(w)))),w,-inf,inf)/2/sym(pi)
As expected, Ecf = Ecs.
Samples of psi. I'm going to change the number of samples to illustrate a point later.
N = 289;
x = linspace(0,L,N);
dx = x(2) - x(1)
psi = double(psi(x)); %particle in a box ground state%
Approximation of the energy integral via trapz yields the exact answer.
Ecs = trapz(x,psi.*conj(psi)) %normalized state has L-2 norm = 1%
The energy in the discrete space samples is
Eds = sum(psi.*conj(psi))
The continuous space energy is approximated by scaling by dx
Ecapproximate = Eds*dx
"DTFT" of the samples (quotes becasue the indpendependent variable is space, not time), w in rad/sample
[dtft,w] = freqz(psi,1,linspace(-pi,pi,2048));
Add to the plot. The DTFT has to be scaled by dx to approximate the CFT
plot(w/dx,abs(dtft*dx))
Discrete energy computed from the DTFT
Edtft = trapz(w,dtft.*conj(dtft))/2/pi
Approximate Ec after scaling by dx
Ecapproximate = Edtft*dx
DFT of the samples of psi
dft = fftshift(fft(psi));
Discrete energy in the frequency domain
Edft = sum(dft.*conj(dft))/N
Mulitply by dx to approximate Ec
Ecapproximate = Edft*dx
Can also approximate Ec via trapezoidal integration of the DFT
Define frequency vector (N is odd), rad/distance
w = ((-(N-1)/2):((N-1)/2))/N*2*pi/dx;
Integrate, divide by 2*pi as required when w is in rad/sample
Ecapproximate = trapz(w,(dft*dx).*conj(dft*dx))/2/pi
Add DFT to plot
stem(w,abs(dft)*dx)
xlim([-0.5 0.5])
legend('CFT','DTFT','DFT')
