What dose this mean?
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I know the magnitude of complex number a+ib is the sqrt(a^2+b^2).and the magnitude of the complex function for examble (f(z)=ab/cd) where a,b,c and d are complex numbers is |f(z)|=|a||b|/|c||d|.
My question is:
I received this explenation from some expert in matlab work , but I can not understand it
((The magnitude of f(x) corresponds to rotating each point in the complex plane over to the positive x axes, preserving vector magnitude. The result has no remaining phase.))
Can I get more explenation or referece to understand this please?
I will appreciate any help
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Torsten
2022년 8월 20일
0 개 추천
The easiest way to see what you are asking is to use the polar representation of a complex number.
If z = r*exp(i*phi), then r is the magnitude of z and phi is the phase angle.
Rotation of a complex number w by an angle theta in the complex plane is given by multiplication of w by exp(i*theta):
w' = exp(i*theta)*w.
Thus if you rotate z = r*exp(i*phi) by its negative phase angle (-phi) , you arrive at z' = r*exp(i*phi)*exp(-i*phi) = r, the magnitude of z.
댓글 수: 6
Aisha Mohamed
2022년 8월 20일
Bruno Luong
2022년 8월 20일
편집: Bruno Luong
2022년 8월 20일
A Hamiltonian is a Hermitian operator, even in finite dimension, it's slightly more complex than theta where people explain you which is smply a single real number of argument of the complex number.
If you prefer H is a Hermitian matrix in finite dimension.
In short if you project f on the eigen space (eigen state) of H, theta is taken by the (real) eigen value (~ energy) of H.
Aisha Mohamed
2022년 8월 21일
theta is the argument of the exp function without i (=sqrt(-1)), therefore theta = t*Ek, where Ek is the eigen value #k of the Hamiltonian.
This must be written in all textbook tht explains Schrodinger equation.
Under MATLAB call expm function to compoute exponential of matrix
H=rand(3)
t=rand
expm(1i*t*H)
Torsten
2022년 8월 21일
If you diagonalize H with S,
D = S*H*S^(-1)
you get
f' = exp(S^(-1)*(i*t*D)*S)*f = (S^(-1)*exp(i*t*D)*S)*f
thus
S*f' = exp(i*t*D) * (S*f)
where D is a real diagonal matrix.
exp(i*t*D) is a diagonal matrix with exp(i*t*d(j)) on the diagonal.
Thus theta(j) is kind of t*d(j) with d(j) as j-th eigenvalue of H.
But I think Bruno can better comment on this from the application side.
Aisha Mohamed
2022년 8월 21일
추가 답변 (1개)
dpb
2022년 8월 20일
0 개 추천
Basically, just what it says -- albeit somewhat wordily, perhaps... :)
A vector in 2D has X,Y components; a complex variable can be represented as a vector in a 2D plane with X-->Re, Y-->Im components.
In that plane, the magnitude is the vector from the origin to the point at which the intersection of the X (Re) and Y(Im) lines intersect; the angle of that vector represents the phase. By Pythagoras, the magnitude is abs() value, but if you compute only it, then you don't know what the two components were any more; you've gained the size but lost the phase (angle). Hence, all you can do then is plot a point on the X axis.
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