Add to ORKGPerturbative cross-sections in QCD are beset by logarithms of kinematic invariants, whose arguments vanish when heavy particles are produced near threshold. Contributions of this type often need to be summed to all orders in the coupling, in order to improve the behaviour of the perturbative expansion, and it has long been known how to do this at leading power in the threshold variable, using a variety of approaches. Recently, the problem of extending this resummation to logarithms suppressed by a single power of the threshold variable has received considerable attention. In this paper, we show that such next-to-leading power (NLP) contributions can indeed be resummed, to leading logarithmic (LL) accuracy, for any QCD process with a colour-...
We discuss recent progress concerning the resummation of large logarithms at next-to-leading power (...
It is well known that cross-sections in perturbative QCD receive large corrections from soft and col...
We assess and compare different methods for including leading threshold logarithms at next-to-leadin...
Perturbative cross-sections in QCD are beset by logarithms of kinematic invariants, whose arguments ...
We study next-to-leading-power (NLP) threshold corrections in colour-singlet production processes, w...
Collider observables involving heavy particles are subject to large logarithmic terms near threshold...
Quantum chromodynamics (QCD) is a quantum field theory that describes the strong interactions betwee...
We extend the threshold resummation of the large logarithms $$\ln x$$ which appear in factorization ...
We present a formalism that resums threshold enhanced logarithms to all orders in perturbative Quant...
Accurate and precise theory predictions for collider observables are instrumental for the discovery ...
Resummation of large infrared logarithms in perturbation theory can, in certain circumstances, enhan...
Threshold logarithms become dominant in partonic cross sections when the selected final state forces...
Abstract We extend the threshold resummation of the large logarithms $$\ln x$$ ln x which appear in ...
The main results of this thesis are the introduction of a new and systematic way to treat and resum ...
We investigate QCD threshold resummation effects beyond the next-to-leading logarithmic (NLL) order ...
We discuss recent progress concerning the resummation of large logarithms at next-to-leading power (...
It is well known that cross-sections in perturbative QCD receive large corrections from soft and col...
We assess and compare different methods for including leading threshold logarithms at next-to-leadin...
Perturbative cross-sections in QCD are beset by logarithms of kinematic invariants, whose arguments ...
We study next-to-leading-power (NLP) threshold corrections in colour-singlet production processes, w...
Collider observables involving heavy particles are subject to large logarithmic terms near threshold...
Quantum chromodynamics (QCD) is a quantum field theory that describes the strong interactions betwee...
We extend the threshold resummation of the large logarithms $$\ln x$$ which appear in factorization ...
We present a formalism that resums threshold enhanced logarithms to all orders in perturbative Quant...
Accurate and precise theory predictions for collider observables are instrumental for the discovery ...
Resummation of large infrared logarithms in perturbation theory can, in certain circumstances, enhan...
Threshold logarithms become dominant in partonic cross sections when the selected final state forces...
Abstract We extend the threshold resummation of the large logarithms $$\ln x$$ ln x which appear in ...
The main results of this thesis are the introduction of a new and systematic way to treat and resum ...
We investigate QCD threshold resummation effects beyond the next-to-leading logarithmic (NLL) order ...
We discuss recent progress concerning the resummation of large logarithms at next-to-leading power (...
It is well known that cross-sections in perturbative QCD receive large corrections from soft and col...
We assess and compare different methods for including leading threshold logarithms at next-to-leadin...