Mainz 2026 – wissenschaftliches Programm

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Q: Fachverband Quantenoptik und Photonik

Q 14: Precision Spectroscopy of Atoms and Ions I (joint session A/Q)

Q 14.2: Vortrag

Montag, 2. März 2026, 17:30–17:45, N 3

Precision calculation of the bound-electron g factor in molecular hydrogen ions — •Ossama Kullie¹, Hugo Nogueira², and Jean-Philippe Karr^2,3 — ¹Theoretical Physics at Institute for Physics, University of Kassel, Germany — ²Laboratoire Kastler Brossel, Sorbonne Université, CNRS, ENS-Université PSL, Collège de France, 4 place Jussieu, F-75005 Paris, France — ³Université Evry Paris-Saclay, Boulevard François Mitterrand, F-91000 Evry, France

In this work [1], we present calculations of the bound-electron g-factor for a wide range of rovibrational states in the ground electronic state (1sσ) of the molecular hydrogen ions H₂⁺ and HD⁺. Relativistic and QED corrections of orders up to α⁵ are taken into account. All contributions are calculated in a nonrelativistic QED framework, except for relativistic corrections of order (Zα)⁴ and above, which are obtained by calculating the relativistic g-factor using a precise solution of the two-center Dirac equation with FEM [2]. A relative accuracy of ∼ 10⁻¹¹ is achieved for the scalar g-factor component, with an improvement by more than three orders of magnitude over previous calculations. These results are useful for internal state identification and rovibraional spectroscopy of single molecular hydrogen ions in Penning traps, and open a new avenue towards precision tests of QED. Finally, a comparison with experimental result of high-precision Penning-trap spectroscopy of the ground-state spin structure of HD⁺ [2] is given. [1] Ossama Kullie, Hugo D. Nogueira and Jean-Philippe Karr, Phys. Rev. A 112, 052813 (2025). O. Kullie et. al., Phys. Rev. A 105, 052801 (2022). [3] Charlotte M. König et. al., Phys. Rev. Lett. (2025) under review.

Keywords: Atomic and molecular structure; relativistic Dirac equation; relativistic and quantum-electrodynamic effects; Molecules Gyromagnetic ratio; Schroedinger equation and Adiabatic approximation