STAR FORMATION:

1. STAR FORMATION: PROBLEMS AND PROSPECTS Chris McKee with thanks to Richard Klein, Mark Krumholz, Eve Ostriker, and Jonathan Tan

2. Macrophysics: Properties determined by the natal gas cloud What determines the rate at which stars form? What determines the mass distribution of stars? Microphysics: gravitational collapse and its aftermath How do individual stars form in the face of angular momentum, magnetic fields and radiation pressure? How do clusters of stars form in the face of intense feedback? How does star formation lead to planet formation? THE BIG QUESTIONS IN STAR FORMATION:

3. Macrophysics: L ~ 0.01 pc -- 100 pc (Cloud formation requires larger scales) t ~ 103 yr -- 107.5 yr (Planet formation requires smaller scales) Microphysics: L ~ 1011 cm -- 1017 cm t ~ 103.5 s -- 106 yr (Not currently feasible) Length and Time Scales in Galactic Star Formation

4. Currently impossible to numerically follow the hydrodynamics of core collapse past the point of protostar formation  need both analytic and numerical approaches ZENO’S PARADOX (ALMOST) IN COMPUTATIONS OF STAR FORMATION Time step Dt 1/(Gr)1/2 Truelove et al. (1998) calculations of star formation now: Density increase of 109  Dt decrease of 104.5 ABN (2002) calculations of primordial star formation: Density increase of 1017  Dt decrease of 108.5 In both cases, calculation stopped before formation of protostar.

5. Maximum mass of isothermal sphere ( = cth): MBE = 1.18 cth3 /(G3 s)1/2 (Bonnor-Ebert mass) where s is measured at the surface of the cloud 2D Jeans mass: In a self-gravitating cloud, P ~ G2, where  is the mass/area of the cloud  MJ, 3D~ 4/(G2 ) = MJ, 2D CHARACTERISTIC GRAVITATIONAL MASS Kinetic energy/mass ~ gravitational energy/mass (MJ = Jeans mass) 2 ~ GMJ/r M ~  r3  MJ~ 3/(G3 )1/2 = 4/(G3P)1/2

6. Characteristic mass is the 2D Jeans mass: MGMC = 4 / (G2 ) = 7  105 ( / 6 km s-1)4 (100 Msun pc-2 / ) Msun I. MACROPHYSICS FORMATION OF GIANT MOLECULAR CLOUDS (GMCs) GMCs form by gravitational instability, not coagulation “Top-down,” not “bottom-up” - (Elmegreen)

7. GMCs ARE GOVERNED BY SUPERSONIC TURBULENCE Line-width size relation:  ≈ 0.7 Rpc0.5 ± 0.05 km s-1 (Solomon et al. 1987) Thermal velocity is only ~ 0.2 km s-1 at T ~ 10 K  highly supersonic for R >~ 1 pc Simulations Show Turbulence Damps Out in ~< 1 Crossing Time, L / . How is It Maintained? From formation--but then all clouds must be destroyed quickly Injection by protostellar outflows, HII regions, or external sources--but these are all highly intermittent Significant issue: does turbulence damp out as quickly as indicated by periodic box simulations?

8. CLOUD LIFETIMES MAJOR ISSUE: ARE CLOUDS IN APPROXIMATE EQUILIBRIUM? GMCs are observed to be gravitationally bound: Virial parameter vir = 52 R/GM ≈ Kinetic energy/Grav. energy ~1 GMCs must therefore be destroyed--they will not fall apart Calculations show GMCs destroyed by photoionization: tdestroy ~ 20 - 30 Myr >> crossing time L/ ~ 1.4Lpc1/2 Myr YES: 1. Star formation occurs in clusters over times long compared to a crossing time (Palla & Stahler; Tan) 2. Cloud lifetimes are long compared to a crossing time:

9. CLOUD LIFETIMES MAJOR ISSUE: ARE CLOUDS IN APPROXIMATE EQUILIBRIUM? 1. Star formation in a crossing time (Elmegreen) Estimated time for star formation over a wide range of length scales, reaching up to > 1 kpc: tsf L Possible partial resolution of debate: Star formation in a crossing time valid for unbound structures, including Taurus and the largest ones studied by Elmegreen. But, is it possible to create the clumps with  ~ 1 g cm-2 characteristic of high-mass star forming regions in unbound clouds? NO: 2. Critique of Palla & Stahler claim of long-term star formation in Taurus (Hartmann) 3. OB associations can form in unbound clouds with vir = 2 (Clark et al)

10. Stability requires <P> not much greater than Psurface. Allowing for the weight of overlying HI and H2, <P(CO)> ≈ 8 Psurface (Holliman) , where Psurface/k ≈ 2 104 K cm-3 (Boulares & Cox):  GMC ≈ 100 Msun pc-2 Comparable to Solomon et al’s 170 Msun pc-2 PREDICTING THE PROPERTIES OF EQUILIBRIUM GMCs (Chieze; Elmegreen; Holliman; McKee) If cloud is in approximate equilibrium, virial theorem implies <P> ≈ Psurface + 0.5 GS2 (S = surface density)

11.  m* ≈ Star formation efficiency  Bonnor-Ebert mass ≈ (1/2)  cs3 / (G3 )1/2 SFE ~ 1/2 in core (Matzner & McKee) ≈ (1/2)  cs4 / (G2 ) ≈ 0.5 Msun for T = 10 K and  ~ GMC Predicts that stellar masses are governed by the large-scale properties of the ISM. Can be reduced by subsequent fragmentation (cf Larson) PREDICTING THE CHARACTERISTIC STELLAR MASS FROM THE WEIGHT OF THE ISM: Gravitationally bound structures in equilibrium GMCs (clumps and cores) have  ~ GMC ~ (8PISM/G)1/2 Possible problem: Works well for solar neighborhood, but does it work elsewhere? (See later)

12. Magnetic critical mass M : When magnetism balances gravity B2R3 ~ G M2/R  M = 0.12  / G1/2 Magnetically supercritical (M> M ): B cannot prevent collapse Magnetically subcritical (M< M ): Collapse impossible without flux loss or mass accumulation along field MAGNETIC FIELDS “The strength of the magnetic field is directly proportional to our ignorance” --- paraphrase of Lo Woltjer Basic issue: Are magnetic fields of crucial importance in star formation (Mouschovias), or are they negligible (Padoan & Nordlund) ?

13. Caveats: -Generally finds only upper limits at densities ~< 103 cm-3 (Recall that mean density of large GMC is ~ 100 cm-3, so there are no data on large-scale fields.) -If the clouds are flattened along B, then projection effects imply that they are subcritical [M ≈ (1/2)M] (Shu et al.) (But there is no evidence that clouds are sheet-like, and sheet-like structure inconsistent with observed turbulent velocities.) MAGNETIC FIELDS: OBSERVATIONS Crutcher finds M ≈ M and Alfven Mach number ~ 1 Determining the role of magnetic fields is one of the critical problems in star formation.

14. Slope of GMC mass distribution is flat (~  0.6), but the slope of the core mass distribution is consistent with Salpeter: Low-intermediate mass cores(Motte & Andre; Testi & Sargent) High-mass cores(Beuther & Schilke) THEORY: Universal slope requires universal physical mechanism, turbulence (Elmegreen) Derivation with many assumptions(Padoan & Nordlund) Characteristic mass set by Jeans mass at average pressure and possible subsequent fragmentation (described above) THE IMF Observations consistent with universal characteristic mass ~(1/3)Msun and high mass slope, dN/d ln m* m*-1.35(Salpeter) Possible exceptions include paucity of O stars in the outer parts of galaxies like M31 CONCLUSION: IMF determined in molecular clouds

15. Computing the Star Formation Rate From the Physics of Turbulence • GMCs roughly virialized, turbulent KE ~ PE • For sub-parts, linewidth-size relation  KE ~ r4 • PE ~ r5, so most GMC sub-parts are unbound. Only overdense regions bound. • Compute fraction f dense enough to be bound from PDF of densities. • SFR ~ fMGMC / tff • Find f ~ 1% for any virialized object with high Mach no. (Krumholz & McKee, 2005, ApJ, submitted)

16. SFR in the Galaxy • Estimate cloud free-fall times from direct observation (Milky Way) or ISM pressure (other galaxies) • SFR from molecular mass, f, and tff • Application to MW  SFR = 2  5 Msun / yr. • Observed MW SFR ~ 3 Msun / yr

17. Result: SFR in Galactic DisksThe Kennicutt-Schmidt Law From First Principles

18. · ~ mBE / tff~ c3/(G3r)1/2  (Gr)1/2 ~ c3/G m* If magnetic fields are important: Collapse of initially subcritical clouds due to ambipolar diffusion (2D--Mouschovias) Turbulent ambipolar diffusion can accelerate flux loss (Zweibel; Fatuzzo & Adams; Heitsch) II. MICROPHYSICS: GRAVITATIONAL COLLAPSE Paradigm: Inside-out collapse of centrally concentrated core Accretion rate ~ Bonnor-Ebert mass per free-fall time Isothermal,  = p =1(Shu) Non-isothermal  = p  1 (McLaughlin & Pudritz) Non-isentropic   p  1(Fatuzzo, Adams & Myers)

19. THE CLASSICAL PROBLEMS OF STAR FORMATION 1. Angular momentum Rotational velocity due to differential rotation of Galaxy is ~ 0.05 km s-1 in 2 pc cloud  Specific angular momentum is j ~ rv ~ 3  1022 cm2 s-1 Angular momentum of solar system is dominated by Jupiter and is much less: j ~ 1018 cm2 s-1 Protostars generally have accretion disks, but these have angular momentum ~ solar system and << ISM value. SOLUTION: Angular momentum removed by magnetic fields

20. How do protostars lose so much flux? -Ambipolar diffusion: Flow of neutral gas through low-density, magnetized ions and electrons (ne/n < 10-6) Most flux (in dex) must be lost in accretion disk; how does ionization become low enough to allow this? -Magnetic reconnection ? 2. Magnetic flux Typical interstellar magnetic field ~ 5 mG  Flux in 1 Msun sphere of ISM (r = 2 pc) is 6  1032 Mx Net flux in Sun is ~ 1 G  p Rsun2 ~ 5  1021 Mx -Issue not fully resolved yet.

21. PROTOSTELLAR JETS AND OUTFLOWS Jet velocity v ~ 200 km s-1 ~ Keplerian Mass loss rate in outflow ~ fraction of accretion rate onto star

22. PROTOSTELLAR JETS AND OUTFLOWS Due to MHD winds driven by magnetic field threading the accretion disk and/or the star. Detailed understanding lacking.

23. ISSUE: Generally believed that angular momentum transfer in disks due to magnetorotational instability. How can the coupling to the field be strong enough to enable the MRI, yet weak enough to ensure observed flux loss? ISSUE: How do planets form out of protostellar accretion disks? Enormous range of scales involved make this a very formidible problem. PROTOSTELLAR DISKS

24. MASSIVE STAR FORMATION

25. Compare low-mass cores in Taurus (Onishi et al. 1996): AV ~ 8 mag, S ~ 0.03 g cm-2 HOW DO MASSIVE STARS FORM? High-mass star-forming clumps (Plume et al. 1997) Supersonically turbulent: s ~ 2.5 km s-1 Radius ~ 0.5 pc  Virial mass ~ 4000 Msun  Surface density S ~ 1 g cm-2 Corresponding visual extinction: AV ~ 200 S mag

26. EFFECT OF RADIATION PRESSURE Wolfire & Cassinelli 1987 Necessary condition: momentum in accretion flow at dust destruction radius must exceed momentum in radiation field.

27. Consistent with observation: * No characteristic length scales observed between the Jeans length ~ ctff ~ c/(Gr)1/2 and the size of the GMC. * All molecular gas in the Galaxy is observed to be in approximate virial equilibrium. TURBULENT CORE MODEL FOR MASSIVE STAR FORMATION McKee & Tan 2002, 2003 BASIC ASSUMPTION: Star-forming clumps and cores within them are part of a self-similar, self-gravitating turbulent structure in approximate hydrostatic equilibrium. Cores are supported in large part by turbulent motions.

28. TURBULENT CORE MODEL: m* = f* tff · m* In a turbulent medium, f*(t) could have large fluctuations. On average: f* >> 1 only in unlikely case of almost perfectly spherical inflow f* << 1 only if supported by magnetic fields Observations show fields do not dominate dynamics (Crutcher 1999) PROTOSTELLAR ACCRETION RATE [see Stahler, Shu & Taam 1980] m* = instantaneous protostellar mass tff = (3p/32Gr)1/2 = free-fall time evaluated at r(m*) f* = numerical parameter  (1)

29.  4.6 x 10-4 (m*f/ 30 Msun)3/4 S3/4(m*/m*f)1/2 Msun yr-1 · m* Massive stars form in about 105 yr: t*f= 1.3 x 105 (m*f/30 Msun)1/4S3/4yr Massive stars form in turbulent cores: velocity dispersion is s = 1.3 (m*f/ 30 Msun)1/4 S1/4 km s-1 vs. sth = 0.3 (T/30 K)1/2 km s-1 RESULTS FOR MASSIVE STAR FORMATION Protostellar accretion rate for  r -1.5:

30. Accretion rate is large enough to overcome radiative momentum: · m*  4.6 x 10-4 (m*f/ 30 Msun)3/4 S3/4(m*/m*f)1/2 Msun yr-1

31. Critique of Turbulent Core Model for Massive Star Formation Dobbs, Bonnell, & Clark Simulations of star formation in cores with   r-1.5 Equation of state: isothermal or barotropic above 10^-14 g cm-3 Isothermal collapse results in many small fragments; barotropic collapse in a few. In no case did a massive star form (although simulation ran only until ~ 10% of mass had gone into stars). Require radiation-hydrodynamic simulations to address this

32. Massive Star Formation Simulations: Required Physics • Real radiative transfer and protostellar models are required, even at early stages. • Example: dM/dt = 10-3 Msun/yr, m* = 0.1 Msun, R* = 10 Rsun L = 30 Lsun! • This L can heat 10 Msun of gas to 1000 K in ~ 300 yr. At nH = 108 cm-3, tff ~ 4000 yr  high accretion rates suppress fragmentation. • Most energy is released at sub-grid scales in the final fall onto star. A barotropic approximation cannot model this effect

33.  120 Msun core 43 Msun star 3D: Krumholz, Klein, & McKee (2005) AMR, flux-limited diffusion with gray opacity Resolution ~ 10 AU, similar to Yorke & Sonnhalter NUMERICAL SIMULATIONS 2D: Yorke & Sonnhalter (2002) Accurate grain opacities and multi-component grain model (only 23 Msun with gray opacity)

34. 3D simulations with turbulent initial conditions, high accretion rates, and radiative transfer (not barotropic approxmation) show no fragmentation. Protostar has currently grown to > 20 Msun

35. COMPETITIVE ACCRETION (Bonnell et al.) Protostellar “seeds” accrete gas that is initially unbound to protostar Does not work for m* > 10 Msun due to radiation pressure (Edgar & Clarke) Does not allow for reduction in accretion due to vorticity (Krumholz, McKee & Klein) STELLAR MERGERS (Bate, Bonnell, & Zinnecker) Requires stellar densities ~ 108 pc-3, greater than ever observed Not needed to form massive stars Stellar mergers do occur in globular clusters (Fregeau et al.) ALTERNATE MODELS OF STAR FORMATION

36. Most stars are born in clusters All the problems of normal star formation are multiplied at stellar densities that can be > 106 times local value ISSUE: HOW DO STARS FORM IN CLUSTERS? Solution unknown at present NGC 3603

37. MACROPHYSICS: Key problem is FRAGMENTATION Determines IMF and the rate of star formation Theoretical progress: Major advance---star formation occurs in supersonically turbulent medium Importance of magnetic fields remains unclear Equilibrium vs. non-equilibrium structure STAR FORMATION: PROBLEMS AND PROSPECTS SUMMARY Prospect for progress are good: AMR codes are becoming widely available and are ideally suited for multiscale problems

38. STAR FORMATION: PROBLEMS AND PROSPECTS SUMMARY MICROPHYSICS: Problem: How do stars form--by gravitational collapse, gravitational accretion, or stellar mergers? Prospect: May require more computer power to resolve this, since calculation of formation of even one star is a challenge. Problem: How do massive stars form in the face of radiation pressure? Prospect: Good progress being made, but 3D calculations with adequate radiative transfer and dust models are in the future. Formation of clusters with massive stars is a yet greater challenge.

39. Problem: Planet formation Prospect: It will be some time before a single simulation can treat the enormous range of scales needed for an accurate simulation.