Abstract

We measure properties of dark matter in four well motivated scenarios: fermions with ultra-relativistic thermal equilibrium (URTE), bosons with URTE, fermions with non-relativistic thermal equilibrium (NRTE), and bosons with NRTE. We attempt to discriminate between these four scenarios with studies of spiral galaxy rotation curves, and galaxy stellar mass distributions. The measurements show evidence for boson dark matter with a significance of 3.5σ, and obtain no significant discrimination between URTE and NRTE.

Keywords

Dark Matter, Free-Streaming, Galaxy Mass Distribution, Spiral Galaxy

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1. Introduction

Non-relativistic dark matter in the early universe has a density ${\rho }_h\left(a\right)$ that scales as $a^{-3}$, and a particle root-mean-square (rms) velocity $v_{h\text{rms}}\left(a\right)$ that scales as $a^{-1}$, where $a$ is the expansion parameter. (Throughout, the sub-index “h” stands for the halo of dark matter.) Note that $v_{h\text{rms}}\left(a\right)/{\rho }_h{\left(a\right)}^{1/3}$ is an adiabatic invariant independent of $a$. Now consider a free observer in a density peak. This observer feels no gravity, observes dark matter expanding adiabatically, reaching maximum expansion, and then collapsing adiabatically into the core of a galaxy. Note that adiabatic expansion implies

$\frac{v_{h\text{rms}}\left(a\right)}{{\rho }_h{\left(a\right)}^{1/3}}=\frac{v_{h\text{rms}}\left(1\right)}{{\left({\Omega }_c{\rho }_{\text{crit}}\right)}^{1/3}}=\frac{\sqrt{3}{\langle v_{rh}^2\rangle }^{1/2}}{{\rho }_h{\left(r\to 0\right)}^{1/3}}\mathrm{,}$ (1)

where $\sqrt{3}{\langle v_{rh}^2\rangle }^{1/2}$ is the root-mean-square velocity of dark matter particles in the core of the galaxy, and ${\rho }_h\left(r\to 0\right)$ is the density of dark matter in the core of the galaxy. (We use the standard notation in cosmology as defined in [1].) The interest in Equation (1) lies in the ability to measure ${\langle v_{rh}^2\rangle }^{1/2}$, ${\rho }_h\left(r\to 0\right)$, and $v_{h\text{rms}}\left(1\right)$ by fitting spiral galaxy rotation curves.

The adiabatic invariant $v_{h\text{rms}}\left(1\right)$ remains constant so long as the mean number of dark matter particles per orbital remains constant, as expected for non-interacting dark matter. The issue of possible phase-space dilution due to galaxy structure formation appears to be secondary, since measurements of $v_{h\text{rms}}\left(1\right)$ in 10 galaxies of the THINGS sample [2], and 46 different galaxies in the SPARC sample [3], obtain results consistent within statistical and systematic uncertainties [4] [5]. We therefore interpret $v_{h\text{rms}}\left(1\right)$ to be of cosmological origin: it determines the ratio of dark matter temperature $T\left(a\right)$ to mass $m_h$ in the early universe. Note that dark matter becomes non-relativistic at expansion parameter $a\approx {a^{\prime }}_{h\text{NR}}\equiv v_{h\text{rms}}\left(1\right)/c$.

To obtain $T\left(a\right)$ and $m_h$ separately, we need one more constraint, e.g. the chemical potential $\mu$ of dark matter. It turns out that the measured value of $v_{h\text{rms}}\left(1\right)$ corresponds to thermal equilibrium between dark matter and the standard model sector in the early universe if $\mu =0$. This result is either a coincidence, or strong evidence that the chemical potential of dark matter has the very special value $\mu =0$.

Thus we arrive at the following scenario: in the early universe dark matter is in diffusive and thermal equilibrium with the standard model sector, and decouples (from the standard model sector, and from self annihilation) while still ultra-relativistic. In particular, we assume that dark matter has zero chemical potential $\mu$. This no freeze-in and no freeze-out scenario is the result of measurements presented in [4] [5] [6] [7] [8]. A convenient overview of these studies, and a discussion of the (apparent?) disagreements with current limits, are presented in [9].

In the no freeze-in and no freeze-out scenario, the ultra-relativistic dark matter is in ultra-relativistic thermal equilibrium (URTE), either Fermi-Dirac, or Bose-Einstein. As the universe expands and cools, dark matter becomes non-relativistic. The momentum distribution of the non-relativistic dark matter particles approaches non-relativistic thermal equilibrium (NRTE) due to dark matter-dark matter elastic interactions [10]. If these interactions are sufficiently strong, dark matter acquires the NRTE distribution, either Fermi-Dirac or Bose-Einstein. If, however, the dominant dark matter-dark matter interaction is gravity, then the time constant to approach NRTE is much greater than the age of the universe, and non-relativistic dark matter retains the URTE distribution. Summaries of NRTE and URTE are presented in Appendix A and Appendix B, respectively.

The purpose of the present study is to try to discriminate between these four alternatives for non-relativistic dark matter with zero chemical potential: fermions with URTE, bosons with URTE, fermions with NRTE, or bosons with NRTE. We investigate the following observables: spiral galaxy rotation curves, and galaxy stellar mass distributions at large redshift z, and compare the results with the expectations of the no freeze-in and no freeze-out assumption.

In the following sections we study the dark matter equation of state, spiral galaxy rotation curves, dark matter free-streaming, the no freeze-in and no freeze-out scenario, and galaxy stellar mass distributions, and, finally, present the conclusions.

2. Dark Matter Equation of State

We analyze rotation curves of galaxies in the Spitzer Photometry and Accurate Rotation Curves (SPARC) catalog [3]. An example is presented in Figure 1. Let $v_{\text{tot}}\left(r\right)\equiv v\left(r\right)$ be the velocity of a test particle in a circular orbit of radius $r$ in the plane of the galaxy. $v\left(r\right)$ has contributions $v_b\left(r\right)$ from baryons, and $v_h\left(r\right)$ from dark matter:

$v{\left(r\right)}^2=v_b{\left(r\right)}^2+v_h{\left(r\right)}^2,$ (2)

$v_b=\sqrt{\left|v_{\text{gas}}\right|v_{\text{gas}}+{\Upsilon }_{\text{disk}}\left|V_{\text{disk}}\right|V_{\text{disk}}+{\Upsilon }_{\text{bulge}}\left|V_{\text{bulge}}\right|V_{\text{bulge}}}\mathrm{.}$ (3)

$V_{\text{disk}}$ and $V_{\text{bulge}}$ are stellar contributions to the rotation velocity inferred from the 3.6 μm SPARC photometry [3], assuming a stellar mass-to-light ratio $1M_{\odot }/L_{\odot }$. The mass-to-light ratios of stars in the disk and bulge, in units of $M_{\odot }/L_{\odot }$, are taken to be ${\Upsilon }_{\text{disk}}\equiv {\Upsilon }_{\mathrm{<mo>\; *\; </mo>}}$ and ${\Upsilon }_{\text{bulge}}=1.4{\Upsilon }_{\mathrm{<mo>\; *\; </mo>}}$ respectively [3]. Estimates of ${\Upsilon }_{\mathrm{<mo>\; *\; </mo>}}$ range from 0.5 to 0.2, see the discussion in Reference [3]. We take the stellar mass-to-light ratio equal to its fitted average ${\Upsilon }_{*}=0.32$ [5], except for galaxies F574-1 and UGC11914 for which we take ${\Upsilon }_{*}=0.2$ as in [5].

Two differential equations of interest to dark matter are Newton’s equation for gravity, and the equation of conservation of the radial component of the momentum of the dark matter particles [4]:

$\frac{1}{r^2}\frac{\text{d}\left(r^2{g}_h\right)}{\text{d}r}=4\pi G{\rho }_h，$ (4)

$\frac{\text{d}{P}_h}{\text{d}r}=-{\rho }_{h}g\left(1-{\kappa }_h\right)\mathrm{.}$ (5)

$g=v^2/r=g_h+g_b$ is the gravitation field, and ${\kappa }_h$ is a correction due to dark matter rotation. The definition of pressure $P_h$, for collisional or collision-less dark matter, is presented at the end of Appendix B. We take ${\kappa }_h={0.15}_{-0.15}^{+0.35}$ [4].

From $g_{hi}$ at every measured radii $r_i$, and the difference equation corresponding to (4), we obtain ${\rho }_{hi}$ at some point in each interval $r_i<r<r_{i+1}$. From the difference equation corresponding to (5), starting at $r_{\max }$, we obtain the accumulated pressure $P_{hi}$ down to radii $r_i$. The root-mean-square of the radial component of the velocities of dark matter particles, $v_{rh\text{rms}}\left(r_i\right)={\left[2P_{hi}/\left({\rho }_{hi}+{\rho }_{h\left(i-1\right)}\right)\right]}^{1/2}$, is plotted in Figure 2 for galaxy F574-1.

In the case of thermal equilibrium, either URTE or NRTE, the equation of state of dark matter has the form $P_h\left(r\right)/{\rho }_h\left(r\right)=f\left(T_h\mathrm{,}\mu \left(r\right)\right)$, see Appendix A and Appendix B. $T_h$ is the dark matter temperature, and $\mu \left(r\right)$ is the dark matter chemical potential. $f\left(T_h\mathrm{,}\mu \left(r\right)\right)=v_{rh\text{rms}}^2\left(r\right)=v_{h\text{rms}}^2\left(r\right)/3$, where $v_{h\text{rms}}^2\left(r\right)$ is the mean velocity squared of the dark matter particles (see Appendix B). Excellent fits to galaxy rotation curves are obtained assuming thermal equilibrium [4] [5]. In thermal equilibrium, $T_h$ is a constant independent of $r$, while $\mu \left(r\right)$ becomes more negative with increasing $r$ due to the gravitational field.

We define ${\mu }^{\prime }\equiv \mu /\left(k{T}_h\right)$. For ${\mu }^{\prime }\ll 0$, $f\left(T_h\mathrm{,}\mu \left(r\right)\right)$ becomes independent of $r$. For ${\mu }^{\prime }\left(0\right)=0$ in the core of the galaxy, $f\left(T_h\mathrm{,}\mu \left(r\right)\right)$ increases (decreases) at the first two or three measured $r_i$ for fermions (bosons), see Figure 2. To distinguish fermion from boson dark matter, we hope to measure this increase or decrease of $v_{rh\text{rms}}\left(r_i\right)$. However, as seen in Figure 2 and Figure 3, $v_{rh\text{rms}}$ is consistent with being a constant, with large uncertainties that prevent us from distinguishing fermions from bosons by this direct method.

3. Fits to Spiral Galaxy Rotation Curves

To gain sensitivity, we integrate numerically (4) and (5), and two similar equations for baryons [4], starting at $r_{\min }$. To start these integrations we need four boundary conditions. We also require the equation of state of dark matter to obtain ${\rho }_h$ given $P_h$ (see Appendix A and Appendix B). In References [4] [5] we use these boundary conditions: ${\rho }_h\left(r_{\min }\right)$, $v_{rh\text{rms}}\left(r_{\min }\right)$, ${\rho }_b\left(r_{\min }\right)$, and $v_{rb\text{rms}}\left(r_{\min }\right)$. We vary these four parameters to minimize the ${\chi }^2$ between the measured and calculated rotation curves. The mass $m_h$ of the dark matter particles is kept fixed in these fits.

In the present analysis we use the following equivalent set of four boundary conditions: ${a^{\prime }}_{h\text{NR}}\left(r_{\min }\right)$, $\mathbb{V}\equiv \sqrt{3k{T}_h/\left(m_h{c}^2\right)}$, ${\rho }_b\left(r_{\min }\right)$, and $v_{rb\text{rms}}\left(r_{\min }\right)$. We are therefore able to keep ${\mu }^{\prime }\left(r_{\min }\right)=0$ fixed in the fits (for bosons we need to avoid the singularity at $r_{\min }$, so we start the integration with ${\mu }^{\prime }\left(r_{\min }\right)=-0.1$, −0.01, −0.001, or −0.0001). Furthermore, fitting ${a^{\prime }}_{h\text{NR}}\left(r_{\min }\right)$, and calculating ${a^{\prime }}_{h\text{NR}}\left(r\right)$, we are able to extrapolate to $r\to 0$ and obtain ${a^{\prime }}_{h\text{NR}}$ in the core of the galaxy. In the present analysis, we free the first measured rotation velocity $v\left(r_{\min }\right)$. The parameters ${a^{\prime }}_{h\text{NR}}\left(r_{\min }\right)$, $\mathbb{V}$, ${\rho }_b\left(r_{\min }\right)$, $v_{rb\text{rms}}\left(r_{\min }\right)$, and $v\left(r_{\min }\right)$ are varied to minimize the ${\chi }^2$.

Fits for galaxy F574-1 are presented in Table 1, and Figure 1, Figure 2, and Figure 4. The ${\chi }^2$ of the fits, as a function of ${\mu }^{\prime }$, are presented in Figure 5. Note, in Figure 5, that the fits for ${\mu }^{\prime }\equiv {\mu }^{\prime }\left(r\to 0\right)=0$ favor bosons over fermions, but the difference in ${\chi }^2$ is not statistically significant. Note also that the ${\chi }^2$ increases for fermions as ${\mu }^{\prime }\left(r_{\min }\right)$ is raised above zero, so we obtain the following lower bound to the mass of dark matter particles if fermions: 48 eV at 3σ (or 99.7%) confidence, similarly to what we obtained in [4]. For bosons the lower bounds are the actual measurements summarized in Table 4. Finally, note in Figure 5 that the four dark matter scenarios studied in this article are extreme and well motivated cases of interest.

A summary of fits to the rotation curves of several galaxies, selected for their very well measured $v_{\text{flat}}$ and core, and reaching deep into the core, are presented in Table 2. The quality of these fits justifies the assumption of thermal equilibrium. For fermions with URTE we plot the distribution of the measured ${a^{\prime }}_{h\text{NR}}$ in Figure 6. These ${a^{\prime }}_{h\text{NR}}$ are consistent with each other, within statistical and systematic uncertainties, as shown in Table 3. The mass $m_h$ of dark matter particles is a function of ${a^{\prime }}_{h\text{NR}}$ and ${\mu }^{\prime }$, see Appendix A and Appendix B. Therefore, if ${a^{\prime }}_{h\text{NR}}$ is equal in the core of relaxed steady state galaxies, we might expect that ${\mu }^{\prime }$ is also equal in these galaxies, and hence is also of cosmological origin. If we set ${\mu }^{\prime }=0$, each galaxy allows an independent measurement of $m_h$. The distribution of $m_h$ for fermions with URTE is shown in Figure 7. The consistency of these measurements is evidence that ${\mu }^{\prime }$ is indeed equal (within uncertainties) for all studied galaxies.

Let us consider the systematic uncertainties in Table 3. Galaxies DDO161 and UGC11914 have ${\rho }_h\left(0\right)\approx {\rho }_b\left(0\right)$ in the core, so the systematic uncertainties due to the uncertainty of the mass/luminosity ratio ${\Upsilon }_{\mathrm{<mo>\; *\; </mo>}}$, is large. Galaxies F568-1, F574-1, UGC0024, and UGC12632 have ${\rho }_h\left(0\right)>4{\rho }_b\left(0\right)$ [5], so the dominant systematic uncertainty is due to the unknown dark matter rotation parameter $k_h$. In addition to the known systematic uncertainties listed in Table 3, there are unknown systematic uncertainties including non-steady state galaxies, extraneous features of the rotation curves, phase space dilution, and systematic uncertainties of the observations. A summary of results for all galaxies listed in Table 2 is presented in rows “Spiral galaxies” of Table 4. In view of our incomplete understanding of systematic uncertainties, we assign the standard deviation of the distributions in Table 2 as the total uncertainties in rows “Spiral galaxies” in Table 4.

Let us examine the ${\chi }^2$ ’s in Table 2. There is generally a preference for boson dark matter over fermion dark matter, but the difference $\Delta {\chi }^2$ is not statistically significant for individual galaxies, except for UGC11914, see Figure 8. However, the core of UGC11914 is not dominated by dark matter, so the results from this galaxy need to be taken with caution. In Table 2 we have marked the galaxies with dark matter dominating the core, i.e. ${\rho }_h\left(r_{\min }\right)>4{\rho }_b\left(r_{\min }\right)$ [5], and for these galaxies we have presented the sums of ${\chi }^2$ in the last row. We note that ${\displaystyle \sum }\Delta {\chi }^2=8.8$ for URTE, and ${\displaystyle \sum }\Delta {\chi }^2=11.5$ for NRTE. Thus, we have a 3.0σ or 3.4σ preference for bosons over fermions. We note, in Table 2, that the standard deviation of ${a^{\prime }}_{h\text{NR}}$ is smaller for galaxies with dark matter dominating the core.

Note, in Table 4, that we have measured dark matter particle masses of order 100 eV (with (15), (17), (23), or (25)). For fermion dark matter, these measurements are in disagreement with limits obtained from dwarf spheroidal (dSph) “satellites” of the Milky Way, assuming that they are dominated by dark matter, i.e. $m_h>410\text{eV}$ from the Pauli exclusion principle, and even more stringent limits with additional assumptions, e.g. the Tremaine-Gunn limit [11]. However, recent studies suggest that dwarf spheroidals are not satellites of the Milky Way, they are on their first entry to the Galaxy, and contain negligible amounts of dark matter [12] [13] [14] [15] ! This disagreement needs to be resolved if dark matter is composed of fermions. For bosons, there is no issue.

We have made several measurements of ${a^{\prime }}_{h\text{NR}}$ : ${a^{\prime }}_{h\text{NR}}=\left(4.17\pm 2.52\right)\times {10}^{-6}$ with ten galaxies in the THINGS sample [2] [4], and ${a^{\prime }}_{h\text{NR}}=\left(2.54\pm 0.97\right)\times {10}^{-6}$ with fourty six different galaxies in the SPARC sample [3] [5], to be compared with the measurements in Table 2.

4. Free-Streaming

Free-streaming is important at expansion parameters of order ${a^{\prime }}_{h\text{NR}}$, long after dark matter has decoupled, see Section 5. We therefore consider collision-less dark matter with zero chemical potential. A density perturbation corresponds to a temperature fluctuation, i.e. to a change in the momentum distribution of the particles, see Appendix A and Appendix B. The comoving free-streaming distance of a dark matter particle of momentum $p=p_1/a$ is

$\begin{array}{c}{d}_{\text{fs}}\left(p_1\right)={\displaystyle {\int }_0}\frac{v_h\left(a\right)\cdot \text{d}t}{a}={\displaystyle {\int }_0}\frac{c}{\sqrt{1+{\left(a/\left[p_1/\left(m_{h}c\right)\right]\right)}^2}}\frac{\text{d}t}{a}\mathrm{,}\\ ={\displaystyle {\int }_0^{\text{dec}}\frac{c\cdot \text{d}a}{\sqrt{1+{\left(a/\left[p_1/\left(m_{h}c\right)\right]\right)}^2}{H}_0{a}^2\sqrt{{\Omega }_r{a}^{-4}+{\Omega }_m{a}^{-3}}}}\mathrm{.}\end{array}$ (6)

(We arbitrarily stop the integral at decoupling as further contributions are of order 5%.) Let $P\left(k\right)$ be the power spectrum of linear density perturbations in the cold dark matter ΛCDM model. $k$ is the comoving wavenumber. The power spectrum for warm dark matter is $P\left(k\right){\tau }^2\left(k/k_{\text{fs}}\right)$, where ${\tau }^2\left(k/k_{\text{fs}}\right)$ is a cut-off factor.

Let ${\delta }_h\left(x\right)\equiv \left[\rho \left(x\right)-\bar{\rho }\right]/\bar{\rho }$ be the normalized dark matter density perturbation, and $a_h\left(k\right)$ its Fourier transform. We partition ${\delta }_h\left(x\right)$ into parts that free-stream into different elements of solid angle $\text{d}\Omega$. Due to free-streaming of dark matter, the corresponding part of $a_h\left(k\right)$ becomes multiplied by $exp\left[ikcos\theta d_{\text{fs}}\left(p_1\right)\right]$, where $\theta$ is the angle between $k$ and $d_{\text{fs}}\left(p_1\right)$. This factor needs to be averaged over $\Omega$, and over the comoving momentum $p_1$ from 0 to $\infty$. The average of the imaginary part is zero, so we need only average $cos\left(kcos\theta d_{\text{fs}}\left(p_1\right)\right)$. The average of this term over $\Omega$ obtains $sin\left[k{d}_{\text{fs}}\left(p_1\right)\right]/\left[k{d}_{\text{fs}}\left(p_1\right)\right]$. We take the $p_1$ average only over the perturbation of the momentum distribution of the dark matter particles (as other free-streaming cancels by detailed balance). The results are presented in Figure 9. This figure has ${\mu }^{\prime }=0$ for fermions. ${\mu }^{\prime }=0$ is singular for bosons, so for this figure we take ${\mu }^{\prime }=-0.01$. For fermions with URTE or NRTE, the cut-off factor ${\tau }^2\left(k/k_{\text{fs}}\right)$ is well approximated by

${\tau }^2\left(k/k_{\text{fs}}\right)=exp\left(-k^2/k_{\text{fs}}^2\right)\mathrm{.}$ (7)

We use ${\tau }^2\left(1\right)\equiv {\text{e}}^{-1}$ as our definition of the free-streaming cut-off wavenumber $k_{\text{fs}}$. This precise definition supersedes the qualitative definition of the cut-off wavenumber in previous publications [7]. Equation (7) is consistent with the definition of $k_{\text{fs}}$ used in Figures 10-15 [8]. For bosons with URTE or NRTE, there is a tail at large $k$ due to the excess of low momentum dark matter particles in the limit ${\mu }^{\prime }\to -0$. This tail depends on ${\mu }^{\prime }$, and may have cosmological consequences.

The approximation ${\tau }^2\left(k/k_{\text{fs}}\right)\approx exp\left(-k^2/k_{\text{fs}}^2\right)$ is convenient: it allows the definition of the “free-streaming transition mass”

$M_{\text{fs}}=\frac{4}{3}\pi {\left(\frac{1.555}{k_{\text{fs}}}\right)}^3{\Omega }_m{\rho }_{\text{crit}}\mathrm{.}$ (8)

The factor 1.555 comes from the Fourier transform of a 3-dimensional Gaussian. Free-streaming affects the distribution of halo masses with $M<M_{\text{fs}}$. The cut-off wavenumbers $k_{\text{fs}}$, and the free-streaming masses $M_{\text{fs}}$, corresponding to the measured values of ${a^{\prime }}_{h\text{NR}}$, are summarized in Table 4. We verify that perturbations with $k<k_{\text{fs}}$ grow due to gravitational instability, i.e. $k_{\text{fs}}<k_J$, where $k_J$ is the Jeans wavenumber for collision-less dark matter [9] [16]. Note that for $k\approx k_{\text{fs}}$ it is the slower particles that survive free-streaming.

5. No Freeze-In and No Freeze-Out

We assume that dark matter is in thermal and diffusive equilibrium with the standard model sector in the early universe, and decouples (from the standard model sector, and from self-annihilation) while still ultra-relativistic. As the universe expands and cools, standard model particles and anti-particles become non-relativistic and annihilate, heating the standard model sector, without heating dark matter if it has already decoupled. Let $T_h/T$ be the ratio of the dark matter-to-photon temperatures after e⁺e⁻ annihilation (and, in the case NRTE, before dark matter becomes non-relativistic). If dark matter decouples at temperatures $T>m_t$, then $T_h/T={\left[8\times 43/\left(427\times 22\right)\right]}^{1/3}=0.332$. If dark matter decouples in the temperature range $T_C<T<m_s$, then $T_h/T={\left[8\times 43/\left(205\times 22\right)\right]}^{1/3}=0.424$. These numbers can be found in Section 22.3.2 of [1]. $T_C\approx 0.2\text{GeV}$ corresponds to the confinement-deconfinement transition. If dark matter decouples at temperatures $T<T_C$ there is disagreement with Big Bang Nucleosynthesis (BBN). Thus, we have the hard limits $0.332\le T_h/T\le 0.424$. With the expressions in Appendix A and Appendix B, and the calculations of free-streaming, we fill the rows “No freeze-in/-out” in Table 4.

From Table 4 we conclude that all four extreme scenarios studied in this article, namely, fermions with URTE, bosons with URTE, fermions with NRTE, and bosons with NRTE, with ${\mu }^{\prime }=0$, and with $N_f=2$ or $N_b=1$, are consistent with thermal equilibrium of dark matter with the standard model sector in the early universe. This consistency is non-trivial as it depends on the measurement of ${a^{\prime }}_{h\text{NR}}$ with each of 56 spiral galaxies [4] [5] [6], and the measurement of the cosmic microwave background temperature $T_0$.

6. Galaxy Stellar Mass Distributions

Figures 10-13 compare galaxy stellar mass distribution predictions with observations. These figures were taken from Reference [8] with several changes: 1) In [8] all theoretical curves plot $\left(1/V\right)\text{d}n/\text{d}ln\left(M/M_{\odot }\right)$ : I missed a factor $ln\left(10\right)$ to convert to $\left(1/V\right)\text{d}n/\text{d}{\log }_{10}\left(M/M_{\odot }\right)$ ! This error has now been corrected. 2) The cold and warm dark matter models coincide for halo masses $M>M_{\text{fs}}$, and differ for $M<M_{\text{fs}}$. Therefore, to measure the cut-off wavenumber $k_{\text{fs}}$, we first adjust the relation between the halo mass M and the stellar mass $M_s$ to obtain agreement for $M>M_{\text{fs}}$, and obtain $lo{g}_{10}\left(M_s/M\right)=-1.5$, consistent with Figure 9 of Reference [20]. 3) We apply the cut-off factor (7) without the “tail”, and 4) Update the cosmological parameters to [1]. From Figures 10-13, and the Sheth-Tormen ellipsoidal collapse prediction with $\tilde{\nu }=0.84\nu$ [18] [19], we obtain $k_{\text{fs}}={0.90}_{-0.34}^{+0.44}{\text{Mpc}}^{-1}$ as in Reference [8]. For completeness, we include Figure 14 for $z=3$, but do not use it because the mass fraction locked up in halos of mass greater than M, $F\left(M\mathrm{,}z\right)$, exceeds 0.01 at $M={10}^9{M}_{\odot }$, and saturation sets in.

We repeat Figure 13 with the cut-off factor with a “tail” that corresponds to bosons with ${\mu }^{\prime }\approx -0.01$ :

${\tau }^2\left(k/k_{\text{fs}}\right)=\{\begin{array}{l}exp\left(-k^2/k_{\text{fs}}^2\right)\text{for}k<k_{\text{fs}}\mathrm{,}\\ exp\left(-k/k_{\text{fs}}\right)\text{for}k>k_{\text{fs}}\mathrm{,}\end{array}$ (9)

and obtain Figure 15. Since bosons may have ${\tau }^2\left(k/k_{\text{fs}}\right)$ with a “tail”, we estimate $k_{\text{fs}}={0.90}_{-0.40}^{+0.44}{\text{Mpc}}^{-1}$ for bosons.

These results for $k_{\text{fs}}$ are in disagreement with studies of the Lyman-α forest. The Lyman-α forest allows measurements of the neutral hydrogen density profile along the line of sight to far away quasars (at redshifts $z\approx 5.5$ ). From the analysis of these density profiles, with model dependent simulations of the inter-galactic medium (including the highly ionized hydrogen), the cut-off wavenumber $k_{\text{fs}}$ is excluded in the range from ≈0.4 Mpc⁻¹ to ≈27 Mpc⁻¹ [24]. So, these two analysis, based on very different data sets, are in tension. For boson dark matter, the long free-streaming “tail” mitigates the tension. This discrepancy needs to be resolved.

7. Conclusions

From this and previous [4] - [9] studies we arrive at the following conclusions:

1) Each spiral galaxy allows a measurement of the adiabatic invariant ${a^{\prime }}_{h\text{NR}}\equiv v_{h\text{rms}}\left(1\right)/c$. We find that ${a^{\prime }}_{h\text{NR}}$ has the same value in the core of all measured relaxed steady state spiral galaxies (within statistical and systematic uncertainties). Therefore, we interpret ${a^{\prime }}_{h\text{NR}}$ to be of cosmological origin: it is the expansion parameter at which dark matter particles become non-relativistic. ${a^{\prime }}_{h\text{NR}}$ determines the ratio of dark matter temperature to mass $T_h\left(a\right)/m_h$ in the early universe. To obtain $T_h\left(a\right)$ and $m_h$ separately, we need one more constraint, i.e. the value of ${\mu }^{\prime }\equiv \mu /\left(k{T}_h\right)$, where $\mu$ is the chemical potential.

2) The present dark matter density of the universe ${\Omega }_c{\rho }_{\text{crit}}$ determines the dark matter particle mass $m_h$ as a function of ${a^{\prime }}_{h\text{NR}}$ and ${\mu }^{\prime }$, see Appendix A and Appendix B. Therefore, if ${a^{\prime }}_{h\text{NR}}$ has the same value in the core of all relaxed steady state spiral galaxies, we can expect the same for ${\mu }^{\prime }$, so ${\mu }^{\prime }$ may be of cosmological origin.

3) The measured value of $v_{h\text{rms}}\left(1\right)$ corresponds to thermal equilibrium of dark matter with the standard model sector in the early universe, with no freeze-in and no freeze-out, if ${\mu }^{\prime }=0$ (see Section 5, and (16), (18), (24), and (26)). Thus, we have obtained either a coincidence, or strong evidence that ${\mu }^{\prime }=0$. Therefore, we assume ${\mu }^{\prime }=0$, and arrive at the four dark matter scenarios studied in this article.

4) With ${\mu }^{\prime }=0$, each spiral galaxy allows an independent measurement of the dark particle mass $m_h$. The results are consistent within uncertainties.

5) The dark particle masses listed in Table 4 were obtained from data, without reference to any particular extension of the standard model. These measurements are in tension with some limits. A comment on the Tremaine-Gunn limit is made in Section 3, and a comment on the Lyman-α forest limit is included in Section 6. Comments on limits from strong gravitational lensing, and from the UV luminosity function are addressed in [9]. These tensions need to be resolved. Nature will have the last word.

6) From the measured values of ${a^{\prime }}_{h\text{NR}}$, and ${\mu }^{\prime }=0$, we calculate the warm dark matter cut-off wavenumbers $k_{\text{fs}}$ due to free-streaming, see Table 4.

7) Galaxy stellar mass distributions, presented in Figures 10-15, show convincing evidence that dark matter is warm with a cut-off wavenumber $k_{\text{fs}}={0.90}_{-0.34}^{+0.44}$ for fermions, or $k_{\text{fs}}={0.90}_{-0.40}^{+0.44}$ for bosons (the difference is due to the excess of low momentum bosons expected for ${\mu }^{\prime }\to -0$, which produces a “tail” in the cut-off factor ${\tau }^2\left(k/k_{\text{fs}}\right)$, see Figure 9).

8) Fits to spiral galaxy rotation curves generally favor boson dark matter, typically as shown in Figure 1 and Figure 5, but the difference in ${\chi }^2$ for individual galaxies is not statistically significant, see Table 2. An exception is galaxy UGC11914 (see Figure 8), but this case needs to be taken with caution because the core of UGC11914 is not dominated by dark matter. Among the galaxies with the core dominated by dark matter, the one with the largest ${\chi }^2$ difference between fermions and bosons is NGC0024 with $\Delta {\chi }^2=4$. From the sums of ${\chi }^2$ ’s of galaxies with the core dominated by dark matter, we obtain ${\displaystyle \sum }\Delta {\chi }^2=8.8$ for URTE, and 11.5 for NRTE, corresponding to a discrimination of 3.0σ or 3.4σ, see Table 2.

9) From Table 4 we observe that fits to spiral galaxy rotation curves obtain agreement with the assumption of no freeze-in and no freeze-out, for each of the four scenarios with ${\mu }^{\prime }=0$ studied in this article.

10) In Table 4 we see that the cut-off wavenumber $k_{\text{fs}}$, measured with the galaxy stellar mass distributions, is in some tension with fermion dark matter. In fact, from Figures 10-15 it is difficult to see how $k_{\text{fs}}$ can reach 0.38 or 0.26 Mpc⁻¹ as required by fermions, see Table 4.

11) To summarize, among the four well motivated dark matter scenarios studied in this article, measurements show evidence for boson dark matter with a significance of 3.5σ, see Table 2 and Table 4, and obtain no significant discrimination between URTE and NRTE.

Appendix A: Non-Relativistic Dark Matter in Non-Relativistic Thermal Equilibrium (NRTE)

In this Section we consider non-relativistic dark matter in thermal equilibrium with the non-relativistic Fermi-Dirac or Bose-Einstein distributions:

$\langle n\left(p\mathrm{,}{T}_h\right)\rangle =\frac{1}{exp\left[p^2/\left(2m_{h}k{T}_h\right)-{\mu }^{\prime }\right]\pm 1}.$ (10)

We define

$\mathbb{V}\equiv \sqrt{\frac{3k{T}_h}{m_h{c}^2}}\mathrm{,}{\mu }^{\prime }\equiv \frac{\mu }{k{T}_h}\mathrm{.}$ (11)

Note that $\mathbb{V}$ is proportional to $a^{-1}$, and is independent of the galaxy dark matter halo radial coordinate $r$. Note that ${\mu }^{\prime }$ is independent of $a$, but depends on $r$ (it becomes more negative with increasing $r$ ). We define

${\Sigma }_{\text{f}\mathrm{,}\text{b}}\equiv \frac{4}{{\pi }^{1/2}}{\displaystyle {\int }_0^{\infty }}\frac{y^2\text{d}y}{exp\left[y^2-{\mu }^{\prime }\right]\pm 1}\mathrm{,}{B}_{\text{f}\mathrm{,}\text{b}}\equiv {\displaystyle {\int }_0^{\infty }}\frac{y^4\text{d}y}{exp\left[y^2-{\mu }^{\prime }\right]\pm 1}\mathrm{.}$ (12)

Then, the density, mean-square velocity, and pressure are

${\rho }_h=\frac{N_{\text{f}\mathrm{,}\text{b}}{m}_h^{5/2}{\left(k{T}_h\right)}^{3/2}{\Sigma }_{\text{f}\mathrm{,}\text{b}}}{2^{3/2}{\pi }^{3/2}{\hslash }^3}\mathrm{,}{v}_{h\text{rms}}^2=\frac{8k{T}_h{B}_{\text{f}\mathrm{,}\text{b}}}{{\pi }^{1/2}{m}_h{\Sigma }_{\text{f}\mathrm{,}\text{b}}}\mathrm{,}{P}_h=\frac{{\rho }_h{v}_{h\text{rms}}^2}{3}\mathrm{.}$ (13)

From these equations, applied to a homogeneous universe at the present time, we obtain

$m_h={\left[\frac{64{\pi }^{3/4}{\Omega }_c{\rho }_{\text{crit}}{\hslash }^3{B}_{\text{f}\mathrm{,}\text{b}}^{3/2}}{v_{h\text{rms}}{\left(1\right)}^3{N}_{\text{f}\mathrm{,}\text{b}}{\Sigma }_{\text{f}\mathrm{,}\text{b}}^{5/2}}\right]}^{1/4}\mathrm{.}$ (14)

For fermions with ${\mu }^{\prime }=0$,

$m_h=78.8{\left(\frac{0.76\text{km}/\text{s}}{v_{h\text{rms}}\left(1\right)}\right)}^{3/4}{\left(\frac{2}{N_f}\right)}^{1/4}\text{eV}\mathrm{,}$ (15)

$\frac{T_h}{T}=0.392{\left(\frac{v_{h\text{rms}}\left(1\right)}{0.76\text{km}/\text{s}}\right)}^{1/4}{\left(\frac{2}{N_f}\right)}^{1/4}\mathrm{,}$ (16)

where $T_h/T$ is the dark matter-to-photon temperature ratio after e⁺e⁻ annihilation, and before dark matter becomes non-relativistic. For bosons with ${\mu }^{\prime }=-0.001$,

$m_h=51.2{\left(\frac{0.76\text{km}/\text{s}}{v_{h\text{rms}}\left(1\right)}\right)}^{3/4}{\left(\frac{1}{N_b}\right)}^{1/4}\text{eV}\mathrm{,}$ (17)

$\frac{T_h}{T}=0.511{\left(\frac{v_{h\text{rms}}\left(1\right)}{0.76\text{km}/\text{s}}\right)}^{1/4}{\left(\frac{1}{N_b}\right)}^{1/4}\mathrm{.}$ (18)

Appendix B: Non-Relativistic Dark Matter Retaining the Ultra-Relativistic Momentum Distribution (URTE)

In this Section we consider non-relativistic dark matter in thermal equilibrium with the ultra-relativistic Fermi-Dirac or Bose-Einstein distributions:

$\langle n\left(p\mathrm{,}{T}_h\right)\rangle =\frac{1}{exp\left[pc/\left(k{T}_h\right)-{\mu }^{\prime }\right]\pm 1}.$ (19)

Consider dark matter that is in thermal equilibrium with the standard model sector in the early universe, and decouples (from the standard model sector and from self interactions) while still ultra-relativistic. In this case, the number of dark matter particles per orbital remains unchanged during the transition to a non-relativistic gas. In this Appendix we assume that the dark matter-dark matter elastic interaction cross-section is sufficiently small that dark matter does not reach NRTE in the age of the universe. We define

$A_{\text{f}\mathrm{,}\text{b}}\equiv \frac{1}{2{\pi }^2}{\displaystyle {\int }_0^{\infty }}\frac{x^2\text{d}x}{exp\left[x-{\mu }^{\prime }\right]\pm 1}\mathrm{,}{C}_{\text{f}\mathrm{,}\text{b}}\equiv {\displaystyle {\int }_0^{\infty }}\frac{x^4\text{d}x}{exp\left[x-{\mu }^{\prime }\right]\pm 1}\mathrm{.}$ (20)

Then, the density, mean-square velocity, and pressure of the non-relativistic gas with the momentum distribution corresponding to ultra-relativistic thermal equilibrium (URTE), are

${\rho }_h=m_h{N}_{\text{f}\mathrm{,}\text{b}}{A}_{\text{f}\mathrm{,}\text{b}}{\left(\frac{k{T}_h}{\hslash c}\right)}^3\mathrm{,}{v}_{h\text{rms}}^2=\frac{C_{\text{f}\mathrm{,}\text{b}}}{2{\pi }^2{A}_{\text{f}\mathrm{,}\text{b}}}{\left(\frac{k{T}_h}{m_{h}c}\right)}^2\mathrm{,}{P}_h=\frac{\rho v_{h\text{rms}}^2}{3}\mathrm{.}$ (21)

Note that $T_h\propto 1/a$, ${\rho }_h\propto 1/a^3$, $v_{h\text{rms}}\propto 1/a$, and $P_h\propto 1/a^5$. From these equations, applied to a homogeneous universe at the present time, we obtain

$m_h={\left[\frac{{\Omega }_c{\rho }_{\text{crit}}{\hslash }^3{C}_{\text{f}\mathrm{,}\text{b}}^{3/2}}{2^{3/2}{\pi }^3{v}_{h\text{rms}}{\left(1\right)}^3{N}_{\text{f}\mathrm{,}\text{b}}{A}_{\text{f}\mathrm{,}\text{b}}^{5/2}}\right]}^{1/4}\mathrm{.}$ (22)

For fermions with ${\mu }^{\prime }=0$,

$m_h=111{\left(\frac{0.76\text{km}/\text{s}}{v_{h\text{rms}}\left(1\right)}\right)}^{3/4}{\left(\frac{2}{N_f}\right)}^{1/4}\text{eV}\mathrm{,}$ (23)

$\frac{T_h}{T}=0.333{\left(\frac{v_{h\text{rms}}\left(1\right)}{0.76\text{km}/\text{s}}\right)}^{1/4}{\left(\frac{2}{N_f}\right)}^{1/4}\mathrm{.}$ (24)

For bosons with ${\mu }^{\prime }=-0.001$,

$m_h=113{\left(\frac{0.76\text{km}/\text{s}}{v_{h\text{rms}}\left(1\right)}\right)}^{3/4}{\left(\frac{1}{N_b}\right)}^{1/4}\text{eV}\mathrm{,}$ (25)

$\frac{T_h}{T}=0.379{\left(\frac{v_{h\text{rms}}\left(1\right)}{0.76\text{km}/\text{s}}\right)}^{1/4}{\left(\frac{1}{N_b}\right)}^{1/4}\mathrm{.}$ (26)

Let us recall [4] that the pressure $P_h$ of the collisional or collision-less gas in Equation (5) is defined in (21) with

$\frac{v_{h\text{rms}}^2}{3}=v_{rh\text{rms}}^2\equiv \langle v_{rh}^2\rangle \equiv \frac{{\displaystyle {\int }_0^{\infty }}{v}_{rh}^{2}f\left(v_{rh}^2\right)\text{d}\left(v_{rh}^2\right)}{{\displaystyle {\int }_0^{\infty }}f\left(v_{rh}^2\right)\text{d}\left(v_{rh}^2\right)}\mathrm{,}$ (27)

where $f\left(v_{rh}^2\right)\text{d}\left(v_{rh}^2\right)$ is proportional to the number of dark matter particles with $v_{rh}^2$ between $v_{rh}^2$ and $v_{rh}^2+\text{d}\left(v_{rh}^2\right)$ with $v_{rh}>0$.

Conflicts of Interest

The author declares no conflicts of interest regarding the publication of this paper.

References