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Suppression exponent for multiparticle production in $\lambda\phi^{4}$ theory

High Energy Physics - Phenomenology 2023-02-27 v1 High Energy Physics - Theory

Abstract

We compute the probability of producing nn particles from few colliding particles in the unbroken (3+1)(3+1)-dimensional λϕ4\lambda\phi^4 theory. To this end we numerically implement semiclassical method of singular solutions which works at n1{n \gg 1} in the weakly coupled regime λ1{\lambda \ll 1}. For the first time, we obtain reliable results in the region of exceptionally large final state multiplicities nλ1{n\gg \lambda^{-1}} where the probability decreases exponentially with nn, P(\mboxfewn)exp{f(ε)n}{{\cal P}(\mbox{few} \to n) \sim \exp\{f_\infty(\varepsilon) \, n\}}, and its slope f<0f_{\infty}< 0 depends on the mean kinetic energy ε\varepsilon of produced particles. In the opposite case nλ1{n\ll \lambda^{-1}} our data match well-known tree-level result, and they interpolate between the two limits at nλ1n \sim \lambda^{-1}. Overall, this proves exponential suppression of the multiparticle production probability at n1{n\gg 1} and arbitrary ε\varepsilon in the unbroken theory. Using numerical solutions, we critically analyze the mechanism for multiple Higgs boson production suggested in the literature. Application of our technique to the scalar theory with spontaneously broken symmetry can eradicate (or confirm) it in the nearest future.

Cite

@article{arxiv.2212.03268,
  title  = {Suppression exponent for multiparticle production in $\lambda\phi^{4}$ theory},
  author = {S. V. Demidov and B. R. Farkhtdinov and D. G. Levkov},
  journal= {arXiv preprint arXiv:2212.03268},
  year   = {2023}
}

Comments

38 pages, 24 figures, 1 table, 3 ancillary data files, 3 videos

R2 v1 2026-06-28T07:24:06.980Z