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arxiv: 2006.05342 · v3 · pith:SJYUQJT7new · submitted 2020-06-09 · ✦ hep-ph · hep-ex

Triangle Singularity as the Origin of the a₁(1420)

G.D. Alexeev , M.G. Alexeev , A. Amoroso , V. Andrieux , V. Anosov , A. Antoshkin , K. Augsten , W. Augustyniak
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C.D.R. Azevedo B. Badelek F. Balestra M. Ball J. Barth R. Beck Y. Bedfer J. Berenguer Antequera J. Bernhard M. Bodlak F. Bradamante A. Bressan V.E. Burtsev W.-C. Chang C. Chatterjee M. Chiosso A.G. Chumakov S.-U. Chung A. Cicuttin P.M.M. Correia M.L. Crespo D. D'Ago S. Dalla Torre S.S. Dasgupta S. Dasgupta I. Denisenko O.Yu. Denisov S.V. Donskov N. Doshita Ch. Dreisbach W. Duennweber R.R. Dusaev A. Efremov P.D. Eversheim P. Faccioli M. Faessler M. Finger M. Finger jr. H. Fischer C. Franco J.M. Friedrich V. Frolov F. Gautheron O.P. Gavrichtchouk S. Gerassimov J. Giarra I. Gnesi M. Gorzellik A. Grasso A. Gridin M. Grosse Perdekamp B. Grube A. Guskov D. von Harrach R. Heitz F. Herrmann N. Horikawa N. d'Hose C.-Y. Hsieh S. Huber S. Ishimoto A. Ivanov T. Iwata M. Jandek T. Jary R. Joosten P. Joerg E. Kabuss F. Kaspar A. Kerbizi B. Ketzer G.V. Khaustov Yu.A. Khokhlov Yu. Kisselev F. Klein J.H. Koivuniemi V.N. Kolosov K. Kondo I. Konorov V.F. Konstantinov A.M. Kotzinian O.M. Kouznetsov A. Koval Z. Kral F. Krinner Y. Kulinich F. Kunne K. Kurek R.P. Kurjata A. Kveton K. Lavickova S. Levorato Y.-S. Lian J. Lichtenstadt P.-J. Lin R. Longo V.E. Lyubovitskij A. Maggiora A. Magnon N. Makins N. Makke G.K. Mallot A. Maltsev S.A. Mamon B. Marianski A. Martin J. Marzec J. Matousek T. Matsuda G. Mattson G.V. Meshcheryakov M. Meyer W. Meyer Yu.V. Mikhailov M. Mikhasenko E. Mitrofanov N. Mitrofanov Y. Miyachi A. Moretti A. Nagaytsev C. Naim D. Neyret J. Novy W.-D. Nowak G. Nukazuka A.S. Nunes A.G. Olshevskiy M. Ostrick D. Panzieri B. Parsamyan S. Paul H. Pekeler J.-C. Peng M. Pesek D.V. Peshekhonov M. Peskova N. Pierre S. Platchkov J. Pochodzalla V.A. Polyakov J. Pretz M. Quaresma C. Quintans G. Reicherz C. Riedl T. Rudnicki D.I. Ryabchikov A. Rybnikov A. Rychter V.D. Samoylenko A. Sandacz S. Sarkar I.A. Savin G. Sbrizzai H. Schmieden A. Selyunin L. Sinha M. Slunecka J. Smolik A. Srnka D. Steffen M. Stolarski O. Subrt M. Sulc H. Suzuki P. Sznajder S. Tessaro F. Tessarotto A. Thiel J. Tomsa F. Tosello A. Townsend V. Tskhay S. Uhl B.I. Vasilishin A. Vauth B.M. Veit J. Veloso B. Ventura A.Vidon M. Virius M. Wagner S. Wallner K. Zaremba P. Zavada M. Zavertyaev M. Zemko E. Zemlyanichkina Y. Zhao M. Ziembicki
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classification ✦ hep-ph hep-ex
keywords dataresonanceresonance-likesingularitytriangleaxial-vectorcompassexperiment
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The COMPASS experiment recently discovered a new isovector resonance-like signal with axial-vector quantum numbers, the $a_1(1420)$, decaying to $f_0(980)\pi$. With a mass too close to and a width smaller than the axial-vector ground state $a_1(1260)$, it was immediately interpreted as a new light exotic meson, similar to the $X$, $Y$, $Z$ states in the hidden-charm sector. We show that a resonance-like signal fully matching the experimental data is produced by the decay of the $a_1(1260)$ resonance into $K^\ast(\to K\pi)\bar{K}$ and subsequent rescattering through a triangle singularity into the coupled $f_0(980)\pi$ channel. The amplitude for this process is calculated using a new approach based on dispersion relations. The triangle-singularity model is fitted to the partial-wave data of the COMPASS experiment. Despite having less parameters, this fit shows a slightly better quality than the one using a resonance hypothesis and thus eliminates the need for an additional resonance in order to describe the data. We thereby demonstrate for the first time in the light-meson sector that a resonance-like structure in the experimental data can be described by rescattering through a triangle singularity, providing evidence for a genuine three-body effect.

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Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. The $a_1(1420)$ in a Unitary Coupled-Channel Three-Body Approach

    hep-ph 2026-06 unverdicted novelty 5.0

    Unitary coupled-channel three-body model fitted to COMPASS data reproduces the a1(1420) enhancement via triangle singularity, indicating no genuine resonance pole is required.

  2. Effects of Final State Interactions on Landau Singularities

    hep-ph 2024-07 unverdicted novelty 5.0

    Triangle singularities mimicking resonances are analyzed in the presence of final-state rescattering using Landau equations and a scattering formalism enforcing two- and three-body unitarity.