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| Main Authors: | , |
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| Format: | Preprint |
| Published: |
2024
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| Subjects: | |
| Online Access: | https://arxiv.org/abs/2412.11531 |
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Table of Contents:
- We apply the method of QCD sum rules to study the \(QQ\bar{Q}\bar{q}\) and \(QQ\bar{Q}\bar{s}\) tetraquark states, where $Q=c,b$ and $q=u,d$, with the quantum number \(J^P = 0^{+}\). We consider the contributions of vacuum condensates up to dimension-9 in the operator product expansion, and use the energy scale formula \(μ= \sqrt{M_{X}^2 - (i\mathbb{M}_c + j\mathbb{M}_b)^2} - k\mathbb{M}_s\) to determine the optimal energy scales for the QCD spectral densities. Our results indicate that triply charm tetraquark states \(cc\bar{c}\bar{q}\) and \(cc\bar{c}\bar{s}\) have masses in the ranges of $5.38-5.84\,\text{GeV}$ and $5.66-6.16\,\text{GeV}$, respectively. In the bottom sector, triply bottom tetraquark states \(bb\bar{b}\bar{q}\) and \(bb\bar{b}\bar{s}\) have masses in the ranges of $14.89-15.55\,\text{GeV}$ and $14.95-15.66\,\text{GeV}$, respectively. This study could help distinguish these states in upcoming high-energy nuclear and particle experiments.