Difference between revisions of "Interferometer Heisenberg limit"

The shot noise limit is not fundamental. Here is a simple argument that something better should be possible. Recall that the desired signal at the output of our Mach-Zehnder interferometer is ${\displaystyle X=a^{\dagger }a-b^{\dagger }b}$, and the noise is ${\displaystyle Y=a^{\dagger }b+b^{\dagger }a}$. If the inputs have ${\displaystyle a^{\dagger }a=n}$ and ${\displaystyle b^{\dagger }b=0}$, and if ${\displaystyle Y}$ were zero, then the measured signal would be ${\displaystyle n\cos \phi }$. And at the balanced operating point ${\displaystyle \phi =\pi /2}$,

${\displaystyle {\frac {|\Delta m|}{\Delta \phi }}=n\sin \phi \leq n\,.}$

Thus, if the smallest photon number change resolvable is ${\displaystyle \Delta m=1}$, then ${\displaystyle n\Delta \phi \geq 1}$, from which it follows that

${\displaystyle \Delta \phi \geq {\frac {1}{n}}\,.}$

This is known as the "Heisenberg limit" on interferometry. There are some general proofs in the literature that such a limit is the best possible on interferometry. It governs more than just measurements of phase shifters; gyroscopes, mass measurements, and displacement measurements all use interferometers, and obey a Heisenberg limit.

Heisenberg limited interferometry with entangled states

The argument above only outlines a sketch for why ${\displaystyle 1/n}$ might be an achievable limt, versus ${\displaystyle 1/{\sqrt {n}}}$; it assumes that the noise ${\displaystyle Y}$ can be made zero, however, and does not provide a means for accomplishing this in practice. Many ways to reach the Heisenberg limit in interferometry are now known. Given the basic structure of a Mach-Zehnder interferometer,

one can consider changing the input state ${\displaystyle |\psi _{in}{\rangle }}$, changing the beamsplitters, or changing the measurement.

Common to all of these approaches is the use of entangled states. How entanglement makes Heisenber-limited interferometry possible can be demonstrated by the following setup. Let us replace the beamsplitters in the Mach-Zehnder interferometer with entangling and dis-entangling devices:

Conceptually, the unusual beamsplitters may be the nonlinear Mach-Zehnder interferometers we discussed in Section~2.3. They may also be described by simple quantum circuits, using the Hadamard and controlled-{\sc not} gate; for two qubits, the circuit is

Note how the output is one of the Bell states. For three qubits, the circuit is

This output state, ${\displaystyle |000{\rangle }+|111{\rangle }}$ (suppressing normalization) is known as a GHZ (Greenberger-Horne-Zeilinger) state. Straightforward generalization leads to larger "Schrodinger cat" states ${\displaystyle |00\cdots 0{\rangle }+|11\cdots 1{\rangle }}$, using one Hadamard gate and ${\displaystyle n}$ controlled-{\sc not} gates. Note that the reversed circuit unentangles the cat states to produce computational basis states.

The important feature of such ${\displaystyle n}$-qubit cat states, for our purpose, is how they are transformed by phase shifters. A single qubit ${\displaystyle |0{\rangle }+|1{\rangle }}$ becomes ${\displaystyle |0{\rangle }+e^{i\phi }|1{\rangle }}$. Similarly, two entangled qubits in the state ${\displaystyle |00{\rangle }+|11{\rangle }}$, when sent through two phase shifters, becomes ${\displaystyle |00{\rangle }+e^{2i\phi }|11{\rangle }}$, since the phases add. And ${\displaystyle n}$ qubits in the state ${\displaystyle |00\cdots 0{\rangle }+|11\cdots 1{\rangle }}$ sent through ${\displaystyle n}$ phase shifters becomes ${\displaystyle |00\cdots 0{\rangle }+e^{ni\phi }|11\cdots 1{\rangle }}$.

When such a phase shifted state is un-entangled, using the reverse of the entangling circuit, the ${\displaystyle n}$ controlled-{\sc not} gates leave the state ${\displaystyle |00\cdots 0{\rangle }[|0\rangle +e^{ni\phi }|1\rangle ]}$, where the last ${\displaystyle n-1}$ qubits are left in ${\displaystyle |0{\rangle }}$, and the first qubit (the qubit used as the control for the {\sc cnot} gates) is

${\displaystyle {\frac {|0\rangle +e^{ni\phi }|1{\rangle }}{\sqrt {2}}}\,.}$

Compare this state with that obtained from the single qubit interferometer, Eq.(\ref{eq:l7-1qubitphase}); instead of a phase ${\displaystyle \phi }$, the qubit now carries the phase ${\displaystyle n\phi }$. This means that the probability ${\displaystyle P}$ of measuring a single photon at the output becomes

${\displaystyle P={\frac {1+\cos(n\phi )}{2}}\,.}$

The standard deviation, from repeating this experiment, on average, would be

${\displaystyle \Delta P={\sqrt {P(1-P)}}={\frac {\sin(n\phi )}{2}}\,.}$

Using ${\displaystyle dP/d\phi =-n\sin(n\phi )/2}$, we obtain for the uncertainty in ${\displaystyle \phi }$,

${\displaystyle \Delta \phi ={\frac {\Delta \phi }{\left|{\frac {dP}{d\phi }}\right|}}={\frac {1}{n}}\,,}$

which meets the Heisenberg limit.