I have read this question:
Effect of expansion of space on CMB
where Ted Bunn says:
For definiteness, let's consider a wave packet of electromagnetic radiation with some fairly well-defined wavelength. At some early time, it has a wavelength $\lambda_1$ and energy $U_1$. (I'm not calling it $E$ because I want to reserve that for the electric field.) After the Universe has expanded for a while, it has a longer wavelength $\lambda_2$ and a smaller energy $U_2$. (Fine print: wavelengths and energies are measured by a comoving observer -- that is, one who's at rest in the natural coordinates to use.) In fact, the ratios are both just the factor by which the Universe has expanded: $$ {\lambda_2\over\lambda_1}={U_1\over U_2}={a_2\over a_1}\equiv 1+z, $$ where $a$ is the "scale factor" of the Universe. $1+z$ is the standard notation for this ratio, where $z$ is the redshift.Just to be clear: by "amplitude" you mean the amplitude of a classical electromagnetic wave -- that is, the peak value of the electric field -- right? In that case, the answer is that the amplitude goes down.
But the CMB does have a certain redshift.
The cosmic microwave background has a redshift of z = 1089, corresponding to an age of approximately 379,000 years after the Big Bang and a comoving distance of more than 46 billion light years.
https://en.wikipedia.org/wiki/Redshift
Is this a contradiction? This does not explain whether the CMB's photons' wavelengths themselves are getting stretched as the universe expands.
Question:
- Do the CMB's photons wavelength get stretched as they travel through expanding space or is the CMB redshift constant?
