Production and Evolution of High Energy Jets

About This Presentation

Title:

Production and Evolution of High Energy Jets

Description:

Production and Evolution of High Energy Jets Outline (both lectures) A look at the data Theoretical framework Inclusive Jet Cross sections Multijet Events – PowerPoint PPT presentation

Number of Views:120

Avg rating:3.0/5.0

Slides: 113

Provided by: psu94

Learn more at: http://cteq.org

Category:

more less

Transcript and Presenter's Notes

Title: Production and Evolution of High Energy Jets

1

Production and Evolution of High Energy Jets
Outline (both lectures)
A look at the data
Theoretical framework
Inclusive Jet Cross sections
Multijet Events
Double Parton Scattering
Underlying Event
Clustering algorithms
Structure inside jets
Overall Theme Interplay of Theory and
Measurements

Day 1
Day 2
2
Simple view of a proton - antiproton collision
jet
y
detector
x
?
p
p
z

Pseudo-rapidity
- ln tan ?/2
Simple translation
(additive) under
longitudinal boosts

jet

2?2 scattering
Two partons are produced from the collision of a
parton in each of the incoming hadrons
Initial partons have a fraction, x, of proton
(antiprotion)
longitudinal momentum and small 0 transverse
momentum.
Each outgoing parton forms one jet
Events are characterized by x and Q2, where Q is
the total momentum transfer ETjet

3
Jets at Fermilab Hadron Collider

Fermilab Tevatron collides protons and
antiprotons at
vs 1.96 GeV
(was 1.8 TeV in Run 1)
These collisions produce the highest energy jets
(ET500 GeV)
Probes proton structure to smallest distance
scales
? hc/Mc2
197MeVfm/500 GeV
4x10-17cm

p
Hadronic
Electromagnetic
Jet ET Sum of towers 415 GeV
p
4
Regions Covered by Different Measurements

Tevatron data overlaps and extends reach of DIS
(talks by Jose Repond)
This talk concentrates on jet production at the
Tevatron.

5
What is a Jet?

Jets are the clusters of particles produced by
the scattered partons
Particles (mostly hadrons) are produced nearly
collinear to parent parton
Underlying Event Remnants of incoming hadrons
leave some low energy particles too. These are
randomly distributed, not in clusters
Fundamental concept Sum up all the daughter
particles and you approximate the properties of
the scattered parton

6
End view of the two-jet event in CDF
Azimuthal angle
?
Tracks in magnetic field
Can measure momentum of charged particles in
tracking chambers. Neutral particles e.g (p0)
are measured only by the calorimeters
7
More complicated events three-jet event

ET 328 GeV
? 0.21
f 2.5o

ET 123 GeV ? 0.23 f 170.4o
ET 173 GeV ? -0.57 f 192.4o
8
A five-jet event
9
6 - jet events
10
From Partons to Jets
Leading Log Approximation (LLA) sum leading
contributions to all orders (from collinear
radiation of quarks and gluons around original
parton)
Leading Order Theory Uses 2?2 matrix elements
Parton Shower
Only two jets in final state Only one parton/jet
11
From Partons to Jets Cont.

Hadronization Each parton in the shower is
converted into colorless hadrons
The hadrons are measured in the tracking chambers
and calorimeters
Sum of the momentum and energy of all the
particles in a cluster
? particle level jet
scattered parton

Clustering (or Jet) algorithms Rules for
combining measured energy into Jets
12
Comparisons between Data and Theory

Overall rate of jet production ( cross sections)
Valid over full ET range (Jet ET 20 GeV 500
GeV)?
Match data for different vs ?
Look for something new and unexpected which
increases the rate of jet production over the
predicted rates
rate of multi( 3, 4, 5...) jet events, can QCD
predict these higher order processes?
Details of event structure
Jet shapes
Structure inside jets
Multiple parton interactions
Use Monte Carlo programs (e.g. ISAJET) to
generate hadrons from LO predictions, and a
detector simulation to derive corrections to data
Compare corrected data to pQCD parton level
predictions
Theory no dependence on empirical parton shower
or hadronization models
Data can minimize and quantify dependence of
corrections on modeling

13
Theoretical predictions at the parton level
fa/A(xa ,?F) Parton Momentum Distributions
(PDF) probability to find parton of type a in
hadron A with momentum fraction xa ?F
4-momentum transfer or factorization scale of
interation

partonic level
cross section

?
14
Rapidity and Pseudo-rapidity
y
scattered parton
x
?
z
antiproton
proton
Rapidity (y)
bcosq tanh y where b p/E
Pseudorapidity (?) high energy limit (mpT, ß ?
1)
Rapidity and Pseudo-rapidity are simply additive
under longitudinal boosts
15
Parton momentum fractions

x1 (e?1 e?2) ET/vs
x2 (e-?1 e-?2) ET/vs

x1 and x2 can not exceed unity ? -ln tan ?/2
xT 2ET/?s and xT2 ltx1x2lt1 As xT ? 1, x1
and x2 are tightly constrained
??boost ½ (??1 ?2) ?? ½ (??1 - ?2) ??Lab
?? ?boost
??1
??1
CM
Lab
?
?2
?2
16
Kinematic Variables

Transverse Energy ET
ET m2 px2 py2 Esin?
E2- pz2

Energy E
E2 m2 p2
ET cosh ?

Momentum p
p2 px2 py2 pz2
Longitudinal momentum
pz E tanh ?
ET sinh ?

Transverse Momentum pT
pT px2 py2 psin?

Invariant Mass for di-jet event
M122 (p1 p2)2
m12 m22 2(E1E2-p1p2)
For m1, m2 ? 0
M122 ? 2ET1ET2(cosh?? cos?f)

17
Phase Space Boundaries for 2 ?2 Scattering
?s 2 TeV and Jet ET 100, 200 and 400 GeV
?2

phase space shrinks
as ET increases
for??1 -?2 , ??boost ? 0
for??1 ?2 , M122 4ET2

??1
18
Leading Order Two-Jet Cross Section
At leading order ET1 ET2 ET

where,
fi(x,?F) (i g, q, q) is the PDF
Mij is lowest order matrix element for ij?2
partons
summed and averaged over initial and
final states
?s(?R) is the strong coupling constant
?F is the factorization scale
?R is the renormalization scale

Usually assume ?F ?R ? ET/2
Many processes contribute
19
Lowest order matrix elements

Matrix elements for

Averaged (summed) over initial (final) state
colors and spins
where s (p1 p2)2, t (p1 - p3)2 and u (
p2-p3)2 are the Mandelstam variables
20
Quark and Gluon contributions to cross section
Solid ?s 2 TeV Dashed ?s 14 TeV

Lowest ET jets from
Tevatron are 20 GeV
or xT 0.02
gluon initial states
dominate
Highest ET jets are
500 GeV or xT 0.5
??qq dominates,
but qg still 20 of total

Fraction of total

xT 2ET/?s

21
The single effective subprocess approximation

All the matrix elements have similar shape
Can approximate the parton momentum distributions
fi(x,?F) (i g, q, q) as a single effective
subprocess

And the lowest order cross section can be written
as
22
Parton Luminosity

In the single effective subprocess approximation
the parton-parton luminosity (x1F(x1,µ)x2F(x2,µ)
) can be written as a function of ??boost and
??

For ET 100 GeV and vs 2TeV
largest luminosity is when x1 and
x2 are equally small ?boost ?? 0
As ?boost or ?? increases
luminosity decreases rapidly

x1F(x1,µ)x2F(x2,µ)
??boost
23
Digression on the scales ?F and ?R

?F and ?R are artifacts of working at fixed order
in perturbation theory.
The predictions should not depend on the choice
of scales (Data doesnt!)
The renormalization scale ?R shows up in the
strong coupling constant because it is introduced
when the bare fields are redefined in terms of
the physical fields
The factorization scale ?F is introduced when
absorbing the divergence from collinear radiation
into the PDFs
Can choose any value for ?F and ?R
Typical choice ?F ?R ET/2 of the jets
Dependence of predictions on scale indicates
potential size of higher order contributions
Dependence on scale should get smaller as higher
order terms are included
Usually study predictions with range ? ET/4 to
2ET

24
Digression on the scales ?F and ?R cont.
as2 for different ?R compared to ?R ET
for different ?F compared to ?F ET at ?1 ?2
0
Ratio
Dependence of LO on choice of scales flat at
10 level for ?ET/2 but normalization uncertain
at 50 level
25
Inclusive Jet Cross Section Measurements

Fundamental and simple test of QCD predictions
Include all jets in the event within a given ?
range
Can search for signs of composite quarks

26
Inclusive Jet Cross Section and Compositeness

Compositeness Scale ?c
?c ?? pointlike quarks
?c ?finite ? substructure
at mass scale of ?c

Hypothesis Quarks are bound states of preons
which interact via new strong interaction

The composite interactions are represented by a
contact term

Compositeness
enhances the jet
cross section
has different ang.
dist. from QCD

27
Measurements of Inclusive Jet Cross Section

In the 80s, only Leading Order 2?2 predictions
were available
High energy Jet data was just becoming available
AFS vs 63 GeV initial hints of 2-jet
structures
UA1 and UA2 vs 546 and 630 GeV , (ET
20-150 GeV)
CDF 1987 vs 1800 (ET 30-250 GeV)
Obviously in the data there were events with more
than 2 jets!
Try to make data and theory look more alike
Parton shower Monte Carlo program ISAJET FF
fragmentation, LLA
Tune parameters of parton shower and
hadronization to give agreement with data
minimizes dependence of corrections on details of
the model.
Defined clustering algorithms which could make
data look like 2?2 process
Summed energy in a large cones R 1 1.2 (cone
algorithm)
Summed neighboring towers (nearest-neighbor
algorithm)

28
Uncertainties

LO Theory
PDFs derived from global fits to data (See talk
by Walter Giele)
Choice of scale for evaluation of as and PDFs
higher order corrections
Total uncertainty ranged from a factor of 2 to a
factor of 10 depending on ET
Experimental Measurement uncertainties
energy scale (could be a whole talk by itself)
luminosity
corrections to go from measured jets to partons
(e.g. energy that escaped the cone or jet
cluster)
underlying event (extra energy that leaked into
cluster)

29
Inclusive Jet Cross Sections from the 80s
UA1 Unc. 70 50 jet corr. 40 jet calib
10 aging 15 lum ?c gt400 GeV
UA2 Unc. 32 25 Frag. model 15 jet id
11 calib 5 lum ?c gt825 GeV
Theory uncertainties mainly on normalization
compositeness limits set based on shape at high ET
CDF 1987 data Exp. Unc. 70 _at_ 30 GeV 34 _at_ 250
GeV ?c gt700 GeV
While data and theory agreed qualitativly, large
uncertainties existed in both theoretical
predictions and in experimental measurements
30
NLO 2?2 Theory predictions

Late 80s NLO parton level predictions became
available
Aversa et al PLB 210,225 (1988), S.Ellis, Kuntz,
Soper, PRL 62,2188(1989) ( EKS)

1 loop, 2 parton final state same kinematics as
LO 1 parton jet
tree level, 3 parton final state or 21 parton
final state
Now have possibility of combining partons to
form a jet. Predictions sensitive to size of jet
and way in which partons are combined
31
NLO 2?2 Theory predictions

Dependence on the choice of scale reduced from
factor of 2 to 30, more precise comparison to
data possible
Ushered in a new era of Jet identification
Could use the same algorithm to cluster partons
into jets as is used to cluster towers of energy
in the detector
Should minimize difference between data and
theory predictions due to technical differences
Led to SNOWMASS accord
cone algorithm to be used by CDF, D0 and Theory
detailed rules for combining towers (partons)
into jets
No out-of-cone energy correction! (part of NLO
prediction)
still have to estimate and subtract UE energy
Other algorithms also exist will be described
later

32
SNOWMASS Algorithm

Choose a seed tower from a list of high ET towers
(partons)
Define a cone of radius R around the seed tower

Towers (partons) within the cone are associated
with the jet. Calculate new cluster centroid
loop over towers again until stable set of
towers is reached. Finally
Snowmass studies (1992) found that for a cone
size of 0.7 out-of-cone energy underlying event
33
Inclusive cross section compared to NLO

CDF collected data in 1989
4pb-1 vs 1800 GeV
8nb-1 vs 546 GeV
Compared to NLO predictions still uncertain due
to scale and PDFs, but better than LO
Statistical uncertainty dominated
above about 200 GeV ET
Set new limit on ?cgt1.4 TeV
CDF also measured jet cross section for different
cone sizes and looked at Jet shapes for 100 GeV
Jets
Interplay between data and theory!

34
Jet cross section dep. on cone size

Jet cross section for
cone sizes 0.4, 0.7, 1.0.
PRL 68 1104 (1992))

µ ET/2 solid µ ET short dash µET/4 long dash

Jet ET 100 GeV
Best agreement with very small scale ET/4
Introduce ad-hoc parameter Rsep which scales
radius for parton merging
?Rparton Rsep R
effectively reduces parton cone size
Snowmass Rsep 2

Rsep 1.3
Theory PRL 69, 3615 (1992)
35
Jet Shape Measurement
DataPRL 70, 713 (1993) Thy PRL 69, 3615 (1992)
Jet ET 100 GeV

Measure energy
inside subcones around jet axis

Rsep 1.3
µ ET/2 solid µ ET short dash µET/4 long dash
ET/4 give worst agreement Rsep 1.3 gives best
agreement with data
F(r) ET(r)/ET(R)
36
Snowmass didnt specify how to separate close
jets (not an issue with partons)

CDF merged close jets if 75 of smaller jet
energy overlapped
otherwise separated based on distance from
centroids
At parton level jets are
separated if ?Rgt2Rcone

ET 123 GeV ? 0.23 f 170.4o
?R 0.88
ET 173 GeV ? -0.57 f 192.4o
37
Separation between jets in CDF data

In data look at separation between leading 3 jets
Plot the minimum separation between the two
closest clusters
50 separated at 1.3 R
100 separated at 1.6R

Rsep of 1.3 makes sense! Explains better match
between data and theory
(divided by R)
38
Effect of Rsep on NLO 2?2 Inclusive Jet Cross
Section Predictions

Cross section for Rsep 2 is larger than for Rsep
1.3 by flat 5

Lessons
Inc. cross section is not very sensitive to Rsep,
but more detailed comparisons pointed out
difference between analysis of data and theory
Details of clustering algorithms are important
for precise comparisons between data an theory

39
More implications of NLO Phase space

The Parton momentum fractions at NLO are

ET 50 GeV vs 1.8 TeV
where ET1 gt ET2gtET3 etc.

Since ET2 can now be lt ET1,
?2 can increase compared to LO
Adding more partons (e.g.NNLO)
further increases allowed range
Still have sharp cutoff on ?1
?2 can be bigger than ?1

?2
?1
40
Compare LO and NLO predictions
K factor NLO/LO 10 for ?lt1.5, away from
PS boundaries Large corrections for large
?2 ?stay away from there, theory not
reliable at LO or NLO
?
41
Scale dependence
LO

where L log(µR/ET) and bi are the beta functions

NLO
NNLO
NNLO coefficient C is unknown. Curves show
guesses C0 (solid) CB2/A (dashed) Dependence
on choice of scale is reduced as higher orders
are included
Usual range
d?/dET at ET 100 GeV
µR /ET
42
Another digression on the scale

Addition of NLO terms reduced dependence of
prediction on scale when choice ranged from ET/4
to 2ET
But, since ET1 and ET2 are no longer required to
be equal we now have to think about which ET
should be used for the scale
µ ? ET of each jet in the event
Many scales per event
Cross section is proportional to as(ET)n, can
extract as from inc. xsec.
µ ? ET1 Maximum Jet ET in the event
one scale per event
can implement in event generator (JETRAD does
this)
Can write the theory both ways Two programs used
by CDF and D0
EKS analytic NLO program uses µ ? ET
JETRAD event generator uses µ ? ETMAX

43
Effect of Scale on NLO 2?2 Inclusive Jet Cross
Section Predictions
44
CDF Run 1A Inclusive Cross Section (1996)

Excess observed above 200GeV
In 1996 all PDFs gave roughly same shape
Motivated discussions of new physics as well and
PDF uncertainties

45
PDF uncertainties 2000
Ratio of inclusive jet cross section for
different PDFs compared to CTEQ4M

Turns out PDFs are very flexible, even at high ET
30 changes in shape are OK
Pretty much squelched discussions of new physics
Ended 15 year history of using Inc. cross
section for compositeness search.
Need more constraints on PDFs!!

46
Alternate Variables Mass and Angle

can write cross section in terms of dijet mass
M12 and the center of mass scattering angle ?

M122 4ET2cosh2? cos ? tanh ? t - (1-cos
? )s/2

Typically measure
dijet mass spectrum d?/dMJJ
by integrating over a fixed angular range
angular distibution d?/dcos?
for intervals of dijet mass

47
Angular Distribution Not sensitive to PDFS

Dominant subprocesses have similar shape for
angular distribution d?/dcos? with different
weights

Can use to test for compositeness with smaller
theoretical uncertainties
Measure angular distribution directly
Measure dijet mass in different angular regions
and
take ratios to cancel PDF uncertainties

48
Angular Distribution and quark substructure
QCD is dominated by 1/(1-cos ?)2 Contact
terms by 1/(1cos ?)2 Difference in forward
? region is hard to measure

Change to a better angular variable

d?/d?
Much more sensitive to contact term
large difference from QCD in central region
49
Limits on Quark Substructure
D0 Run IB results
50
Limits on Quark Substructure
51
Inclusive Jet Cross Section Run Ib

CDF Results
0.1lt?lt0.7

Data and Predictions span 7 orders of magnitude!
52
Inclusive cross section in detail (linear scale)
CDF Run 1B data

Good agreement with data over most of ET range
for CTEQ4HJ predictions
But note CTEQ4HJ was fit to CDF Run 1a data!
Still need more constraints!
See Talk by Walter Giele next week!

53
? dependence of inclusive cross section

D0 result
Solid CTEQ4HJ
Open CTEQ4M
NLO QCD predictions (JETRAD) provide good
description of data.
Agreement gets a little worse as go to higher ?

54
CDF and D0 Comparison

CDF and D0 see fantastic agreement in 0.1lt?lt0.7
range
Note, this is corrected for the different
luminosity cross sections used at the time of the
measurements

55
Inclusive cross section and as
d?/dET ?s(µR )2A ?s(µR )3(B
2b0LA) ?s(µR )4(C 3b0LB
(3b02L2 2b1L)A)

Use inclusive jet cross section data and NLO
theory to extract as (only possible if use µR
?ETjet)
Clearly observe running of as over a wide range
of Jet ET
? ?s(Mz) 0.1178 .0001(stat.) .0081 -.0095
(exp. sys), Thy unc. 5 PDFs, 5 scale

56
END Day 1

Basic theoretical and experimental ingredients
for high ET Jet studies at hadron colliders
A little history of high ET jet measurements
Interplay of data and theory
Sample of the highest ET results from CDF and D0
Tomorrow More detailed look at Jets and Jet
events
A few more high ET jet measurements
Multi- jet events
Double parton scattering
Underlying event
KT clustering algorithm
Structure within jets

57
Production and Evolution of High ET Jets Day 2

Yesterday we looked at events and discussed
comparing data to LO and NLO predictions for 2? 2
scattering (even though we saw events with many
jets!)

NLO 2?2 scattering
2 or 3 partons are produced from the collision
of one parton in each of the incoming hadrons
Initial partons have a fraction of proton
longitudinal momentum and small pT 0
Each outgoing parton forms a jet or 2 partons
combine into one jet

Data and Theory are in pretty good agreement
over large ET range (20-500 GeV) where cross
section falls by 7 orders of magnitude!

58
Production and Evolution of High ET Jets Day 2

Today will describe a more complex (realistic?)
model for the data
Cover some of the details that were glossed over
on Day 1
Inclusive cross sections at different CM energies
Multi jet measurements
Double parton scattering
Underlying Event
Clustering algorithms
Structure within jets

59
Inclusive Cross sections at different CM
ET
XT2ET/vs
60
Scaled Cross Section

Can rewrite inclusive jet cross section in terms
of dimensionless quantity xT
Scaling means predictions are independent of vs

QCD does not scale due to dependence of
strong coupling
constant and parton momentum distributions
on the factorization
and renormalization scales ?R and ?F
In ratio of cross sections many
uncertainties, both theoretical and
experimental will cancel

61
Ratio of scaled cross sections?s 630 GeV / ?s
1800 GeV
Ratio
xT 2ET/?s
Shape of CDF and D0 Data and Theory agree above
xT 0.15,
62
Ratio of cross sections vs 630/vs1800

Uncertainty from PDFs cancels in ratio!
Normalization of NLO predictions do not match
data
Open issue no good explanation

63
Reality (closer) of proton- antiproton collision

Initial state radiation (ISR) incoming parton
emits a gluon extra jets, PT? 0
Final state radiation (FSR) outgoing parton
emits a gluon - extra jets
Remnants of proton and antiproton interact
producing low ET particles (Underlying Event)
Can have collisions between more than one
proton-antiproton pair ?Multiple interactions,
can see multiple verticies in the detector
Can have collisions between more than one parton
within each incoming proton or
antiproton ? double parton interactions

64
Event Generators

Monte Carlo programs such as HERWIG, ISAJET, and
PYTHIA are used today to reproduce all aspects of
the events
All based on LO matrix elements Leading Log
Approximation.
Include the effects of Initial and Final State
radiation
Different parton shower models are used by the
different programs
primary goal is to generate the shower of partons
near the scattered parton direction.
also includes some wide angle radiation which
could produce additional jets.
Hadronization model to covert colored partons to
colorless hadrons
Parton shower and hadronization parameters can be
(are) adjusted to give good agreement with data.
Underlying event
assumed to be similar to Minimum Bias events in
number of particles produced and their PT
spectrum
empirical and parameters can be tuned to give
agreement with the data
Output of these programs is a list of particles
(mostly hadrons) which can be fed into a detector
simulation

65
Fragmentation models

Independent Fragmentation (Feynman-Field) Used
in ISAJET and others
each parton fragments independently
scattered partons shower independently
resulting partons are converted into hadrons
independently
can trace every particle back to original
scattered parton
can tune every aspect to give agreement with
data.
String Fragmentation Used in PTHYIA and others
separate partons are connected by color strings
with uniform energy/unit length
Cluster Fragmentation Used by HERWIG and others
Pairs of color color connected neighboring
partons are combined into color signlets.
Cluster and String models have more physics and
less tunable parameters (see talk by Mrenna)

66
Correcting the data

Generators are essential for correcting the
measured data
energy radiated outside the cluster or cone
underlying event energy that sneaks into the
cluster or cone
feed detector simulations to study detector
response
Try minimize dependence of corrections on MC
model by tuning parameters to data and by using
data where ever possible.
to minimize parton shower/hadronization
differences we usually correct back to particle
level
cluster algorithm is run on generated particles
(hadrons)
derive corrections from difference between energy
measured in the detector and the particle
cluster
Then we compare corrected data to LO or NLO
parton level predictions
? Corrections depend on what you are
comparing to!!
for comparisons to LO an out-of-cone correction
is needed
for NLO no need for out-of-cone, NLO predictions
can throw energy out of the cones.
Can also compare raw data to fully simulated
predictions
disadvantage is that for any new prediction you
need to resurrect and run the full simulation
(generator detector simulation)
These MC models also used in other measurements
(e.g. top mass, Higgs search, etc) to derive
corrections and uncertainties.

67
Multijet events High ET radiation

CDF and D0 have studied event topologies up to 8
Jets
Many kinematic variables examples
?3 scattering angle of 3rd jet
?3 angle between 3-jet plane and plane
containing lead jet and the beam
Compare to QCD Generator Detector simulation
HERWIG - 2?2 matrix elements parton shower
NJETs leading order 2 ? N matrix elements, N
2,...5, N6 uses approximation, ?R partons gt 0.9
Phase space match mNj and mj/mNj to HERWIG

6-Jet events
68
Multijet events (3 jets)

Angular distributions for 3-jet events (CDF)
Phase space is uniform ? most different from
data at edges!
NJETs and HERWIG both pretty close to Data

?3 scattering angle of 3rd jet
angle between 3-jet plane and plane containing
lead jet and the beam.
69
Angular Distributions for 6-Jet events

Successively combine lowest mass jet pairs to
form 3-jet-like event
plot the same angular variables
Phase space is uniform ? divergences at edges
are even
more pronounced than in 3-jet case
NJETs and HERWIG both pretty close to Data
NJETS is closer to data at edges
Amazing that HERWIG can reproduce 6-jet events at
all!

70
Double Parton Scattering

Two partons in each incoming hadron have a hard
collision

m2 (1) if A and B are (in) distinguishable ?eff
process independent contains information
on spatial distribution of partons inside the
proton Uniform large ?eff Lumpy small ?eff
Uniform hard sphere ?eff 11 mb
71
Double Parton Scattering History

Search in 4-jet samples for pairs of uncorrelated
dijet events (m1)
AFS ?eff 5mb Z.Phys. C34, 163 (1987)
UA2 ?eff gt 8.3 mb PLB268, 145(1991)
CDF ?eff 12.1 10.2 -5.4 mb PRD68, 4857
(1993)
hard sphere prediction protons are spherical
and have uniform parton density ?eff 11mb
CDF measurement with Run 1a photon 3 jet data
(16 pb-1)
PRD 56, 3811 (1997), PRL 79, 584 (1997)
Isolated sample of events with 53 with double
parton scattering events
Used low ET jets to maximize cross sections
Extracted result without relying on MC
predictions

72
Double Parton Scattering Photon 3 jets
SP

Look for events with a photon jet event plus an
uncorrelated dijet event
sensitive variable is angle between
photon-jet and jet-jet pair
Photon ET gt 16 GeV
Jet ETgt5 GeV
ET2 , ET3 lt 7 GeV
?R between photon and jets gt 0.8
16853 events with one vertex
5983 events with two pp interactions
(2 vertex)
generated uncorrelated DP models from data
used 2-vertex data sample
photon 1 jet 2-jet event (MIXDP)

73
Double Parton Scattering

Find pairing that minimizes PT imbalance

SP
Data
Measure angle between the pairs ?S Single
parton (SP) scattering peaks at p Double parton
(DP) scattering is flat (uncorrelated to
photon) Fit Data to mixture of SP and DP
DP
Data is 52.6 2.5 0.9 DP! No evidence for
correlations between the two scatters ?eff 14.5
1.7 1.7 2.3 mb
74
Look for correlations in x

Enrich sample
?S gt 1.2 ? 90 DP
Compare data to
model (no correlations)
Data and model agree ?
No observable correlations!

75
Reality (closer) of proton- antiproton collision

Talked about
production of extra jets (Initial and Final
state radiation)
Double parton interactions shown that they
definately exist and rate is consistant with hard
uniform sphere
Multiple proton-antiproton collisions are
identified in trackign chambers by two or more
verticies.
Now the Underlying Event or remnants of proton
and antiproton collision

76
Underlying Event data

Typically jet data is corrected for underlying
event based on estimates from the data
Jet Data
Measure energy in cones located at ?? 90o from
leading jet.
plot energy of Min. and Max. energy separately.
Observe (and expected) energy
in higher ET cone is affected by radiation
from other jets jets are rarely exactly 180 o
apart
Pretty good agreement with HERWIG for min. Cone
Data is higher from Max cone.

Min. Cone
77
Underlying Event Minimum Bias data

Minimum Bias Data
triggered on hits in forward and backward
scintillators
events usually have one vertex and low ET
particles
no obviously discernable jet structure
Min. Bias Data is result of soft collision
between proton and antiproton
Should be similar to interactions of remnants
from a hard collision
Note no sharp cut offs Jets dont suddenly
appear at some threshold.
We cant see very low ET jets because particles
spread out.
CDF measured energy in cones placed randomly in
minimum bias data
? found same energy as in minimum cone
analysis of Jet data
(2.2 GeV)
Note must be careful to correct for additional
interactions MB data had an average of 1.05
int., Jet data had an average of 2.1
Take a large uncertainty (30 ) on Underlying
event energy corrections because it is not well
defined theoretically

78
Underlying Event Models
Min-Bias?

The underlying event in a hard scattering process
has a hard component (particles that arise from
initial final-state radiation and from the
outgoing hard scattered partons) and a soft
component (beam-beam remnants).
However the soft component is color connected
to the hard component so this separation is (at
best) an approximation.

For ISAJET (no color flow) the soft and hard
components are completely independent and the
model for the beam-beam remnant component is the
same as for min-bias but with a larger ltPTgt.
HERWIG breaks the color connection with a soft
q-qbar pair and then models the beam-beam remnant
component the same as HERWIG min-bias (cluster
decay).

79
Underlying Event Multiple Parton Interactions

PYTHIA models the soft component of the
underlying event with color string fragmentation,
but in addition includes a contribution arising
from multiple parton interactions (MPI) in which
one interaction is hard and the other is
semi-hard.

The probability that a hard scattering events
also contains a semi-hard multiple parton
interaction can be varied but adjusting the
cut-off for the MPI.
One can also adjust whether the probability of a
MPI depends on the PT of the hard scattering,
PT(hard) (constant cross section or varying with
impact parameter).
One can adjust the color connections and flavor
of the MPI (singlet or nearest neighbor, q-qbar
or glue-glue).
Also, one can adjust how the probability of a MPI
depends on PT(hard) (single or double Gaussian
matter distribution).

80
Charged particle distributions in data
Underlying Event plateau

Define Df lt 60o as Toward, 60o lt Df lt 120o
as Transverse,
and Df gt 120o as Away.
All three regions have the same size in h-f
space, DhxDf 2x120o 4p/3
Plot the average number of charged particles (PT
gt 0.5 GeV, h lt 1, including jet1) vs Jet1 PT
The solid (open) points are the Min-Bias (JET20)
data. Smooth connection!

81
Transverse PT distributions

Plot the PT distribution of the Transverse
ltNchggt, dNchg/dPT.
for different jet PT
The integral of dNchg/dPT is the Transverse
ltNchggt.
The triangle and circle (square) points are the
Min-Bias (JET20) data.

82
Transverse ltNchggt vs PTJet1
Isajet 7.32
Pythia 6.115
Herwig 5.9

Compare data to the the QCD hard scattering
predictions of HERWIG 5.9, ISAJET 7.32, and
PYTHIA 6.115 (default parameters with PT(hard)gt3
GeV/c).
Tracking eff. has been included in MC predictions

83
ISAJET Transverse Nchg versus PT(jet1)
ISAJET total
Outgoing jets Initial and Final State Radiation
Beam-Beam Remnants

ISAJET 7.32 (default parameters with PT(hard)gt3
GeV/c) .
ISAJET has two categories that contribute to
transverse region
charged particles that arise from the break-up of
the beam and target (beam-beam remnants)
charged particles that arise from the outgoing
jet plus initial and final-state radiation (hard
scattering component).

84
HERWIG Transverse Nchg versus PT1
HERWIG
Beam-Beam Remnants
Outgoing Jets plus Initial Final-State Radiatio
n

HERWIG 5.9 (default parameters with PT(hard)gt3
GeV/c).
HERWIG has two categories
charged particles that arise from the break-up of
the beam and target (beam-beam remnants)
charged particles that arise from the outgoing
jet plus initial and final-state radiation (hard
scattering component).

85
PYTHIA Transverse Nchg versus PT1
PYTHIA
Outgoing Jets plus Initial Final-State Radiatio
n
Beam-Beam Remnants plus Multiple Parton
Interactions

PYTHIA 6.115 (default parameters with PT(hard)gt3
GeV/c).
PYTHIA particles are divided into two categories
charged particles that arise from the break-up of
the beam target (beam-beam remnants including
multiple parton interactions)
charged particles that arise from the outgoing
jet plus initial and final-state radiation (hard
scattering component).

86
Compare Hard Scattering Components
ISAJET
PYTHIA
HERWIG

HERWIG and PYTHIA modify the leading-log picture
to include color coherence effects
leads to angle ordering within the parton
shower
Angle ordering produces less high PT radiation
within a parton shower. (See talk by S. Mrenna)

87
ISAJET TransversePT Distribution
PT(charged jet1) gt 30 GeV/c Transverse ltNchggt
3.7
PT(charged jet1) gt 5 GeV/c Transverse ltNchggt
2.0

Look at PT distribution for jets with ETgt 5 and
30 GeV

88
ISAJET Transverse PT Distribution
PT1gt5GeV
PT1gt30GeV
exp(-2pT)

Dashed curve is the beam-beam remnant component
and the solid curve is the total (beam-beam
remnants plus hard component).

89
HERWIG Transverse PT Distribution
PT(charged jet1) gt 30 GeV/c Transverse ltNchggt
2.2
PT(charged jet1) gt 5 GeV/c Transverse ltNchggt
1.7
90
HERWIG TransversePT Distribution
exp(-2pT)
same

The dashed curve is the beam-beam remnant
component and the solid curve is the total
(beam-beam remnants plus hard component).

91
PYTHIA Transverse PT Distribution
Includes Multiple Parton Interactions
PT(charged jet1) gt 30 GeV/c Transverse ltNchggt
2.9
PT(charged jet1) gt 5 GeV/c Transverse ltNchggt
2.3
Can vary the parameters for Multiple interactions
assumes a varying impact parameter and a
hadronic matter overlap consistent with a
single or double Gaussian matter distribution,
with a smooth turn-off PT0PARP(82)
92
PYTHIA Multiple Parton Interactions
Vary impact parameter Tune to data
Note Multiple parton interactions depend on the
PDFs!
93
Tuned PYTHIA Transverse PT Distribution
Includes Multiple Parton Interactions
PT(charged jet1) gt 30 GeV/c Transverse ltNchggt
2.7
PT(charged jet1) gt 5 GeV/c Transverse ltNchggt
2.3

Tuned PYTHIA CTEQ4L, MSTP(82)4 (hard core),
PT0PARP(82)2.4 GeV/c.

94
Tuned PYTHIA Transverse PT Distribution
Includes Multiple Parton Interactions

PYTHIA 6.115 with PT(hard) gt 0, CTEQ4L,
MSTP(82)4, PT0PARP(82)2.4 GeV/c.
The dashed curve is the beam-beam remnant
component and the solid curve is the total
(beam-beam remnants plus hard component).

95
The Underlying Event Summary Conclusions

ISAJET (FF) produces too many (soft) particles
and the wrong dependence on PT1.
HERWIG and PYTHIA (modified LLA) do a better job
describing the underlying event.
ISAJET and HERWIG do not have enough beam-beam
remnants with PT gt 0.5 GeV/c.
PYTHIA (with multiple parton interactions) has
best description of the underlying event.
Recently an underlying event that depends on
multiple parton interactions was included in
HERWIG.
Multiple parton interactions gives a natural way
of explaining the underlying event in a hard
scattering, and have been observed in photon
jet data
Warning to Top-mass type studies
Multiple parton interactions are very sensitive
to the parton structure functions. You must
first decide on a particular PDF and then tune
the multiple parton interactions to fit the data

96
Fragmentation models and Clustering

Independent Fragmentation (ISAJET)
each parton fragments independently
simple to trace parentage of hadrons
doesnt describe data very well
Cluster Fragmentation (HERWIG)
Pairs of color color connected neighboring
partons are combined into color singlets.
Cant trace parentage of hadrons back to original
partons
Gives generally good agreement with data
Clustering
imposing a cone algorithm conceptually implies
independent fragmentation
Cluster fragmentation suggests imposing a cone
will be artificially cutting color lines
Successive recombination algorithms (e.g. KT)
maybe more natural
Difficulty with KT algorithms is derivation of
corrections for variable size jets ? Recent D0
result

97
Jet Algorithms NLO, NNLO considerations

Jet algorithm should be insensitive to
infrared and collinear divergences
hadronization
logitudinal boosts

Infrared problem adding an infinately soft
parton should not change the number of jets
Collinear problem replacing any parton with a
collinear pair of partons should not change the
number of jets
Note The calorimeter towers the
preclustering (grouping) of towers in a
detector integrate over these effects in the data
Cone Algorithm is Not IR safe at NNLO KT is safe
at all orders
98
KT algorithm at Hadron Colliders

Successively associate pairs of particles
dij min(PTi2,PTj2) ?Rij2/D2
where ?Rij2 (?i ?j)2 (fi fj)2
and for each particle define di PTi2

Uses one parameter D ? minimum separation
between final jets For D1 and Rijltlt1 dij
relative pT (KT)
Find minimum of di and dij ? dmin If dmin
dij ? merge particles If dmin di ? remove i
from particle list and add to jet list Keep going
until all particles are assigned to a
jet. Result list of jets with separation between
them D

Note all particles in a cone of radius R around
the centroid are not necessarily included in the
KT jet and particles far from the centroid can
be included.
99
KT Algorithm

soft and collinear particles are merged first
Final jets separation gt D
D is the only parameter (cone algo has Cone
Radius and Rsep)
KT algo is IR safe to all orders
At LO KT cone (1parton/jet)
At NLO D 1 gives same result as R0.7, Rsep1.3
(Ellis-Soper PRD 48, 3160)
At higher orders this relationship might not
hold

100
Inclusive Jet Cross Section with KT Algo.
D0 KT papers hep-ex/0108054 (PRD) and
hep-ex/0109041 (PRL)
101
KT Algorithm ? Cone in DATA

Cross sections are different at low PT
Match leading two jets in ?-f (?Rlt0.2)
plot PTKT ETcone vs PT

KT jets are more energetic 7 ( 4GeV) at 60
GeV 3 (6 GeV) at 200 GeV
If shift the cone cross section by this measured
difference then the cross sections agree
102
Compare KT and Cone jets with HERWIG

Generate Jet events with HERWIG down to particles
Run KT and Cone algos on particles
match the two leading clusters in ?-f (?Rlt0.2)
and plot the difference

HERWIG shows KT algo picks up more energy than
cone Level is smaller than in data 2 (1) at
60(200)GeV HERWIG flat 2 GeV Data 4 - 6 GeV
Overall uncertainty is 2 on energy scale so
these agree at 2?
103
KT and Cone Jets look inside HERWIG Jets

Look at distance to furthest particle from jet
centroid
KT jets have more particles far from centroid
Cone also has particles outside radius due to
merged jets but at a lower level than KT jets

Number of particles in jet is 30 larger for KT
jets
KT and cone jets are different!
104
Quantify effect of hadronization

Generate HERWIG jets
Compare KT and Cone algos at parton level and
after hadronization particle level for two
leading jets
KT jets pick up more energy than in parton level
by including partons far from the original
parton.
cone jets lose energy outside the cone

Add the HERWIG hadronization effect to the NLO
predictions ? Difference between data and theory
at low pT is reduced ? Remaining difference is
large ? More interplay between data and theory is
needed!
105
Quark and Gluon Jets with the KT algorithm

Quarks and gluons radiate proportional to their
color factors

Expect gluon jets to be broader than quark jets
Gluon jets should have softer fragmentation,
(more low energy particles)

106
Separation of quark and gluon jets

LEP extensive studies of quark-gluon separation
(Bill Garys talk)
At Fermilab we can compare the samples from
different CM energies

For the ET range of 50-60 GeV, HERWIG predicts a
gluon jet fraction of 66 vs 1800 GeV
and 47 vs 630 GeV
107
Quark Gluon separation (D0 analysis)

use the KT algorithm to look for subjet
structures
inside the jets
dij min(pTi2,pTj2) ?Rij2/D2 gt ycutpTjet2
For ycut 1, Nsubjet 1
For ycut ? 0 Nsubjet ? 8
Count the number of subjets and compare to
predictions
Chose fixed ycut 0.001
This corresponds to minimum of 3 of total jet pT
in a subjet

108
Quark Gluon separation and subjets

Plot the number of jets of multiplicity M
normalized by the total number of jets for
different subjet multiplicities at CM 1800 and
630 GeV
The subjet multiplicity M in a sample is a
combination of the multiplicities of quark ( Mq)
and gluon (Mg) jets
M fMg (1-f)Mq
where f is the fraction of gluon jets and (1-f)
is the fraction of quark jets

For two samples with different fractions Mq
f1800M630 f630M1800/(f1800-f630) Mg
(1-f630)M1800- (1-f1800)M630 /(f1800-f630)
109
Quark Gluon separation
110
Compare Subjet Multiplicity to Predictions

HERWIG is in great agreement with data.
? ask Steve Mrenna
to explain how HERWIG can do so well!
Analytic resummed calculation predicts higher
multiplicies in gluon jets
Smaller effect in quark jets

111
QCD in Run II

Run I
20 events with ETgt 400 GeV
Run II
1K events ETgt 400 GeV
100 Events ETgt 490 GeV
Great reach in high x and Q2
search for new physics
test QCD predictions in new regions

Jet ET
112
Summary

Covered a wide variety of topics related to
production and evolution of high energy jets
Inclusive jet cross sections
Multijet production
Double parton scattering
Underlying event
Cone and KT clustering algorithms
Separation of quark and gluon jets
Set stage for upcoming talks
What is in the theory and the event generators
and how well they agree with data
More details on generators from Steve Mrenna
Walter Giele will talk about how to derive new
PDFs
Keep in mind some of these issues when you hear
talks on searches for new physics, the HIGGS,
precision top mass etc.
Main message Experimental and Theoretical
understanding progress together
Run II has new CM energy (1.96 TeV) and lots of
new data!