Abstract
The $X(3872)$ resonance has been conjectured to be a $J^{PC} = 1^{++}$ charm meson-antimeson two-body molecule. Meanwhile, there is no experimental evidence for larger, few-body compounds of multiple charm meson-antimeson pairs which would resemble larger molecules or nuclei. Here, we investigate such multi-meson states to the extent of what can be deduced theoretically from essentials of the interaction between uncharged $D^{0}$ and $D^{*0}$ mesons. From a molecular $X(3872)$, we predict a $4X$ ($4^{++}$) octamer with a binding energy \mbox{$B_{4X} > 2.08\,{\rm MeV}$,} assuming a $D^{*0} \bar{D}^0$ system close to the unitary limit (as suggested by the mass of the $X(3872)$). If we consider heavy-quark spin symmetry explicitly, the $D^{*0} \bar{D}^{*0}$ ($2^{++}$) system is close to unitarity, too. In this case, we predict a bound $3X$ ($3^{++}$) hexamer with $B_{3X} > 2.29\,{\rm MeV}$ and a more deeply bound $4X$ octamer with $B_{4X} > 11.21\,{\rm MeV}$. These results exemplify with hadronic molecules a more general phenomenon of equal-mass two-species Bose systems comprised of equal number of either type: the emergence of unbound four- and six-boson clusters in the limit of a short-range two-body interaction which acts only between bosons of different species. Finally, we also study the conditions under which a $2X$ ($2^{++}$) tetramer might form.
Highlights
Systems of particles with a two-body scattering length a significantly larger than the interaction range R (a ≫ R) share a series of common/universal properties, which encompass a multitude of phenomena in atomic, nuclear, and particle physics [1]
This reduces the number of relevant states from six to two, 3Antisymmetric combinations—the nuclear analog are protonproton or neutron-neutron spin-1 contributions to, e.g., 4He— demand an odd angular momentum with a perturbatively small effect in the leading-order framework employed in this work
Assuming the charm meson-antimeson interaction in the X-channel to dominate, i.e., with the average interactions (10)–(12), we find solutions to (18) of the four-body (2X) and six-body (3X) systems to be unbound
Summary
Systems of particles with a two-body scattering length a significantly larger than the interaction range R (a ≫ R) share a series of common/universal properties, which encompass a multitude of phenomena in atomic, nuclear, and particle physics [1]. This invariance with respect to a continuous scale transformation, holds strictly only in the two-body sector. In the few-body spectrum, this continuous scale invariance survives only partially in a discrete version An example of this is the Efimov effect [2], i.e., the appearance of a geometric bound-state spectrum of three-boson systems in the unitary limit (a=R → ∞). We predict that a DÃ0D Ã0 interaction close to the unitary limit, will stabilize the hexamer and induce the transition from a Brunnian to a Borromean system (a still unbound tetramer with a hexamer resembling a Borromean bound state of X’s)
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