Add to ORKGWe present a tomographic method which requires only 4d-3 measurement outcomes to reconstruct any pure quantum state of arbitrary dimension d. Using the proposed scheme, we have experimentally reconstructed a large number of pure states of dimension d=7, obtaining a mean fidelity of 0.94. Moreover, we performed numerical simulations of the reconstruction process, verifying the feasibility of the method for higher dimensions. In addition, the a priori assumption of purity can be certified within the same set of measurements, which represents an improvement with respect to other similar methods and contributes to answering the question of how many observables are needed to uniquely determine any pure state.Universidad de Buenos AiresConsejo Na...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...
We present a tomographic method which requires only $4d-3$ measurement outcomes to reconstruct \emph...
We present a proof-of-principle demonstration of a method to characterize any pure spatial qudit of ...
We present a proof-of-principle demonstration of a method to characterize any pure spatial qudit of ...
We present a proof-of-principle demonstration of a method to characterize any pure spatial qudit of ...
We present a proof-of-principle demonstration of a method to characterize any pure spatial qudit of ...
Quantum-state tomography (QST) is a fundamental task for reconstructing unknown quantum state from s...
In this study, we present a new procedure for quantum state reconstruction of qudit quantum state ba...
Extracting information from quantum devices has long been a crucial problem in the field of quantum ...
Recently quantum tomography has been proposed as a fundamental tool for prototyping a few qubit quan...
Recently quantum tomography has been proposed as a fundamental tool for prototyping a few qubit quan...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...
We present a tomographic method which requires only $4d-3$ measurement outcomes to reconstruct \emph...
We present a proof-of-principle demonstration of a method to characterize any pure spatial qudit of ...
We present a proof-of-principle demonstration of a method to characterize any pure spatial qudit of ...
We present a proof-of-principle demonstration of a method to characterize any pure spatial qudit of ...
We present a proof-of-principle demonstration of a method to characterize any pure spatial qudit of ...
Quantum-state tomography (QST) is a fundamental task for reconstructing unknown quantum state from s...
In this study, we present a new procedure for quantum state reconstruction of qudit quantum state ba...
Extracting information from quantum devices has long been a crucial problem in the field of quantum ...
Recently quantum tomography has been proposed as a fundamental tool for prototyping a few qubit quan...
Recently quantum tomography has been proposed as a fundamental tool for prototyping a few qubit quan...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...
For any finite-dimensional Hilbert space, we construct explicitly five orthonormal bases such that t...