Structural and scaling properties of galaxy clusters Probing the physics of structure formation

1. Structural and scaling properties of galaxy clusters Probing the physics of structure formation M.Arnaud, G.Pratt, E.Pointecouteau (CEA-Sap Saclay) • Dark matter distribution in clusters with XMM E.Pointecouteau • Some insights into cluster gas physics with XMM G.Pratt • Cluster evolution M.Arnaud

2. Coma z =0.02 A1795 z=0.06 XMM XMM RXJ1053 z =1.26 RXJ0848 z=1.27 XMM Chandra The cluster population: A large variety of objects • • Physical parameters • Lbol ~1041 - a few 1046 ergs/s • Mtot ~1013 - a few 1015 Mo • T ~ 0.3 - 15 keV • • Present at least since z ~ 1.5 • • Morphology: • regular (~50%) but some not • ≠ dynamical state at all z

3. A2319 T= 9.1 keV A 2657 T=3.7 keV RI Sx profile kT [Neumann & Arnaud 1999] [Mohr & Evrard 1997] But all possible clusters do NOT exist  Correlations  Some regularity in shape

4. Z=0 Z=0.5 Z=1 Canonical model of cluster formation (anal. spherical collapse; num simul) • ICM: evolving in the gravitational potential of the DM: fgas = cst • Clusters collapsed at z correspond to a fixed density contrast: GM/R3 = <r> =d rc (z) ; d~200 • Are close to virial/hydrostatic equilibrium (between big mergers) kT a GM/R • Have same internal DM (and thus gas) structure Self Similarity of the cluster population expected Universal profiles  Simple scaling laws: Q  Ta M  T3/2 Rv T1/2 LX T2 [Bryan & Norman 1998] log(r/ rc) [NFW 1995] Comparison with observations  test of formation physics

5. 2 - Spectroscopy  temperature profile Spherical symmetry + Hydrostatic Equilibrium Total mass profile From XMM observations to DM profiles • 1 – Imaging •  surface brightness profile • density profile Chandra match XMM!

6. - down to 0.01 virial radius - up to 0.7 virial radius Mass profile derived from the HE equation • A1413 [Pratt & Arnaud 02] • z=0.143 ; kTX=6.49 keV • A1983 [Pratt & Arnaud 03] • z=0.044 ; kTX=2.3 keV • A478 [Pointecouteau et al. 03] • z=0.088 ; kTX=6.73 keV • deprojection • PSF correction • Cusped profile as expected from num. Simu. (NFW profile preferred) •  Similarity observed in the shape of M(r)

7. XMM on 3 relaxed cooling flow clusters :M  T1.49±0.2  Normalisation offset at d = 2500 (0.3 r200 )… and at all radii (d) At a given R corresponding to a density constrast d : Md = ad T3/2 ad depends on the (universal) gas and DM distribution, via HE The M-T relation from XMM/chandra d = 2500 (0.3 r200 ) Chandra on 5 relaxed hot/lensing clusters :M  T1.52±0. 36 Modelling of DM collapse OK; Pb in gas modelling (distribution shape)

8. Conclusion XMM-Newton  Unpreecedent accuracy on kT(r)  First detailed DM profiles for clusters (up to Rv) Similarity in the dark matter shape of cluster  Dark matter collapse seems to be well understood  Better constraints needed to characterize the central region:  NFW preferred  ideal world: XMM+Chandra Departure from predicted M-T relation normalisation  Modelling of the gas still not reproducing real clusters  Physics of the gas not well understood (G.Pratt)  Evolution of scaling properties with z (M.Arnaud)