| arXiv:1001.0006v2 [astro-ph.CO] 4 May 2010Draft version November 2, 2018 | |
| Preprint typeset using L ATEX style emulateapj v. 11/10/09 | |
| COMPARISON OF HECTOSPEC VIRIAL MASSES WITH SZE MEASUREMENT S | |
| Kenneth Rines1,2, Margaret J. Geller2, and Antonaldo Diaferio3,4 | |
| Draft version November 2, 2018 | |
| ABSTRACT | |
| We present the first comparison of virial masses of galaxy clusters with their Sunyaev-Zel’dovich | |
| Effect (SZE) signals. We study 15 clusters from the Hectospec Clus ter Survey (HeCS) with | |
| MMT/Hectospec spectroscopy and published SZE signals. We measu re virial masses of these clusters | |
| from an average of 90 member redshifts inside the radius r100. The virial masses of the clusters are | |
| strongly correlated with their SZE signals (at the 99% confidence lev el using a Spearman rank-sum | |
| test). This correlation suggests that YSZcan be used as a measure of virial mass. Simulations predict | |
| a powerlaw scaling of YSZ∝Mα | |
| 200withα≈1.6. Observationally, we find α=1.11±0.16, significantly | |
| shallower (given the formal uncertainty) than the theoretical pr ediction. However, the selection func- | |
| tion of our sample is unknown and a bias against less massive clusters c annot be excluded (such a | |
| selection bias could artificially flatten the slope). Moreover, our sam ple indicates that the relation | |
| between velocity dispersion (or virial mass estimate) and SZE signal has significant intrinsic scatter, | |
| comparable to the range of our current sample. More detailed stud ies of scaling relations are therefore | |
| needed to derive a robust determination of the relation between clu ster mass and SZE. | |
| Subject headings: galaxies: clusters: individual — galaxies: kinematics and dynamics — co smology: | |
| observations | |
| 1.INTRODUCTION | |
| Clusters of galaxies are the most massive virialized | |
| systems in the universe. The normalization and evo- | |
| lution of the cluster mass function is therefore a sen- | |
| sitive probe of the growth of structure and thus cos- | |
| mology (e.g., Rines et al. 2007, 2008; Vikhlinin et al. | |
| 2009; Henry et al. 2009; Mantz et al. 2008; Rozo et al. | |
| 2008, and references therein). Many methods exist | |
| to estimate cluster masses, including dynamical masses | |
| from either galaxies (Zwicky 1937) or intracluster gas | |
| (e.g., Fabricant et al. 1980), gravitational lensing (e.g., | |
| Smith et al.2005;Richard et al.2010), andthe Sunyaev- | |
| Zel’dovich effect (SZE Sunyaev & Zeldovich 1972). In | |
| practice, these estimates are often made using simple | |
| observables, such as velocity dispersion for galaxy dy- | |
| namics or X-ray temperature for the intracluster gas. | |
| If one of these observable properties of clusters has a | |
| well-defined relation to the cluster mass, a large survey | |
| can yield tight constraints on cosmological parameters | |
| (e.g., Majumdar & Mohr 2004). There is thus much | |
| interest in identifying cluster observables that exhibit | |
| tight scaling relations with mass (Kravtsov et al. 2006; | |
| Rozo et al. 2008). Numerical simulations indicate that | |
| X-ray gas observables (Nagai et al. 2007) and SZE sig- | |
| nals (Motl et al. 2005) are both candidates for tight scal- | |
| ing relations. Both methods are beginning to gain ob- | |
| servational support (e.g., Henry et al. 2009; Lopes et al. | |
| 2009; Mantz et al. 2009; Locutus Huang et al. 2009). | |
| Dynamical masses from galaxy velocities are unbiased | |
| kenneth.rines@wwu.edu | |
| 1Department of Physics & Astronomy, Western Washington | |
| University, Bellingham, WA 98225; kenneth.rines@wwu.edu | |
| 2Smithsonian Astrophysical Observatory, 60 Garden St, Cam- | |
| bridge, MA 02138 | |
| 3Universit` a degli Studi di Torino, Dipartimento di Fisica G en- | |
| erale “Amedeo Avogadro”, Torino, Italy | |
| 4Istituto Nazionale di Fisica Nucleare (INFN), Sezione di | |
| Torino, Torino, Italyin numerical simulations (Diaferio 1999; Evrard et al. | |
| 2008), and recent results from hydrodynamical simula- | |
| tions indicate that virial masses may have scatter as | |
| small as ∼5% (Lau et al. 2010). | |
| Previous studies have compared SZE signals to hydro- | |
| staticX-raymasses(Bonamente et al.2008;Plagge et al. | |
| 2010) and gravitational lensing masses (Marrone et al. | |
| 2009, hereafter M09). Here, we make the first compar- | |
| ison between virial masses of galaxy clusters and their | |
| SZE signals. We use SZE measurements from the lit- | |
| erature and newly-measured virial masses of 15 clus- | |
| ters from extensive MMT/Hectospec spectroscopy. This | |
| comparison tests the robustness of the SZE as a proxy | |
| for cluster mass and the physical relationship between | |
| the SZE signal and cluster mass. Large SZ cluster sur- | |
| veys are underway and are beginning to yield cosmologi- | |
| calconstraints(Carlstrom et al.2010;Hincks et al.2010; | |
| Staniszewski et al. 2009). | |
| We assume a cosmology of Ω m=0.3, Ω Λ=0.7, and | |
| H0=70 km s−1Mpc−1for all calculations. | |
| 2.OBSERVATIONS | |
| 2.1.Optical Photometry and Spectroscopy | |
| We are completing the Hectospec Cluster Survey | |
| (HeCS), a study of an X-ray flux-limited sample of 53 | |
| galaxy clusters at moderate redshift with extensive spec- | |
| troscopy from MMT/Hectospec. HeCS includes all clus- | |
| ters with ROSAT X-ray fluxes of fX>5×10−12erg | |
| s−1at [0.5-2.0]keVfrom the Bright Cluster Survey (BCS | |
| Ebeling et al.1998)orREFLEXsurvey(B¨ ohringer et al. | |
| 2004) with optical imaging in the Sixth Data Release | |
| (DR6) of SDSS (Adelman-McCarthy et al. 2008). We | |
| use DR6 photometry to select Hectospec targets. The | |
| HeCS targets are all brighter than r=20.8 (SDSS cata- | |
| logs are 95% complete for point sources to r≈22.2). Out | |
| of the HeCS sample, 15 clusters have published SZ mea- | |
| surements.2 Rines, Geller, & Diaferio | |
| 2.1.1.Spectroscopy: MMT/Hectospec and SDSS | |
| HeCS is a spectroscopic survey of clusters in the red- | |
| shift range 0.10 ≤z≤0.30. We measure spectra with | |
| the Hectospec instrument (Fabricant et al. 2005) on the | |
| MMT 6.5m telescope. Hectospec provides simultaneous | |
| spectroscopy of up to 300 objects across a diameter of | |
| 1◦. This telescope and instrument combination is ideal | |
| for studying the virial regions and outskirts of clusters | |
| at these redshifts. We use the red sequence to preselect | |
| likely cluster members as primary targets, and we fill | |
| fibers with bluer targets (Rines et al. in prep. describes | |
| the details of target selection). We eliminate all targets | |
| withexistingSDSSspectroscopyfromourtargetlistsbut | |
| include these in our final redshift catalogs. | |
| Ofthe15clustersstudiedhere,onewasobservedwitha | |
| single Hectospec pointing and the remaining 14 were ob- | |
| served with two pointings. Using multiple pointings and | |
| incorporatingSDSS redshifts of brighterobjectsmitigate | |
| fiber collision issues. Because the galaxy targets are rel- | |
| atively bright ( r≤20.8), the spectra were obtained with | |
| relativelyshortexposuretimes of3x600sto 4x900sunder | |
| a variety of observing conditions. | |
| Figure 1 shows the redshifts of galaxies versus their | |
| projected clustrocentric radii for the 15 clusters stud- | |
| ied here. The infall patterns are clearly present in all | |
| clusters. We use the caustic technique (Diaferio 1999) | |
| to determine cluster membership. Briefly, the caustic | |
| technique uses a redshift-radius diagram to isolate clus- | |
| ter members in phase space by using an adaptive ker- | |
| nel estimator to smooth out the galaxies in phase space, | |
| and then determining the edges of this distribution (see | |
| Diaferio 2009, for a recent review). This technique has | |
| been successfully applied to optical studies of X-ray clus- | |
| ters, and yields cluster mass estimates in agreement | |
| with estimatesfromX-rayobservationsandgravitational | |
| lensing (e.g., Rines et al. 2003; Biviano & Girardi 2003; | |
| Diaferio et al. 2005; Rines & Diaferio 2006; Rines et al. | |
| 2007, and references therein). | |
| We apply the prescription of Danese et al. (1980) to | |
| determine the mean redshift cz⊙and projected velocity | |
| dispersion σpof each cluster from all galaxies within the | |
| caustics. We calculate σpusing only the cluster members | |
| projected within r100estimated from the caustic mass | |
| profile. | |
| 2.2.SZE Measurements | |
| The SZE detections are primarily from | |
| Bonamente et al. (2008, hereafter B08), supplemented | |
| by three measurements from Marrone et al. (2009, | |
| hereafter M09). Most of the SZ data were obtained with | |
| the OVRO/BIMA arrays; the additional clusters from | |
| M09 were observed with the Sunyaev-Zel’dovich Array | |
| (SZA; e.g., Muchovej et al. 2007). | |
| Numerical simulations indicate that the integrated | |
| Compton y-parameter YSZhas smaller scatter than the | |
| peak y-decrement ypeak(Motl et al. 2005), so B08 and | |
| M09 report only YSZ. Although ypeakshould be nearly | |
| independent of redshift, YSZdepends on the angular size | |
| of the cluster. The quantity YSZD2 | |
| Aremoves this depen- | |
| dence. Thus, we compare our dynamical mass estimates | |
| to this quantity rather than ypeakorYSZ. Table 1 sum- | |
| marizes the SZ data and optical spectroscopy. | |
| It is also critical to determine the radius within whichYSZis determined. B08 use r2500, the radius that en- | |
| closes an average density of 2500 times the critical den- | |
| sity at the cluster’s redshift; r2500has physical values of | |
| 300-700kpc forthe massiveclustersstudied by B08(470- | |
| 670kpcforthesubsamplestudiedhere). M09useaphys- | |
| ical radius of 350 kpc because this radius best matches | |
| their lensing data. | |
| To use both sets of data, we must estimate the con- | |
| version between YSZ(r2500) measured within r2500and | |
| YSZ(r= 350 kpc) measured within the smaller radius | |
| r=350 kpc. There are 8 clusters analyzed in both B08 | |
| and M09 (5 of which are in HeCS). We perform a least- | |
| squaresfit to YSZ(r2500)−YSZ(r= 350kpc) to determine | |
| an approximate aperture correction for the M09 clusters. | |
| We list both quantities in Table 1. | |
| 3.RESULTS | |
| We examine two issues: (1) the strength of the corre- | |
| lation between SZE signal and the dynamical mass and | |
| (2) the slope of the relationship between them. Figure 2 | |
| shows the YSZ−σprelation. Here, we compute σpfor all | |
| galaxies inside both the caustics and the radius r100,cde- | |
| fined by the caustic mass profile [ rδis the radius within | |
| which the enclosed density is δtimes the critical density | |
| ρc(z)]. | |
| Because we make the first comparison of dynami- | |
| cal properties and SZE signals, we first confirm that | |
| these two variables are well correlated. A nonparametric | |
| Spearman rank-sum test (one-tailed) rejects the hypoth- | |
| esis of uncorrelated data at the 98.4% confidence level. | |
| The strong correlation in the data suggests that both σp | |
| andYSZD2 | |
| Aincrease with increasing cluster mass. | |
| Hydrodynamic numerical simulations indicate that | |
| YSZ(integrated to r500) scales with cluster mass as | |
| YSZ∝Mα | |
| 500, whereα=1.60 with radiative cooling and | |
| star formation, and 1.61 for simulations with radiative | |
| cooling, star formation, and AGN feedback ( α=1.70 for | |
| non-radiative simulations, Motl et al. 2005). Combin- | |
| ing this result with the virial scaling relation of dark | |
| matter particles, σp∝M0.336±0.003 | |
| 200 (Evrard et al. 2008), | |
| the expected scaling is YSZ∝σ4.76(we assume that | |
| M100∝M500). The right panels of Figure 2 shows this | |
| predicted slope (dashed lines). | |
| The bisector of the least-squares fits to the data has | |
| a slope of 2 .94±0.74, significantly shallower than the | |
| predicted slope of 4.8. | |
| We recompute the velocity dispersions σp,Afor all | |
| galaxies within one Abell radius (2.14 Mpc) and in- | |
| side the caustics. Surprisingly, the correlation is slightly | |
| stronger (99.4% confidence level). This result supports | |
| the idea that velocity dispersions computed within a | |
| fixedphysicalradiusretainstrongcorrelationswith other | |
| cluster observables, even though we measure the velocity | |
| dispersion inside different fractions of the virial radius | |
| for clusters of different masses. Because cluster veloc- | |
| ity dispersions decline with radius (e.g. Rines et al. 2003; | |
| Rines & Diaferio 2006), σp,Amay be smaller than σp,100 | |
| (measured within r100,c) for low-mass clusters, perhaps | |
| exaggerating the difference in measured velocity disper- | |
| sionsrelativeto the differences in virialmass(i.e., σp,Aof | |
| a low-mass cluster may be measured within 2 r100while | |
| σp,Aof a high-mass cluster may be measured within r100; | |
| the ratio σp,Aof these clusters would be exaggerated rel-Hectospec Virial Masses and SZE 3 | |
| Fig. 1.— Redshift versus projected clustrocentric radius for the 15 HeCS clusters studied here. Clusters are ordered left-to-r ight and | |
| top-to-bottom by decreasing values of YSZD2 | |
| A(r2500). The solid lines show the locations of the caustics, which w e use to identify cluster | |
| members. The Hectospec data extend out to ∼8 Mpc; the figure shows only the inner 4 Mpc to focus on the viria l regions. | |
| ative to the ratio σp,100). Future cluster surveys with | |
| enough redshifts to estimate velocity dispersions but too | |
| few to perform a caustic analysis should still be sufficient | |
| for analyzing scaling relations. | |
| Because of random errors in the mass estimation, the | |
| virial mass and the caustic mass within a given radius | |
| do not necessarily coincide. Therefore, the radius r100 | |
| depends on the mass estimator used. Figure 2 shows | |
| the scaling relationsfor two estimated masses M100,cand | |
| M100,v;M100,cis the mass estimated within r100,c(where | |
| bothquantitiesaredefinedfromthecausticmassprofile), | |
| andM100,vis the mass estimated within r100,v(both | |
| quantities are estimated with the virial theorem, e.g., | |
| Rines & Diaferio 2006). including galaxies projected in- | |
| sider100,v. Similar to σp, there is a clear correlation | |
| between M100,vandYSZD2 | |
| A(99.0% confidence with a | |
| Spearman test). The strong correlation of dynamical | |
| mass with SZE also holds for M100,cestimated directlyfrom the caustic technique (99.8% confidence). | |
| The bisector of the least-squares fits has a slope of | |
| 1.11±0.16, again significantly shallower than the pre- | |
| dicted slope of 1.6. This discrepancy has two distinct | |
| origins. By looking at the distribution of the SZE sig- | |
| nals in Figure 2, we see that, at a given velocity disper- | |
| sion or mass, the SZE signals have a scatter which is a | |
| factor of ∼2. Alternatively, at fixed SZE signal, there | |
| is a scatter of a factor of ∼2 in estimated virial mass. | |
| Unless the observational uncertainties are significantly | |
| underestimated, the data show substantial intrinsic scat- | |
| ter. Moreover, this scatter is comparable to the range of | |
| our sample and, therefore, the error on the slope derived | |
| from our least-squares fit to the data is likely to be un- | |
| derestimated (see Andreon & Hurn 2010, for a detailed | |
| discussionofaBayesianapproachtofittingrelationswith | |
| measurement uncertainties and intrinsic scatter in both | |
| quantities).4 Rines, Geller, & Diaferio | |
| TABLE 1 | |
| HeCS Dynamical Masses and SZE Signals | |
| Cluster z σ p M100,vM100,c YSZD2 | |
| AYSZD2 | |
| ASZE | |
| (350 kpc) ( r2500) | |
| km s−11014M⊙1014M⊙10−5Mpc−210−4Mpc2Ref. | |
| A267 0.2288 743+81 | |
| −616.86±0.82 4.26 ±0.14 3.08 ±0.34 0.42 ±0.06 1 | |
| A697 0.2812 784+77 | |
| −596.11±0.69 5.96 ±3.51 – 1.29 ±0.15 1 | |
| A773 0.2174 1066+77 | |
| −6318.4±1.7 16.3 ±0.7 5.40 ±0.57 0.90 ±0.10 1 | |
| Zw2701 0.2160 564+63 | |
| −473.47±0.42 2.69 ±0.30 1.46 ±0.016 0.17 ±0.02a2 | |
| Zw3146 0.2895 752+92 | |
| −676.87±0.89 4.96 ±0.91 – 0.71 ±0.09 1 | |
| A1413 0.1419 674+81 | |
| −606.60±0.85 3.49 ±0.15 3.47 ±0.24 0.81 ±0.12 1 | |
| A1689 0.1844 886+63 | |
| −5215.3±1.4 9.44 ±5.66 7.51 ±0.60 1.50 ±0.14 1 | |
| A1763 0.2315 1042+79 | |
| −6416.9±1.6 12.6 ±1.5 3.10 ±0.32 0.46 ±0.05a2 | |
| A1835 0.2507 1046+66 | |
| −5519.6±1.6 20.6 ±0.3 6.82 ±0.48 1.37 ±0.11 1 | |
| A1914 0.1659 698+46 | |
| −386.70±0.57 6.21 ±0.21 – 1.08 ±0.09 1 | |
| A2111 0.2290 661+57 | |
| −454.01±0.41 4.77 ±1.23 – 0.55 ±0.12 1 | |
| A2219 0.2256 915+53 | |
| −4512.8±1.0 12.0 ±4.7 6.27 ±0.26 1.19 ±0.05a2 | |
| A2259 0.1606 735+67 | |
| −535.59±0.60 4.90 ±1.69 – 0.27 ±0.10 1 | |
| A2261 0.2249 725+75 | |
| −577.13±0.83 5.10 ±2.07 – 0.71 ±0.09 1 | |
| RXJ2129 0.2338 684+88 | |
| −644.31±0.57 2.94 ±0.13 – 0.40 ±0.07 1 | |
| Note. —aExtrapolated to r2500using the best-fit relation between YSZD2 | |
| A(350kpc) and YSZD2 | |
| A(r2500) for eight clusters in common | |
| between B08 and M09. | |
| Note. — Redshift zand velocity dispersion σpare computed for galaxies defined as members using the causti cs. Masses M100,vand | |
| M100,care evaluated using the virial mass profile and caustic mass p rofile respectively. | |
| Note. — REFERENCES: SZE data are from (1) Bonamente et al. 2008 and (2) Marrone et al. 2009. | |
| Our shallow slopes may also arise in part from the fact | |
| that our sample, which has been assembled from the lit- | |
| erature and whose selection function is difficult to deter- | |
| mine, is likely to be biased against clusters with small | |
| mass and low SZE signal. Larger samples should deter- | |
| mine whether unknown observational biases or issues in | |
| the physical understanding of the relation account for | |
| this discrepancy. | |
| 4.DISCUSSION | |
| Thestrongcorrelationbetweenmassesfromgalaxydy- | |
| namics and SZE signals indicates that the SZE is a rea- | |
| sonableproxyforcluster mass. B08compareSZEsignals | |
| toX-rayobservables,inparticularthetemperature TXof | |
| the intracluster medium and YX=MgasTX, whereMgas | |
| isthemassoftheICM(seealsoPlagge et al.2010). Both | |
| of these quantities are measured within r500, a signifi- | |
| cantly smaller radius than r100where we measure virial | |
| mass. M09 compare SZE signals to masses estimated | |
| from gravitational lensing measurements. The lensing | |
| masses are measured within a radius of 350 kpc. For the | |
| clusters studied here, this radius is smaller than r2500 | |
| and much smaller than r100. Numerical simulations indi- | |
| cate that the scatter in masses measured within an over- | |
| densityδdecreases as δdecreases (White 2002), largely | |
| because variations in cluster cores are averaged out at | |
| larger radii. Thus, the dynamical measurement reaching | |
| to larger radius may provide a more robust indication | |
| of the relationship between the SZE measurements and | |
| cluster mass. | |
| TheYSZD2 | |
| A−Mlensdata presented in M09 show a | |
| weakercorrelationthanouropticaldynamicalproperties. | |
| A Spearman test rejects the hypothesis of uncorrelated | |
| data for the M09 data at only the 94.8% confidence level, | |
| compared to the 98.4-99.8% confidence levels for our op- | |
| tical dynamical properties. One possibility is that Mlensis more strongly affected by substructure in cluster cores | |
| and by line-of-sight structures than are the virial masses | |
| and velocity dispersions we derive. | |
| Few measurements of SZE at large radii ( > r500) are | |
| currently available. Hopefully, future SZ data will allow | |
| a comparisonbetween virialmass and YSZwithin similar | |
| apertures. | |
| 5.CONCLUSIONS | |
| Our first direct comparison of virial masses, velocity | |
| dispersions, and SZ measurements for a sizable clus- | |
| ter sample demonstrates a strong correlation between | |
| these observables (98.4-99.8% confidence). The SZE sig- | |
| nal increases with cluster mass. However, the slopes of | |
| both the YSZ−σrelation ( YSZ∝σ2.94±0.74 | |
| p) and the | |
| YSZ−M100relation ( YSZ∝M1.11±0.16 | |
| 100) are significantly | |
| shallower(giventheformaluncertainties)thantheslopes | |
| predictedbynumericalsimulations(4.76and1.60respec- | |
| tively). | |
| This result may be partly explained by a bias against | |
| less massive clusters that could artificially flatten our | |
| measured slopes. Unfortunately, the selection function | |
| of our sample is unknown and we are unable to quan- | |
| tify the size of this effect. More importantly, our sample | |
| indicates that the relation between SZE and virial mass | |
| estimates (or velocity dispersion) has a non-negligible in- | |
| trinsicscatter. Acomplete, representativeclustersample | |
| is required to robustly determine the size of this scatter, | |
| its origin, and its possible effect on the SZE as a mass | |
| proxy. | |
| Curiously, YSZis more strongly correlated with both | |
| σpandM100than with Mlens(M09). Comparison of | |
| lensingmassesandclustervelocitydispersions(andvirial | |
| masses)forlarger,complete, objectivelyselected samples | |
| of clusters may resolve these differences. | |
| Thefull HeCS sampleof53clusterswill providealargeHectospec Virial Masses and SZE 5 | |
| Fig. 2.— Integrated S-Z Compton parameter YSZD2 | |
| Aversus dynamical properties for 15 clusters from HeCS. Left panels: SZE data | |
| versus virial mass M100estimated from the virial mass profile (top) and the caustic m ass profile (bottom). Solid and open points indicate | |
| SZ measurements from B08 and M09 respectively. The dashed li ne shows the slope of the scaling predicted from numerical si mulations: | |
| YSZ∝M1.6(Motl et al. 2005), while the solid line shows the ordinary le ast-squares bisector. Arrows show the aperture correction s to | |
| the SZE measurements (see text). Right panels: SZE data versus projected velocity dispersions measured fo r galaxies inside the caustics | |
| and (top) inside r100,cestimated from the caustic mass profile and (bottom) inside t he Abell radius 2.14 Mpc. The dashed line shows the | |
| scaling predicted from simulations: YSZ∝M1.6(Motl et al. 2005) and σ∝M0.33(Evrard et al. 2008). The solid line shows the ordinary | |
| least-squares bisector. Data points and arrows are defined a s in the left panels. | |
| sample of clusters with robustly measured velocity dis- | |
| persions and virial masses as a partial foundation for | |
| these comparisons. | |
| We thank Stefano Andreon for fruitful discussions | |
| about fitting scaling relations with measurement errorsand intrinsic scatter in both quantities. AD gratefully | |
| acknowledges partial support from INFN grant PD51. | |
| We thank Susan Tokarz for reducing the spectroscopic | |
| data and Perry Berlind and Mike Calkins for assisting | |
| with the observations. | |
| Facilities: MMT (Hectospec) | |
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