qml.metric_tensor¶

metric_tensor
(tape, approx=None, allow_nonunitary=True, aux_wire=None, device_wires=None)[source]¶ Returns a function that computes the metric tensor of a given QNode or quantum tape.
The metric tensor convention we employ here has the following form:
\[\text{metric_tensor}_{i, j} = \text{Re}\left[ \langle \partial_i \psi(\bm{\theta})  \partial_j \psi(\bm{\theta}) \rangle  \langle \partial_i \psi(\bm{\theta})  \psi(\bm{\theta}) \rangle \langle \psi(\bm{\theta})  \partial_j \psi(\bm{\theta}) \rangle \right]\]with short notation \( \partial_j \psi(\bm{\theta}) \rangle := \frac{\partial}{\partial \theta_j} \psi(\bm{\theta}) \rangle\). It is closely related to the quantum fisher information matrix, see
quantum_fisher()
and eq. (27) in arxiv:2103.15191.Note
Only gates that have a single parameter and define a
generator
are supported. All other parametrized gates will be decomposed if possible.The
generator
of all parametrized operations, with respect to which the tensor is computed, are assumed to be Hermitian. This is the case for unitary singleparameter operations. Parameters
tape (pennylane.QNode or QuantumTape) – quantum tape or QNode to find the metric tensor of
approx (str) –
Which approximation of the metric tensor to compute.
If
None
, the full metric tensor is computedIf
"blockdiag"
, the blockdiagonal approximation is computed, reducing the number of evaluated circuits significantly.If
"diag"
, only the diagonal approximation is computed, slightly reducing the classical overhead but not the quantum resources (compared to"blockdiag"
).
allow_nonunitary (bool) – Whether nonunitary operations are allowed in circuits created by the transform. Only relevant if
approx
isNone
. Should be set toTrue
if possible to reduce cost.aux_wire (int or str or pennylane.wires.Wires) – Auxiliary wire to be used for Hadamard tests. If
None
(the default), a suitable wire is inferred from the (number of) used wires in the original circuit anddevice_wires
.device_wires (wires.Wires) – Wires of the device that is going to be used for the metric tensor. Facilitates finding a default for
aux_wire
ifaux_wire
isNone
.hybrid (bool) –
Specifies whether classical processing inside a QNode should be taken into account when transforming a QNode.
If
True
, and classical processing is detected, the Jacobian of the classical processing will be computed and included. When evaluated, the returned metric tensor will be with respect to the QNode arguments. The output shape can vary widely.If
False
, any internal QNode classical processing will be ignored. When evaluated, the returned metric tensor will be with respect to the gate arguments, and not the QNode arguments. The output shape is a single twodimensional tensor.
 Returns
If the input is a QNode, an object representing the metric tensor (function) of the QNode that takes the same arguments as the QNode and can be executed to obtain the metric tensor (matrix).
If the input is a tape, a tuple containing a list of generated tapes, together with a postprocessing function to be applied to the results of the evaluated tapes in order to obtain the metric tensor.
 Return type
function or tuple[list[QuantumTape], function]
The blockdiagonal part of the metric tensor always is computed using the covariancebased approach. If no approximation is selected, the off blockdiagonal is computed using Hadamard tests.
Warning
Performing the Hadamard tests requires a device that has an additional wire as compared to the wires on which the original circuit was defined. This wire may be specified via
aux_wire
. The available wires on the device may be specified viadevice_wires
.By default (that is, if
device_wires=None
), contiguous wire numbering and usage is assumed and the additional wire is set to the next wire of the device after the circuit wires.If the given or inferred
aux_wire
does not exist on the device, a warning is raised and the blockdiagonal approximation is computed instead. It is significantly cheaper in this case to explicitly setapprox="blockdiag"
.The flag
allow_nonunitary
should be set toTrue
whenever the device with which the metric tensor is computed supports nonunitary operations. This will avoid additional decompositions of gates, in turn avoiding a potentially large number of additional Hadamard test circuits to be run. State vector simulators, for example, often allow applying operations that are not unitary. On a real QPU, setting this flag toTrue
may cause exceptions because the computation of the metric tensor will request invalid operations on a quantum device.Example
Consider the following QNode:
dev = qml.device("default.qubit", wires=3) @qml.qnode(dev, interface="autograd") def circuit(weights): qml.RX(weights[0], wires=0) qml.RY(weights[1], wires=0) qml.CNOT(wires=[0, 1]) qml.RZ(weights[2], wires=1) qml.RZ(weights[3], wires=0) return qml.expval(qml.PauliZ(0) @ qml.PauliZ(1)), qml.expval(qml.PauliY(1))
We can use the
metric_tensor
transform to generate a new function that returns the metric tensor of this QNode:>>> mt_fn = qml.metric_tensor(circuit) >>> weights = np.array([0.1, 0.2, 0.4, 0.5], requires_grad=True) >>> mt_fn(weights) tensor([[ 0.25 , 0. , 0.0497, 0.0497], [ 0. , 0.2475, 0.0243, 0.0243], [0.0497, 0.0243, 0.0123, 0.0123], [0.0497, 0.0243, 0.0123, 0.0123]], requires_grad=True)
In order to save cost, one might want to compute only the blockdiagonal part of the metric tensor, which requires significantly fewer executions of quantum functions and does not need an auxiliary wire on the device. This can be done using the
approx
keyword:>>> mt_fn = qml.metric_tensor(circuit, approx="blockdiag") >>> weights = np.array([0.1, 0.2, 0.4, 0.5], requires_grad=True) >>> mt_fn(weights) tensor([[0.25 , 0. , 0. , 0. ], [0. , 0.2475, 0. , 0. ], [0. , 0. , 0.0123, 0.0123], [0. , 0. , 0.0123, 0.0123]], requires_grad=True)
These blocks are given by parameter groups that belong to groups of commuting gates.
The tensor can be further restricted to the diagonal via
approx="diag"
. However, this will not save further quantum function evolutions but only classical postprocessing.The returned metric tensor is also fully differentiable in all interfaces. For example, we can compute the gradient of the Frobenius norm of the metric tensor with respect to the QNode
weights
:>>> norm_fn = lambda x: qml.math.linalg.norm(mt_fn(x), ord="fro") >>> grad_fn = qml.grad(norm_fn) >>> grad_fn(weights) array([0.0282246 , 0.01340413, 0. , 0. ])
Usage Details
This transform can also be applied to lowlevel
QuantumTape
objects. This will result in no implicit quantum device evaluation. Instead, the processed tapes, and postprocessing function, which together define the metric tensor are directly returned:>>> params = np.array([1.7, 1.0, 0.5], requires_grad=True) >>> with qml.tape.QuantumTape() as tape: ... qml.RX(params[0], wires=0) ... qml.RY(params[1], wires=0) ... qml.CNOT(wires=[0, 1]) ... qml.PhaseShift(params[2], wires=1) ... qml.expval(qml.PauliX(0)) >>> tapes, fn = qml.metric_tensor(tape) >>> tapes [<QuantumTape: wires=[0, 1], params=0>, <QuantumTape: wires=[0, 1], params=1>, <QuantumTape: wires=[0, 1], params=3>, <QuantumTape: wires=[2, 0], params=1>, <QuantumTape: wires=[2, 0, 1], params=2>, <QuantumTape: wires=[2, 0, 1], params=2>]
This can be useful if the underlying circuits representing the metric tensor computation need to be analyzed. We clearly can distinguish the first three tapes used for the blockdiagonal from the last three tapes that use the auxiliary wire
2
, which was not used by the original tape.The output tapes can then be evaluated and postprocessed to retrieve the metric tensor:
>>> dev = qml.device("default.qubit", wires=2) >>> fn(qml.execute(tapes, dev, None)) array([[ 0.25 , 0. , 0.42073549], [ 0. , 0.00415023, 0.26517488], [ 0.42073549, 0.26517488, 0.24878844]])
The first term of the off blockdiagonal entries of the full metric tensor are computed with Hadamard tests. This first term reads
\[\mathfrak{Re}\left\{\langle \partial_i\psi\partial_j\psi\rangle\right\}\]and can be computed using an augmented circuit with an additional qubit. See for example the appendix of McArdle et al. (2019) for details. The blockdiagonal of the tensor is computed using the covariance matrix approach.
In addition, we may extract the factors for the second terms \(\langle \psi\partial_j\psi\rangle\) of the off blockdiagonal tensor from the quantum function output for the covariance matrix!
This means that in total only the tapes for the first terms of the off blockdiagonal are required in addition to the circuits for the block diagonal.