In this article, we introduce a simple variational model describing the ground state of a superconducting charge qubit. The model gives rise to a shape optimization problem that aims at maximizing the number of qubit states at a given gating voltage. We show that for small values of the charge, optimal shapes exist and are C2, alpha-nearly spherical sets. In contrast, we prove that balls are not minimizers for large values of the charge and conjecture that optimal shapes do not exist, with the energy favoring disjoint collections of sets.
Mazzoleni, D., Muratov, C.B., Ruffini, B. (2025). An optimal design problem for a charge qubit. COMMUNICATIONS IN PARTIAL DIFFERENTIAL EQUATIONS, 50(8), 1029-1073 [10.1080/03605302.2025.2511919].
An optimal design problem for a charge qubit
Ruffini B.
2025
Abstract
In this article, we introduce a simple variational model describing the ground state of a superconducting charge qubit. The model gives rise to a shape optimization problem that aims at maximizing the number of qubit states at a given gating voltage. We show that for small values of the charge, optimal shapes exist and are C2, alpha-nearly spherical sets. In contrast, we prove that balls are not minimizers for large values of the charge and conjecture that optimal shapes do not exist, with the energy favoring disjoint collections of sets.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
