Constraints on $μ$-distortion fluctuations and primordial non-Gaussianity from Planck data (1507.05615v1)
Abstract: We use the Planck HFI channel maps to make an all sky map of $\mu$-distortion fluctuations. Our $\mu$-type distortion map is dominated by the $y$-type distortion contamination from the hot gas in the low redshift Universe and we can thus only place upper limits on the $\mu$-type distortion fluctuations. For the amplitude of $\mu$-type distortions on $10'$ scales we get the limit on root mean square (rms) value $\mu_{rms}{10'}< 6.4\times 10{-6}$, a limit 14 times stronger than the COBE-FIRAS ($95\%$ confidence) limit on the mean of $< \mu > <90\times 10{-6}$. Using our maps we also place strong upper limits on the auto angular power spectrum of $\mu$, $C_{\ell}{\mu\mu}$ and the cross angular power spectrum of $\mu$ with the CMB temperature anisotropies, $C_{\ell}{\mu T}$. The strongest observational limits are on the largest scales, $\ell(\ell+1)/(2\pi)C_{\ell}{\mu\mu}|_{\ell=2-26}<(2.3\pm 1.0)\times 10{-12}$ and $\ell(\ell+1)/(2\pi)C_{\ell}{\mu T}|{\ell=2-26}<(2.6\pm 2.6)\times 10{-12}~{K}$. Our observational limits can be used to constrain new physics which can create spatially varying energy release in the early Universe between redshifts $5\times 104\lesssim z\lesssim 2\times 106$. We specifically apply our observational results to constrain the primordial non-Gaussianity of the local type, when the source of $\mu$-distortion is Silk damping, for very squeezed configurations with the wavenumber for the short wavelength mode $46 \lesssim k{S} \lesssim 104 ~{Mpc{-1}}$ and for the long wavelength mode $k_{L}\approx 10{-3} ~{Mpc{-1}}$. Our limits on the primordial non-Gaussianity parameters are $f_{NL}<105, \tau_{NL}<1.4\times 10{11}$ for $k_{S}/k_{L}\approx 5\times 104- 107$. We give a new derivation of the evolution of the $\mu$-distortion fluctuations. We also introduce mixing of Bose-Einstein spectra and $y{BE}$-type distortions.