Peter Skands Theoretical Physics, Fermilab Eugene, February 2009 Higher Order Aspects of Parton Showers
Peter Skands A Guide to Hadron Collisions - 2 Fixed Order (all orders) “Experimental” distribution of observable O in production of X : k : legsℓ : loops {p} : momenta Monte Carlo at Fixed Order High-dimensional problem (phase space) d≥5 Monte Carlo integration Principal virtues 1.Stochastic error O(N -1/2 ) independent of dimension 2.Full (perturbative) quantum treatment at each order 3.(KLN theorem: finite answer at each (complete) order) Note 1: For k larger than a few, need to be quite clever in phase space sampling Note 2: For k+ℓ > 0, need to be careful in arranging for real- virtual cancellations “Monte Carlo”: N. Metropolis, first Monte Carlo calculation on ENIAC (1948), basic idea goes back to Enrico Fermi
Peter Skands A Guide to Hadron Collisions - 3 ►Naively, brems suppressed by α s ~ 0.1 Truncate at fixed order = LO, NLO, … However, if ME >> 1 can’t truncate! ►Example: SUSY pair production at 14 TeV, with MSUSY ~ 600 GeV Conclusion: 100 GeV can be “soft” at the LHC Matrix Element (fixed order) expansion breaks completely down at 50 GeV With decay jets of order 50 GeV, this is important to understand and control Bremsstrahlung Example: LHC FIXED ORDER pQCD inclusive X + 1 “jet” inclusive X + 2 “jets” LHC - sps1a - m~600 GeVPlehn, Rainwater, PS PLB645(2007)217 (Computed with SUSY-MadGraph) Cross section for 1 or more 50-GeV jets larger than total σ, obviously non- sensical
Peter Skands A Guide to Hadron Collisions - 4 Beyond Fixed Order 1 ►dσ X = … ►dσ X+1 ~ dσ X g 2 2 s ab /(s a1 s 1b ) ds a1 ds 1b ►dσ X+2 ~ dσ X+1 g 2 2 s ab /(s a2 s 2b ) ds a2 ds 2b ►dσ X+3 ~ dσ X+2 g 2 2 s ab /(s a3 s 3b ) ds a3 ds 3b ►But it’s not a parton shower, not yet an “evolution” What’s the total cross section we would calculate from this? σ X;tot = int( dσ X ) + int( dσ X+1 ) + int( dσ X+2 ) +... Just an approximation of a sum of trees no real-virtual cancellations But wait, what happened to the virtual corrections? KLN? KLN guarantees that sing{int(real)} = ÷ sing{virtual} approximate virtual = int(real) dσXdσX α s ab s ai s ib dσ X+1 dσ X+2 This is an approximation of inifinite- order tree-level cross sections “DLA”
Peter Skands A Guide to Hadron Collisions - 5 Beyond Fixed Order 2 ►dσ X = … ►dσ X+1 ~ dσ X g 2 2 s ab /(s a1 s 1b ) ds a1 ds 1b ►dσ X+2 ~ dσ X+1 g 2 2 s ab /(s a2 s 2b ) ds a2 ds 2b ►dσ X+3 ~ dσ X+2 g 2 2 s ab /(s a3 s 3b ) ds a3 ds 3b + Unitarisation: σ tot = int( dσ X ) σ X;excl = σ X - σ X+1 - σ X+2 - … ►Interpretation: the structure evolves! (example: X = 2-jets) Take a jet algorithm, with resolution measure “Q”, apply it to your events At a very crude resolution, you find that everything is 2-jets At finer resolutions some 2-jets migrate 3-jets = σ X+1 (Q) = σ X;incl – σ X;excl (Q) Later, some 3-jets migrate further, etc σ X+n (Q) = σ X;incl – ∑σ X+m<n;excl (Q) This evolution takes place between two scales, Q in ~ s and Q end = Q had ►σ X;excl = int( dσ X ) - int( dσ X+1,2,3,…;excl ) = int( dσ X ) EXP[ - int( dσ X+1 / dσ X ) ] ►σ X;tot = Sum ( σ X+0,1,2,3,…;excl ) = int( dσ X ) dσXdσX α s ab s ai s ib dσ X+1 dσ X+2 Given a jet definition, an event has either 0, 1, 2, or … jets “DLA”
Peter Skands A Guide to Hadron Collisions - 6 LL Shower Monte Carlos ►Evolution Operator, S “Evolves” phase space point: X … As a function of “time” t=1/Q Observable is evaluated on final configuration S unitary (as long as you never throw away or reweight an event) normalization of total (inclusive) σ unchanged ( σ LO, σ NLO, σ NNLO, σ exp, …) Only shapes are predicted (i.e., also σ after shape-dependent cuts) Can expand S to any fixed order (for given observable) Can check agreement with ME Can do something about it if agreement less than perfect: reweight or add/subtract ►Arbitrary Process: X Pure Shower (all orders) O: Observable {p} : momenta w X = |M X | 2 or K|M X | 2 S : Evolution operator Leading Order
Peter Skands A Guide to Hadron Collisions - 7 “S” (for Shower) ►Evolution Operator, S (as a function of “time” t=1/Q ) Defined in terms of Δ(t 1,t 2 ) (Sudakov) The integrated probability the system does not change state between t 1 and t 2 NB: Will not focus on where Δ comes from here, just on how it expands = Generating function for parton shower Markov Chain “X + nothing” “X+something” A: splitting function
Peter Skands A Guide to Hadron Collisions - 8 Constructing LL Showers ►In the previous slide, you saw many dependencies on things not traditionally found in matrix-element calculations: ►The final answer will depend on: The choice of evolution “time” The splitting functions (finite terms not fixed) The phase space map ( “recoils”, dΦ n+1 /dΦ n ) The renormalization scheme (vertex-by-vertex argument of α s ) The infrared cutoff contour (hadronization cutoff) Variations Comprehensive uncertainty estimates (showers with uncertainty bands) Matching to MEs (& N n LL?) Reduced Dependence (systematic reduction of uncertainty)
Peter Skands A Guide to Hadron Collisions - 9 A (complete idiot’s) Solution? ►Combine different starting multiplicites inclusive sample? ►In practice – Combine 1. [X] ME + showering 2. [X + 1 jet] ME + showering 3. … ►Doesn’t work [X] + shower is inclusive [X+1] + shower is also inclusive X inclusive X+1 inclusive X+2 inclusive ≠ X exclusive X+1 exclusive X+2 inclusive Run generator for X (+ shower) Run generator for X+1 (+ shower) Run generator for … (+ shower) Combine everything into one sample What you get What you want Overlapping “bins”One sample
Peter Skands A Guide to Hadron Collisions - 10 The Matching Problem ►[X] ME + shower already contains sing{ [X + n jet] ME } So we really just missed the non-LL bits, not the entire ME! Adding full [X + n jet] ME is overkill LL singular terms are double-counted ►Solution 1: work out the difference and correct by that amount add “shower-subtracted” matrix elements Correction events with weights : w n = [X + n jet] ME – Shower{w n-1,2,3,.. } I call these matching approaches “additive” ►Solution 2: work out the ratio between PS and ME multiply shower kernels by that ratio (< 1 if shower is an overestimate) Correction factor on n’th emission P n = [X + n jet] ME / Shower{[X+n-1 jet] ME } I call these matching approaches “multiplicative”
Peter Skands A Guide to Hadron Collisions - 11 Matching in a nutshell ►There are two fundamental approaches Additive Multiplicative ►Most current approaches based on addition, in one form or another Herwig (Seymour, 1995), but also CKKW, MLM, Add event samples with different multiplicities Need separate ME samples for each multiplicity. Relative weights a priori unknown. The job is to construct weights for them, and modify/veto the showers off them, to avoid double counting of both logs and finite terms ►But you can also do it by multiplication Pythia (Sjöstrand, 1987) : modify only the shower All events start as Born + reweight at each step. Using the shower as a weighted phase space generator only works for showers with NO DEAD ZONES The job is to construct reweighting coefficients Complicated shower expansions only first order so far Generalized to include 1-loop first-order POWHEG Seymour, Comput.Phys.Commun.90(1995)95 Sjöstrand, Bengtsson : Nucl.Phys.B289(1987)810; Phys.Lett.B185(1987)435 Norrbin, Sjöstrand : Nucl.Phys.B603(2001)297 Massive Quarks All combinations of colors and Lorentz structures
Peter Skands A Guide to Hadron Collisions - 12 ►Herwig In dead zone: A i = 0 add events corresponding to unsubtracted |M X+1 | Outside dead zone: reweighted à la Pythia A i = |M X+1 | no additive correction necessary ►CKKW and L-CKKW At this order identical to Herwig, with “dead zone” for k T > k Tcut introduced by hand In dead zone: identical to Herwig Outside dead zone: A Herwig > |M X+1 | w X+1 negative negative weights ►Pythia A i = |M X+1 | over all of phase space no additive correction necessary ►Powheg At this order identical to Pythia no negative weights HERWIG TYPE PYTHIA TYPE Matching to X+1: Tree-level
Peter Skands A Guide to Hadron Collisions - 13 Gustafson, PLB175(1986)453; Lönnblad (ARIADNE), CPC71(1992)15. Azimov, Dokshitzer, Khoze, Troyan, PLB165B(1985)147 Kosower PRD57(1998)5410; Campbell,Cullen,Glover EPJC9(1999)245 VINCIA ►Based on Dipole-Antennae Shower off color-connected pairs of partons Plug-in to PYTHIA 8 (C++) ►So far: Choice of evolution time: pT-ordering Dipole-mass-ordering Thrust-ordering Splitting functions QCD singular terms + arbitrary finite terms (Taylor series) Phase space map Antenna-like or Parton-shower-like Renormalization scheme ( μ R = {evolution scale, p T, s, 2-loop, …} ) Infrared cutoff contour (hadronization cutoff) Same options as for evolution time, but independent of time universal choice Dipoles (=Antennae, not CS) – a dual description of QCD a b r VIRTUAL NUMERICAL COLLIDER WITH INTERLEAVED ANTENNAE Giele, Kosower, PS : hep-ph/ Les Houches 2007
Peter Skands A Guide to Hadron Collisions - 14Ordering kTkT m2m2 p T (Ariadne) m ant 1-T collinear Phase Space for 2 3 Partitioned-Dipole Dipole-Antenna EgEg Angle soft
Peter Skands A Guide to Hadron Collisions - 15 Second Order ►Second Order Shower expansion for 4 partons (assuming first already matched) min # of paths AR p T + AR recoil max # of paths DZ ►Problem 1: dependence on evolution variable Shower is ordered t 4 integration only up to t 3 2, 1, or 0 allowed “paths” 0 = Dead Zone : not good for reweighting Q E = p T (i,j,k) = m ij m jk /m ijk
Peter Skands A Guide to Hadron Collisions - 16 Second Order AVERAGEs of Over/Under-counting ►Second Order Shower expansion for 4 partons (assuming first already matched) Define over/under-counting ratio: PS tree / ME tree NB: AVERAGE of R 4 distribution
Peter Skands A Guide to Hadron Collisions - 17 Second Order EXTREMA of Over/Under-counting ►Second Order Shower expansion for 4 partons (assuming first already matched) Define over/under-counting ratio: PS tree / ME tree NB: EXTREMA of R 4 distribution (100M points)
Peter Skands A Guide to Hadron Collisions - 18 (Stupid Choices)
Peter Skands A Guide to Hadron Collisions - 19 Dependence on Finite Terms ►Antenna/Dipole/Splitting functions are ambiguous by finite terms
Peter Skands A Guide to Hadron Collisions - 20 The Right Choice ►Current Vincia without matching, but with “improved” antenna functions (including suppressed unordered branchings) Removes dead zone + still better approx than virt-ordered (Good initial guess better reweighting efficiency) ►Problem 2: leftover Subleading Logs after matching There are still unsubtractred subleading divergences in the ME
Peter Skands A Guide to Hadron Collisions - 21 Matching in Vincia ►We are pursuing three strategies in parallel Addition (aka subtraction) Simplest & guaranteed to fill all of phase space (unsubtracted ME in dead regions) But has generic negative weights and hard to exponentiate corrections Multiplication (aka reweighting) Guaranteed positive weights & “automatically” exponentiates path to NLL Complicated, so 1-loop matching difficult beyond first order. Only fills phase space populated by shower: dead zones problematic Hybrid Combine: simple expansions, full phase space, positive weights, and exponentiation? ►Goal Multi-leg “plug-and-play” NLO + “improved”-LL shower Monte Carlo Including uncertainty bands (exploring uncontrolled terms) Extension to NNLO + NLL ?
Peter Skands A Guide to Hadron Collisions - 22 NLO with Addition ►First Order Shower expansion Unitarity of shower 3-parton real = ÷ 2-parton “virtual” ►3-parton real correction ( A 3 = |M 3 | 2 /|M 2 | 2 + finite terms; α, β ) ►2-parton virtual correction (same example) PS Finite terms cancel in 3-parton O Finite terms cancel in 2- parton O (normalization) Multiplication at this order α, β = 0 (POWHEG )
Peter Skands A Guide to Hadron Collisions - 23 Matching at Higher Orders Leftover Subleading Logs ►Subtraction in Dead Zone ME completely unsubtracted in Dead Zone leftovers ►But also true in general: the shower is still formally LL everywhere NLL leftovers are unavoidable Additional sources: Subleading color, Polarization ►Beat them or join them? Beat them: not resummed brute force regulate with Theta (or smooth) function ~ CKKW “matching scale” Join them: absorb leftovers systematically in shower resummation But looks like we would need polarized NLL-NLC showers … ! Could take some time … In the meantime … do it by exponentiated matching Note: more legs more logs, so ultimately will still need regulator. But try to postpone to NNLL level.
Peter Skands A Guide to Hadron Collisions - 24 Z 4 Matching by multiplication ►Starting point: LL shower w/ large coupling and large finite terms to generate “trial” branchings (“sufficiently” large to over-estimate the full ME). Accept branching [i] with a probability ►Each point in 4-parton phase space then receives a contribution Sjöstrand-Bengtsson term 2 nd order matching term (with 1 st order subtracted out) (If you think this looks deceptively easy, you are right) Note: to maintain positivity for subleading colour, need to match across 4 events, 2 representing one color ordering, and 2 for the other ordering
Peter Skands A Guide to Hadron Collisions - 25 The Z 3 1-loop term ►Second order matching term for 3 partons ►Additive (S=1) Ordinary NLO subtraction + shower leftovers Shower off w 2 (V) “Coherence” term: difference between 2- and 3-parton (power-suppressed) evolution above Q E3. Explicit Q E -dependence cancellation. δ α : Difference between alpha used in shower (μ = p T ) and alpha used for matching Explicit scale choice cancellation Integral over w 4 (R) in IR region still contains NLL divergences regulate Logs not resummed, so remaining (NLL) logs in w 3 (R) also need to be regulated ►Multiplicative : S = (1+…) Modified NLO subtraction + shower leftovers A*S contains all logs from tree-level w 4 (R) finite. Any remaining logs in w 3 (V) cancel against NNLO NLL resummation if put back in S
Peter Skands A Guide to Hadron Collisions - 26 General 2 nd Order (& NLL Matching) ►Include unitary shower (S) and non-unitary “K-factor” (K) corrections K: event weight modification (special case: add/subtract events) Non-unitary changes normalization (“K” factors) Non-unitary does not modify Sudakov not resummed Finite corrections can go here ( + regulated logs) Only needs to be evaluated once per event S: branching probability modification Unitary does not modify normalization Unitary modifies Sudakov resummed All logs should be here Needs to be evaluated once for every nested 2 4 branching (if NLL) Addition/Subtraction: S = 1, K ≠ 1 Multiplication/Reweighting: S ≠ 1 K = 1 Hybrid: S = logs K = the rest
Peter Skands A Guide to Hadron Collisions - 27 ►Can vary evolution variable, kinematics maps, radiation functions, renormalization choice, matching strategy (here just varying splitting functions) ►At Pure LL, can definitely see a non-perturbative correction, but hard to precisely constrain it VINCIA in Action Giele, Kosower, PS : PRD78(2008) Les Houches ‘NLM’ 2007
Peter Skands A Guide to Hadron Collisions - 28 ►Can vary evolution variable, kinematics maps, radiation functions, renormalization choice, matching strategy (here just varying splitting functions) ►At Pure LL, can definitely see a non-perturbative correction, but hard to precisely constrain it VINCIA in Action Giele, Kosower, PS : PRD78(2008) Les Houches ‘NLM’ 2007
Peter Skands A Guide to Hadron Collisions - 29 ►Can vary evolution variable, kinematics maps, radiation functions, renormalization choice, matching strategy (here just varying splitting functions) ►After 2 nd order matching Non-pert part can be precisely constrained. (will need 2 nd order logs as well for full variation) VINCIA in Action Giele, Kosower, PS : PRD78(2008) Les Houches ‘NLM’ 2007
Peter Skands A Guide to Hadron Collisions - 30 The next big steps ►Z 3 at one loop Opens multi-parton matching at 1 loop Required piece for NNLO matching If matching can be exponentiated, opens NLL showers ►Work in progress Write up complete framework for additive matching NLO Z 3 and NNLO matching within reach Finish complete framework multiplicative matching … Complete NLL showers slightly further down the road ►Then… Initial state, masses, polarization, subleading color, unstable particles, … ►Also interesting that we can take more differentials than just δμ R Something to be learned here even for estimating fixed-order uncertainties?