Threshold resummation for pair production of coloured heavy (s)particles at hadron colliders

119

We consider soft gluon emission corrections to the production of a top-antitop pair in association with a Higgs boson at hadron colliders. In particular, we present a softgluon resummation formula for this production process and gather all elements needed to evaluate it at next-to-next-to-leading logarithmic order. We employ these results to obtain approximate next-to-next-to-leading order (NNLO) formulas, and implement them in a bespoke parton-level Monte Carlo program which can be used to calculate the total cross section along with arbitrary differential distributions. We use this tool to study the phenomenological impact of the approximate NNLO corrections, finding that they increase the total cross section and the differential distributions which we evaluated in this work.

Section: Jhep03(2016)124mentioning

confidence: 99%

Associated production of a top pair and a Higgs boson beyond NLO

Broggio

Ferroglia

Pecjak³

et al. 2016

119

“…We note that in general Coulomb corrections can also be resummed [46][47][48][49][50]. A combined resummation of Coulomb and soft corrections is, however, beyond the scope of this paper.…”

Section: Jhep03(2016)065mentioning

confidence: 99%

Soft gluon resummation for associated t t ¯ H $$ \mathrm{t}\overline{\mathrm{t}}\mathrm{H} $$ production at the LHC

Kulesza

Motyka

Stebel

et al. 2016

We perform resummation of soft gluon corrections to the total cross section for the process pp → ttH. The resummation is carried out at next-to-leading-logarithmic (NLL) accuracy using the Mellin space technique, extending its application to the class of 2 → 3 processes. We present an analytical result for the soft anomalous dimension for a hadronic production of two coloured massive particles in association with a colour singlet. We discuss the impact of resummation on the numerical prediction for the associated Higgs boson production with top quarks at the LHC.

“…In particular, it was shown in ref. [36] that Coulomb singularities and soft singularities factorize in Mellin space in the N → ∞ limit and in the singlet-octet basis: 9) where the factor…”

Section: Coulomb Singularitiesmentioning

confidence: 99%

“…[2,56]. Here we give the final result: The Coulomb functions J I (N, α s ) are computed by taking a Mellin transform of the resummed momentum-space results obtained in the context of pNRQCD [36,38]. For more details about the procedure of this Mellin transformation, see ref.…”

Section: A Coefficients In the Large-n Contributionmentioning

confidence: 99%

Top quark pair production beyond NNLO

Muselli

Bonvini

Forte

et al. 2015

Abstract:We construct an approximate expression for the total cross section for the production of a heavy quark-antiquark pair in hadronic collisions at next-to-next-to-nextto-leading order (N 3 LO) in α s . We use a technique which exploits the analyticity of the Mellin space cross section, and the information on its singularity structure coming from large N (soft gluon, Sudakov) and small N (high energy, BFKL) all order resummations, previously introduced and used in the case of Higgs production. We validate our method by comparing to available exact results up to NNLO. We find that N 3 LO corrections increase the predicted top pair cross section at the LHC by about 4% over the NNLO.