TY  - CONF
AU  - Antognini Silva, David
TI  - Materials for quantum computing : Magnetic impurities embedded in superconductors from first principles
M1  - FZJ-2024-00166
PY  - 2023
AB  - In the last decades, immense technological and scientific progress was made thanks to the increasing available calculation power provided by the exponential growth of processor capability. However, the miniaturization of transistors is reaching the physical limits of classical processor architectures. In the future, the next big leap for scientific computing is expected to come from the realization of quantum computers. Making more performant quantum computing platforms requires to overcome challenges of decoherence and dephasing of the qubits that form the building blocks for quantum computers. Topological protection is a viable way towards the realization of fault tolerant qubits.Materials that combine magnetism, spin-orbit interaction and conventional s-wave superconductivity are a suitable platform to study Majorana zero modes (MZM) [1], that can be used as building blocks for fault-tolerant topological qubits. In general, magnetic impurities in superconductors leads to localized Yu-Shiba-Rusinov (YSR) states at the impurity [2]. Understanding their interplay with MZMs is crucial to achieve topological quantum computers in the future. In our work, we implemented the Bogoliubov-de Gennes (BdG) formalism in the juKKR Korringa-Kohn-Rostoker Green function impurity code [3] to allow the material-specific description of defects perfectly embedded  in superconductors from first principles. We apply it to an Fe impurity embedded in bulk Pb in the normal and superconducting state, then analyze the YSR states of different magnetic transition-metal adatoms placed on a superconducting Nb(110) surface where the influence of the impurity-substrate distance on the energy of the YSR states is discussed.[1]    Nadj-Perge et al., Science 346, 6209 (2014).[2]    L. Yu, Acta Physica Sinica 21, 75 (1965); H. Shiba, Prog. Theor. Phys. 40, 435 (1968); A. I. Rusinov, Sov. J. Exp. Theor. Phys. 29, 1101 (1969).[3]    https://iffgit.fz-juelich.de/kkr/jukkr
T2  - EMRS Spring Meeting 2023
CY  - 29 May 2023 - 2 Jun 2023, Strasbourg (France)
Y2  - 29 May 2023 - 2 Jun 2023
M2  - Strasbourg, France
LB  - PUB:(DE-HGF)6
UR  - https://juser.fz-juelich.de/record/1020446
ER  -