Direct measurement of large-scale quantum states

Eliot Bolduc, Genevieve Gariepy, Jonathan Leach

Published 2015-06-02Version 1

In quantum mechanics, predictions are made by way of calculating expectation values of observables, which take the form of Hermitian operators. It is far less common to exploit non-Hermitian operators to perform measurements. Here, we show that the expectation values of a particular set of non-Hermitian matrices, which we call column operators, directly yield the complex coefficients of a quantum state vector. We provide a definition of the state vector in terms of measurable quantities by decomposing the column operators into observables. The technique we propose renders very-large-scale quantum states significantly more accessible in the laboratory, as we demonstrate by experimentally characterising a 100 000-dimensional entangled state. This represents an improvement of two orders of magnitude with respect to previous characterisations of discrete entangled states. Furthermore, we show that we can reliably extract the most significant contribution to a quantum state, even in the presence of substantial noise. We anticipate that our method will prove to be a useful asset in the quest for understanding and manipulating large-scale quantum systems.