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Mass and Spin from a Sequential Decay with a Jet and Two Leptons. Michael Burns University of Florida Advisor: Konstantin T. Matchev Collaborators: Kyoungchul (KC) Kong, Myeonghun Park. Burns, Matchev, Park, JHEP 189P 0309 (submitted) [arXiv:0903.4371 [hep-ph]].
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Mass and Spin from a Sequential Decay with a Jet and Two Leptons Michael Burns University of Florida Advisor: Konstantin T. Matchev Collaborators: Kyoungchul (KC) Kong, Myeonghun Park Burns, Matchev, Park, JHEP 189P 0309 (submitted) [arXiv:0903.4371 [hep-ph]] Burns, Kong, Matchev, Park, JHEP 019P 1108 (accepted) [arXiv:0810.5576 [hep-ph]] Burns, Kong, Matchev, Park, JHEP10(2008)081 (published) [arXiv:0808.2472 [hep-ph]]
Contents • New Physics and Sequential Decays • Mass Determination • Kinematical Endpoint Method • Kinematical Boundaryline Method • Spin Determination • Chiral Projections • Basis Functions • Reparametrization
“old” physics: “new” physics, “DCBA”: New Physics and Sequential Decays • At LHC: colored particle production (j), unknown energy and longitudinal momentum (D) • Assume OSSF leptons (ln, lf), missing transverse momentum (A) • What is the new physics (assuming the chain “DCBA”)? • What are the masses of A,B,C,D? • What are their spins?
Particle Combinations m2jln m2jlf m2ll m2jll For mass determination: For spin determination:
Method of Kinematical Endpoints [Bachacou, Hinchliffe, Paige (1999), Figs. 1 and 4] Use extreme kinematical values of invariant mass. (“model-independent”) These values depend on spectrum of A,B,C,D … … however, the dependence is piecewise-defined. Offshell B: Njl = 4 [Allanach, Lester, Parker, Webber (2000), Tab. 4, Gjelsten, Miller, Osland (2004), Eqs. 4.3-9, etc.]
Inversion and Duplication These inversion formulas use the jll threshold! • Experimental ambiguity • Finite statistics, resolution -> “border effect” • Background -> “dangerous feet/drops” • Piecewise defintions: hmm… largely ignored • Inversion formulas depend on unknown spectrum • Ambiguity DOES occur! [Burns, Matchev, Park (2009), Eqs. 2.23-6]
Example Duplication [Burns, Matchev, Park (2009), Tab. 2] How to resolve? We have a technique: boundarylines [Burns, Matchev, Park (2009)]
easy to see restricted ( ) distribution Two Variable Distribution: -------- We know the expression for the hyperbola. [Burns, Matchev, Park (2009), Fig. 10]
Two Variable Distribution: ---------- MAIN POINT: shapes of kinematical boundaries reveal Region => no more piecewise ambiguity (from perfect experiment). Njl = 3 [Burns, Matchev, Park (2009), Figs. 7,8] Njl = 4 Njl = 2 Njl = 1
(mjl(hi),mjl(lo)) Resolves Ambiguity = 212 GeV = 212 GeV = 122 GeV = 122 GeV = 200 GeV = 200 GeV = 149 GeV = 149 GeV [Burns, Matchev, Park (2009), Fig. 9]
Spin Assignments Assume q/qbar jet for spin analysis S = scalar F = spinor V = vector final-state SM fermions => spin change (+/-)1/2 at each vertex
Spins and Chiral Projections IJ=11 IJ=12 IJ=22 IJ=21 Four helicity groupings, depending on RELATIVE (physical) helicities of the jet and two leptons. -> four “basis functions” I: relative helicity b/w j and ln J: relative helicity b/w ln and lf spin of antifermion is “opposite of the spinor”?
“Near-type” Distributions [Burns, Kong, Matchev, Park (2008), Tab. 7] The arrow subscripts indicate the relative helicities of the final-state SM fermions. BOTH HELICITY COMBINATIONS CONTRIBUTE! (Notice from the table what happens for equal helicity contributions.) (“near-type” applies in SM: top decay)
Observable Spin Distributions “cleverly” redefine spin basis functions (like change of basis) Relevant coefficients are the following combinations of couplings: Distribution decomposed into model-dependent (a, b, g) and model-independent (S) contribution [Burns, Kong, Matchev, Park (2008), various eqs.]
Observable Spin Distributions Dilepton: purely “near-type” (nice) Only one model-dependent parameter (for each spin case): a !!! Get as much use out of this one as possible (as usual). [Burns, Kong, Matchev, Park (2008), Tab. 4] Jet-lepton: must include “near-type” and “far-type” together, piecewise defined D gives charge assymtery; fits to independent model parameters b and g S fits to same a as L !!! extra constraint So, in addition to spin, get three measurements of the couplings through a, b, g – extra model determination. [Burns, Kong, Matchev, Park (2008), various eqs.]
Dbg La Sa Example: SPS1a We generated “data” from DCBA = SFSF, assuming [Burns, Kong, Matchev, Park (2008), Figs. 4,5,6] The fits were determined by minimizing:
Other Spin Assignments Dbg seems the most promising to discriminate the SPS1a model. However, the most discriminating distribution depends on the masses and spins of the true model. Some models cannot even be discriminated, in principle (using our method). [Burns, Kong, Matchev, Park (2008), Tab. 5] (This does not imply that our method is bad; just general.)
Summary • Mass determination: • We have inversion formulas using jll threshhold. • We identified the ambiguous endpoint Regions. • We devised the kinematical boundaryline method, which resolves the ambiguity (ideally). • Spin determination: • We devised a method that allows the model-dependent parameters to float. • We found a convenient spin basis for these floating parameters. • We identified the problem scenarios (fakers).
Appendix: OF Subtraction (leptons) [ATLAS TDR (1999), Figs. 20-9,20-10] desired signal: chi20 - chi10 = 68 GeV event selection: 2 OSSF leptons and four “pT-hard” jets [Hinchliffe, Paige, Shapiro, Soderqvist, Yao (1996), Figs. 15,16] basically same as above
Appendix: ME Subtraction (jets) [Ozturk (2007), Fig. 2] jet+lepton distribution desired signal: (different from ours) squark - sneutrino = 284 GeV event selection: one lepton and two “pT-hard” jets
in (.,1) Appendix: Regions & Configurations in rest-frame of C: [Burns, Matchev, Park (2009), Fig. 2] [Miller, Osland, Raklev (2005), Figs. 2,12] (1,.) and (5,.) (2,.) (3,.) (4,.) and (6,.) independently of frame: in rest-frame of B:
Background Background Appendix: Dangerous Feet/Drops [based on Miller, Osland, Raklev (2005), Figs. 10]
Appendix: Inversion Variables [Burns, Matchev, Park (2009), Eqs. 2.28-31]
Appendix: Duplication Maps [Burns, Matchev, Park (2009), Fig. 3]
Appendix: (mjll,mll) [Burns, Matchev, Park (2009), Fig. 11]
Appendix: “Near-type” Basics C’B’A’ = { SFS , SFV , FSF , FVF , VFS , VFV } One of either I or J is irrelevant. C’B’A’fbfa = { CBAlnlf , DCBjln }. Only the relative helicity between fa and fb is important. Chiral projections allow helicities to be selected by the couplings (because f’s are massless), so that matrix element can be spin-summed. • Spin dependence requires either: • chiral imbalance (gL/=gR) at both vertices, or • B’=V.
Appendix: “far-type” log behavior It comes from the Jacobian of the transformation from angles to masses, and the kinematical boundary of the angular variables. [Miller, Osland, Raklev (2006)]
Appendix: FSFS vs. FSFV FSFV always fakes FSFS. FSFS can also fake FSFV for some mass spectra. The only condition is: [Burns, Kong, Matchev, Park (2008), Figs. 4,5,6] example of unavoidable false-positive for FSFS, given FSFV
Appendix: FVFS vs. FVFV FVFV always fakes FVFS. FVFS can also fake FVFV for some mass spectra. The conditions are: [Burns, Kong, Matchev, Park (2008), Figs. 4,5,6] example of unavoidable false-positive for FVFS, given FVFV
