XCone: N-jettiness as an exclusive cone jet algorithm

Stewart, Iain W.; Tackmann, Frank J.; Thaler, Jesse; Vermilion, Christopher K.; Wilkason, Thomas

doi:10.1007/jhep11(2015)072

Cited by 54 publications

(79 citation statements)

References 154 publications

(330 reference statements)

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“…with p = 1/2 [13,14]. The motivation behind this choice has been explained in [12] (see also [15,16]) and is related to the fact that, since it preserves the ordering in mass, it produces results very close to the much more complex minimal axes. 4 Since weak bosons radiate less than QCD jets, the ratio τ 21 = τ 2 /τ 1 is expected to be smaller for weak bosons and one imposes a cut τ 21 < τ cut as a radiation constraint to distinguish weak bosons from the QCD background.…”

Section: A Tagger a Groomer And A Jet Shapementioning

confidence: 99%

Dichroic subjettiness ratios to distinguish colour flows in boosted boson tagging

Salam

Schunk

Soyez

2017

J. High Energ. Phys.

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N -subjettiness ratios are in wide use for tagging heavy boosted objects, in particular the ratio of 2-subjettiness to 1-subjettiness for tagging boosted electroweak bosons. In this article we introduce a new, dichroic ratio, which uses different regions of a jet to determine the two subjettiness measures, emphasising the hard substructure for the 1-subjettiness and the full colour radiation pattern for the 2-subjettiness. Relative to existing N -subjettiness ratios, the dichroic extension, combined with SoftDrop (pre-)grooming, makes it possible to increase the ultimate signal significance by about 25% (for 2 TeV jets), or to reduce non-perturbative effects by a factor of 2−3 at 50% signal efficiency while maintaining comparable background rejection. We motivate the dichroic approach through the study of Lund diagrams, supplemented with resummed analytical calculations.

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Section: A Tagger a Groomer And A Jet Shapementioning

confidence: 99%

Dichroic subjettiness ratios to distinguish colour flows in boosted boson tagging

Salam

Schunk

Soyez

2017

J. High Energ. Phys.

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“…The minimum inside of T 1 partitions the event into an unclustered (or "beam") region and a jet region, and after minimizing overn, the jet region is exactly conical (for massless particles) with radius ≃ R. This approach has been generalized to Njettiness jet finding through the XCone jet algorithm [16,17].…”

Section: Review Of Jet Algorithmsmentioning

confidence: 99%

“…In the jet function approach using (16), there are three candidate jets to consider: particle 1 alone, particle 2 alone, or particles 1 and 2 together. The corresponding jet function values are…”

Section: Two Particle Case Studymentioning

confidence: 99%

“…Alternatively, one might be content with only finding a local T 1 minimum. For example, XCone [16,17] searches for local T 1 minima using IRC safe seeds based on k T -style clustering [21,22], leading to the clustering condition…”

Section: Two Particle Case Studymentioning

confidence: 99%

“…The jet function approach is implemented with the J ET algorithm [5], which finds jets ordered by (30) but we take the hardest jet by p T . The 1-jettiness approach is implemented with XCone [16,17], using (31) with β = 2. 4 The stable cone approach is implemented with SISCone-PR [12,18], taking the hardest jet by p T .…”

Section: Differences At the Lhcmentioning

confidence: 99%

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Jet maximization, axis minimization, and stable cone finding

Thaler

2015

Phys. Rev. D

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Jet finding is a type of optimization problem, where hadrons from a high-energy collision event are grouped into jets based on a clustering criterion. As three interesting examples, one can form a jet cluster that (1) optimizes the overall jet four-vector, (2) optimizes the jet axis, or (3) aligns the jet axis with the jet four-vector. In this paper, we show that these three approaches to jet finding, despite being philosophically quite different, can be regarded as descendants of a mother optimization problem. For the special case of finding a single cone jet of fixed opening angle, the three approaches are genuinely identical when defined appropriately, and the result is a stable cone jet with the largest value of a quantity J. This relationship is only approximate for cone jets in the rapidity-azimuth plane, as used at the Large Hadron Collider, though the differences are mild for small radius jets.

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Calculating soft radiation at one loop

Kasemets

Waalewijn

Zeune

2016

J. High Energ. Phys.

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We present an efficient way to calculate the effect of soft QCD radiation at one loop, which is needed for predictions at next-to-next-to-leading logarithmic accuracy. We use rapidity coordinates and isolate the divergences in the integrand. By performing manipulations with cumulative variables, we avoid complications from plus distributions. We address rapidity divergences, divergences with an azimuthal dependence, complicated jet boundaries and multi-differential measurements. The process and measurements can be easily adjusted, as we demonstrate by reproducing many existing soft functions. The results for a general LHC process with multiple Wilson lines are obtained by treating Wilson lines that are not back-to-back using a boost. We also obtain, for the first time, the N -jettiness soft function for generic jet angularities, and the collinear-soft function for the measurement of two angularities.

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XCone: N-jettiness as an exclusive cone jet algorithm

Cited by 54 publications

References 154 publications

Dichroic subjettiness ratios to distinguish colour flows in boosted boson tagging

Dichroic subjettiness ratios to distinguish colour flows in boosted boson tagging

Jet maximization, axis minimization, and stable cone finding

Calculating soft radiation at one loop

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