In quantum mechanics (and computation & information), weak measurements are a type of quantum measurement that results in an observer obtaining very little information about the system on average, but also disturbs the state very little. From Busch's theorem the system is necessarily disturbed by the measurement. In the literature weak measurements are also known as unsharp, fuzzy, dull, noisy, approximate, and gentle measurements. Additionally weak measurements are often confused with the distinct but related concept of the weak value.
Contents
History
Weak measurements were first thought about in the context of weak continuous measurements of quantum systems (i.e. quantum filtering and quantum trajectories). The physics of continuous quantum measurements is as follows. Consider using an ancilla, e.g. a field or a current, to probe a quantum system. The interaction between the system and the probe correlates the two systems. Typically the interaction only weakly correlates the system and ancilla. (Specifically the interaction unitary need only to be expanded to first or second order in perturbation theory.) By measuring the ancilla and then using quantum measurement theory the state of the system conditioned on the results of the measurement can be determined. In order to obtain a strong measurement many ancilla must be coupled and then measured. In the limit where there is a continuum of ancilla the measurement process becomes continuous in time. This process was described first by: Mensky; Belavkin; Barchielli, Lanz, Prosperi; Barchielli; Caves; Caves and Milburn. Later on Howard Carmichael and Howard M. Wiseman also made important contributions to the field.
It should be noted that the notion of a weak measurement is often misattributed to Aharonov, Albert and Vaidman. In their article they consider an example of a weak measurement (and perhaps coin the phrase "weak measurement") and use it to motivate their definition of a weak value, which was defined for the first time in Ref.
Mathematics
There is no universally accepted definition of a weak measurement. One approach is to declare a weak measurement to be a generalized measurement where some or all of the Kraus operators are close to the identity. The approach taken below is to interact two systems weakly and then measure one of them. After detailing this approach we will illustrate it with examples.
Weak interaction and ancilla coupled measurement
Consider a system which starts in the quantum state
Because it was only necessary to expand the unitary to a low order in perturbation theory, we say this is a weak interaction. Further the fact that the unitary is predominately the Identity operator, as
Now we perform a measurement on the ancilla to find out about the system, this is known as an ancilla-coupled measurement. We will consider measurements in a basis
where
With respect to the Kraus operators the post measurement state of the combined system is
The objects
which we still label by the outcome of the measurement
Example Kraus operators
We will use the canonical example of Gaussian Kraus operators given by Barchielli, Lanz, Prosperi; and Caves and Milburn. Take
The position wavefunction of the ancilla is
The Kraus operators are (compared to the discussion above, we set
while the corresponding POVM elements are
which obey
Notice that
Information gain disturbance tradeoff
As stated above Busch's theorem prevents a free lunch: there can be no information gain without disturbance. However the tradeoff between information gain and disturbance has been characterized by many authors including Fuchs and Peres; Fuchs; Fuchs and Jacobs; and Banaszek.
Recently the information gain disturbance tradeoff relation has been examined in the context of what is called the "Gentle measurement lemma".
Applications
Since the early days it has been clear that the primary use of weak measurement would be for feedback control or adaptive measurements of quantum systems. Indeed, this motivated much of Belavkin's work and an explicit example was given by Caves and Milburn. An early application of an adaptive weak measurements was that of Dolinar's receiver which has been realized experimentally . Another interesting application of weak measurements is to use weak measurements followed by a unitary to synthesize other generalized measurements. Wiseman and Milburn's book is a good reference for many of the modern developments.