Coverage for qml_essentials/entanglement.py: 90%

1from typing import Optional, Any, List

2import pennylane as qml

3import pennylane.numpy as np

4from copy import deepcopy

5from qml_essentials.utils import logm_v

6from qml_essentials.model import Model

7import logging

9log = logging.getLogger(__name__)

12class Entanglement:

14 @staticmethod

15 def meyer_wallach(

16 model: Model,

17 n_samples: Optional[int | None],

18 seed: Optional[int],

19 scale: bool = False,

20 **kwargs: Any,

21 ) -> float:

22 """

23 Calculates the entangling capacity of a given quantum circuit

24 using Meyer-Wallach measure.

26 Args:

27 model (Model): The quantum circuit model.

28 n_samples (Optional[int]): Number of samples per qubit.

29 If None or < 0, the current parameters of the model are used.

30 seed (Optional[int]): Seed for the random number generator.

31 scale (bool): Whether to scale the number of samples.

32 kwargs (Any): Additional keyword arguments for the model function.

34 Returns:

35 float: Entangling capacity of the given circuit, guaranteed

36 to be between 0.0 and 1.0.

37 """

38 if "noise_params" in kwargs:

39 log.warning(

40 "Meyer-Wallach measure not suitable for noisy circuits.\

41 Consider 'relative_entropy' instead."

42 )

44 if scale:

45 n_samples = np.power(2, model.n_qubits) * n_samples

47 rng = np.random.default_rng(seed)

48 if n_samples is not None and n_samples > 0:

49 assert seed is not None, "Seed must be provided when samples > 0"

50 # TODO: maybe switch to JAX rng

51 model.initialize_params(rng=rng, repeat=n_samples)

52 else:

53 if seed is not None:

54 log.warning("Seed is ignored when samples is 0")

56 # implicitly set input to none in case it's not needed

57 kwargs.setdefault("inputs", None)

58 # explicitly set execution type because everything else won't work

59 rhos = model(execution_type="density", **kwargs).reshape(

60 -1, 2**model.n_qubits, 2**model.n_qubits

61 )

63 measure = np.zeros(len(rhos))

65 for i, rho in enumerate(rhos):

66 measure[i] = Entanglement._compute_meyer_wallach_meas(rho, model.n_qubits)

68 # Average all iterated states

69 entangling_capability = min(max(measure.mean(), 0.0), 1.0)

70 log.debug(f"Variance of measure: {measure.var()}")

72 # catch floating point errors

73 return float(entangling_capability)

75 @staticmethod

76 def _compute_meyer_wallach_meas(rho: np.ndarray, n_qubits: int):

77 qb = list(range(n_qubits))

78 entropy = 0

79 for j in range(n_qubits):

80 # Formula 6 in https://doi.org/10.48550/arXiv.quant-ph/0305094

81 density = qml.math.partial_trace(rho, qb[:j] + qb[j + 1 :])

82 # only real values, because imaginary part will be separate

83 # in all following calculations anyway

84 # entropy should be 1/2 <= entropy <= 1

85 entropy += np.trace((density @ density).real)

87 # inverse averaged entropy and scale to [0, 1]

88 return 2 * (1 - entropy / n_qubits)

90 @staticmethod

91 def bell_measurements(

92 model: Model, n_samples: int, seed: int, scale: bool = False, **kwargs: Any

93 ) -> float:

94 """

95 Compute the Bell measurement for a given model.

97 Args:

98 model (Model): The quantum circuit model.

99 n_samples (int): The number of samples to compute the measure for.

100 seed (int): The seed for the random number generator.

101 scale (bool): Whether to scale the number of samples

102 according to the number of qubits.

103 **kwargs (Any): Additional keyword arguments for the model function.

104

105 Returns:

106 float: The Bell measurement value.

107 """

108 if "noise_params" in kwargs:

109 log.warning(

110 "Bell Measurements not suitable for noisy circuits.\

111 Consider 'relative_entropy' instead."

112 )

113

114 if scale:

115 n_samples = np.power(2, model.n_qubits) * n_samples

116

117 def _circuit(

118 params: np.ndarray,

119 inputs: np.ndarray,

120 enc_params: Optional[np.ndarray] = None,

121 ) -> List[np.ndarray]:

122 """

123 Compute the Bell measurement circuit.

124

125 Args:

126 params (np.ndarray): The model parameters.

127 inputs (np.ndarray): The input to the model.

128 enc_params (Optional[np.ndarray]): The frequency encoding parameters.

129

130 Returns:

131 List[np.ndarray]: The probabilities of the Bell measurement.

132 """

133 model._variational(params, inputs, enc_params)

134

135 qml.map_wires(

136 model._variational,

137 {i: i + model.n_qubits for i in range(model.n_qubits)},

138 )(params, inputs)

139

140 for q in range(model.n_qubits):

141 qml.CNOT(wires=[q, q + model.n_qubits])

142 qml.H(q)

143

144 obs_wires = [(q, q + model.n_qubits) for q in range(model.n_qubits)]

145 return [qml.probs(wires=w) for w in obs_wires]

146

147 model.circuit = qml.QNode(

148 _circuit,

149 qml.device(

150 "default.qubit",

151 shots=model.shots,

152 wires=model.n_qubits * 2,

153 ),

154 )

155

156 rng = np.random.default_rng(seed)

157 if n_samples is not None and n_samples > 0:

158 assert seed is not None, "Seed must be provided when samples > 0"

159 # TODO: maybe switch to JAX rng

160 model.initialize_params(rng=rng, repeat=n_samples)

161 params = model.params

162 else:

163 if seed is not None:

164 log.warning("Seed is ignored when samples is 0")

165

166 if len(model.params.shape) <= 2:

167 params = model.params.reshape(*model.params.shape, 1)

168 else:

169 log.info(f"Using sample size of model params: {model.params.shape[-1]}")

170 params = model.params

171

172 n_samples = params.shape[-1]

173 measure = np.zeros(n_samples)

174

175 # implicitly set input to none in case it's not needed

176 kwargs.setdefault("inputs", None)

177 exp = model(params=params, **kwargs)

178 exp = 1 - 2 * exp[..., -1]

179 measure = 2 * (1 - exp.mean(axis=0))

180 entangling_capability = min(max(measure.mean(), 0.0), 1.0)

181 log.debug(f"Variance of measure: {measure.var()}")

182

183 return float(entangling_capability)

184

185 @staticmethod

186 def relative_entropy(

187 model: Model,

188 n_samples: int,

189 n_sigmas: int,

190 seed: Optional[int],

191 scale: bool = False,

192 **kwargs: Any,

193 ) -> float:

194 """

195 Calculates the relative entropy of entanglement of a given quantum

196 circuit. This measure is also applicable to mixed state, albeit it

197 might me not fully accurate in this simplified case.

198

199 As the relative entropy is generally defined as the smallest relative

200 entropy from the state in question to the set of separable states.

201 However, as computing the nearest separable state is NP-hard, we select

202 n_sigmas of random separable states to compute the distance to, which

203 is not necessarily the nearest. Thus, this measure of entanglement

204 presents an upper limit of entanglement.

205

206 As the relative entropy is not necessarily between zero and one, this

207 function also normalises by the relative entroy to the GHZ state.

208

209 Args:

210 model (Model): The quantum circuit model.

211 n_samples (int): Number of samples per qubit.

212 If <= 0, the current parameters of the model are used.

213 n_sigmas (int): Number of random separable pure states to compare against.

214 seed (Optional[int]): Seed for the random number generator.

215 scale (bool): Whether to scale the number of samples.

216 kwargs (Any): Additional keyword arguments for the model function.

217

218 Returns:

219 float: Entangling capacity of the given circuit, guaranteed

220 to be between 0.0 and 1.0.

221 """

222 dim = np.power(2, model.n_qubits)

223 if scale:

224 n_samples = dim * n_samples

225 n_sigmas = dim * n_sigmas

226

227 rng = np.random.default_rng(seed)

228

229 # Random separable states

230 log_sigmas = sample_random_separable_states(

231 model.n_qubits, n_samples=n_sigmas, rng=rng, take_log=True

232 )

233

234 if n_samples is not None and n_samples > 0:

235 assert seed is not None, "Seed must be provided when samples > 0"

236 model.initialize_params(rng=rng, repeat=n_samples)

237 else:

238 if seed is not None:

239 log.warning("Seed is ignored when samples is 0")

240

241 if len(model.params.shape) <= 2:

242 model.params = model.params.reshape(*model.params.shape, 1)

243 else:

244 log.info(f"Using sample size of model params: {model.params.shape[-1]}")

245

246 ghz_model = Model(model.n_qubits, 1, "GHZ", data_reupload=False)

247

248 normalised_entropies = np.zeros((n_sigmas, model.params.shape[-1]))

249 for j, log_sigma in enumerate(log_sigmas):

250

251 # Entropy of GHZ states should be maximal

252 ghz_entropy = Entanglement._compute_rel_entropies(

253 ghz_model,

254 log_sigma,

255 )

256

257 rel_entropy = Entanglement._compute_rel_entropies(

258 model, log_sigma, **kwargs

259 )

260

261 normalised_entropies[j] = rel_entropy / ghz_entropy

262

263 # Average all iterated states

264 entangling_capability = normalised_entropies.min(axis=0).mean()

265 log.debug(f"Variance of measure: {normalised_entropies.var()}")

266

267 return entangling_capability

268

269 @staticmethod

270 def _compute_rel_entropies(

271 model: Model,

272 log_sigma: np.ndarray,

273 **kwargs,

274 ) -> np.ndarray:

275 """

276 Compute the relative entropy for a given model.

277

278 Args:

279 model (Model): The model for which to compute entanglement

280 log_sigma (np.ndarray): Density matrix of next separable state

281

282 Returns:

283 np.ndarray: Relative Entropy for each sample

284 """

285 # implicitly set input to none in case it's not needed

286 kwargs.setdefault("inputs", None)

287 # explicitly set execution type because everything else won't work

288 rho = model(execution_type="density", **kwargs)

289 rho = rho.reshape(-1, 2**model.n_qubits, 2**model.n_qubits)

290 log_rho = logm_v(rho) / np.log(2)

291

292 rel_entropies = np.abs(np.trace(rho @ (log_rho - log_sigma), axis1=1, axis2=2))

293

294 return rel_entropies

295

296 @staticmethod

297 def entanglement_of_formation(

298 model: Model,

299 n_samples: int,

300 seed: Optional[int],

301 scale: bool = False,

302 always_decompose: bool = False,

303 **kwargs: Any,

304 ) -> float:

305 """

306 This function implements the entanglement of formation for mixed

307 quantum systems.

308 In that a mixed state gets decomposed into pure states with respective

309 probabilities using the eigendecomposition of the density matrix.

310 Then, the Meyer-Wallach measure is computed for each pure state,

311 weighted by the eigenvalue.

312 See e.g. https://doi.org/10.48550/arXiv.quant-ph/0504163

313

314 Note that the decomposition is *not unique*! Therefore, this measure

315 presents the entanglement for *some* decomposition into pure states,

316 not necessarily the one that is anticipated when applying the Kraus

317 channels.

318 If a pure state is provided, this results in the same value as the

319 Entanglement.meyer_wallach function if `always_decompose` flag is not set.

320

321 Args:

322 model (Model): The quantum circuit model.

323 n_samples (int): Number of samples per qubit.

324 seed (Optional[int]): Seed for the random number generator.

325 scale (bool): Whether to scale the number of samples.

326 always_decompose (bool): Whether to explicitly compute the

327 entantlement of formation for the eigendecomposition of a pure

328 state.

329 kwargs (Any): Additional keyword arguments for the model function.

330

331 Returns:

332 float: Entangling capacity of the given circuit, guaranteed

333 to be between 0.0 and 1.0.

334 """

335

336 if scale:

337 n_samples = np.power(2, model.n_qubits) * n_samples

338

339 rng = np.random.default_rng(seed)

340 if n_samples is not None and n_samples > 0:

341 assert seed is not None, "Seed must be provided when samples > 0"

342 model.initialize_params(rng=rng, repeat=n_samples)

343 else:

344 if seed is not None:

345 log.warning("Seed is ignored when samples is 0")

346

347 if len(model.params.shape) <= 2:

348 model.params = model.params.reshape(*model.params.shape, 1)

349 else:

350 log.info(f"Using sample size of model params: {model.params.shape[-1]}")

351

352 # implicitly set input to none in case it's not needed

353 kwargs.setdefault("inputs", None)

354 rhos = model(execution_type="density", **kwargs)

355 rhos = rhos.reshape(-1, 2**model.n_qubits, 2**model.n_qubits)

356 entanglement = np.zeros(len(rhos))

357 for i, rho in enumerate(rhos):

358 entanglement[i] = Entanglement._compute_entanglement_of_formation(

359 rho, model.n_qubits, always_decompose

360 )

361 entangling_capability = min(max(entanglement.mean(), 0.0), 1.0)

362 return float(entangling_capability)

363

364 @staticmethod

365 def _compute_entanglement_of_formation(

366 rho: np.ndarray, n_qubits: int, always_decompose: bool

367 ) -> float:

368 """

369 Computes the entanglement of formation for a given density matrix rho.

370

371 Args:

372 rho (np.ndarray): The density matrix

373 n_qubits (int): Number of qubits

374 always_decompose (bool): Whether to explicitly compute the

375 entantlement of formation for the eigendecomposition of a pure

376 state.

377

378 Returns:

379 float: Entanglement for the provided state.

380 """

381 eigenvalues, eigenvectors = np.linalg.eigh(rho)

382 if any(np.isclose(eigenvalues, 1.0)) and not always_decompose: # Pure state

383 return Entanglement._compute_meyer_wallach_meas(rho, n_qubits)

384 ent = 0

385 for prob, ev in zip(eigenvalues, eigenvectors):

386 ev = ev.reshape(-1, 1)

387 rho = ev @ np.conjugate(ev).T

388 measure = Entanglement._compute_meyer_wallach_meas(rho, n_qubits)

389 ent += prob * measure

390 return ent

391

392 @staticmethod

393 def concentratable_entanglement(

394 model: Model, n_samples: int, seed: int, scale: bool = False, **kwargs: Any

395 ) -> float:

396 """

397 Computes the concentratable entanglement of a given model.

398

399 This method utilizes the Concentratable Entanglement measure from

400 https://arxiv.org/abs/2104.06923.

401

402 Args:

403 model (Model): The quantum circuit model.

404 n_samples (int): The number of samples to compute the measure for.

405 seed (int): The seed for the random number generator.

406 scale (bool): Whether to scale the number of samples according to

407 the number of qubits.

408 **kwargs (Any): Additional keyword arguments for the model function.

409

410 Returns:

411 float: Entangling capability of the given circuit, guaranteed

412 to be between 0.0 and 1.0.

413 """

414 if "noise_params" in kwargs:

415 log.warning(

416 "Concentratable entanglement is not suitable for noisy circuits.\

417 Consider 'relative_entropy' instead."

418 )

419

420 n = model.n_qubits

421

422 if scale:

423 n_samples = np.power(2, model.n) * n_samples

424

425 def _circuit(

426 params: np.ndarray,

427 inputs: np.ndarray,

428 enc_params: Optional[np.ndarray] = None,

429 ) -> List[np.ndarray]:

430 """

431 Constructs a circuit to compute the concentratable entanglement using the

432 swap test by creating two copies of the models circuit and map the output

433 wires accordingly

434

435 Args:

436 params (np.ndarray): The model parameters.

437 inputs (np.ndarray): The input data for the model.

438 enc_params (Optional[np.ndarray]): Optional encoding parameters.

439

440 Returns:

441 List[np.ndarray]: Probabilities obtained from the swap test circuit.

442 """

443

444 qml.map_wires(model._variational, {i: i + n for i in range(n)})(

445 params, inputs, enc_params

446 )

447 qml.map_wires(model._variational, {i: i + 2 * n for i in range(n)})(

448 params, inputs, enc_params

449 )

450

451 # Perform swap test

452 for i in range(n):

453 qml.H(i)

454

455 for i in range(n):

456 qml.CSWAP([i, i + n, i + 2 * n])

457

458 for i in range(n):

459 qml.H(i)

460

461 return qml.probs(wires=[i for i in range(n)])

462

463 model.circuit = qml.QNode(

464 _circuit,

465 qml.device(

466 "default.qubit",

467 shots=model.shots,

468 wires=n * 3,

469 ),

470 )

471

472 rng = np.random.default_rng(seed)

473 if n_samples is not None and n_samples > 0:

474 assert seed is not None, "Seed must be provided when samples > 0"

475 model.initialize_params(rng=rng, repeat=n_samples)

476 params = model.params

477 else:

478 if seed is not None:

479 log.warning("Seed is ignored when samples is 0")

480

481 if len(model.params.shape) <= 2:

482 params = model.params.reshape(*model.params.shape, 1)

483 else:

484 log.info(f"Using sample size of model params: {model.params.shape[-1]}")

485 params = model.params

486

487 n_samples = params.shape[-1]

488

489 # implicitly set input to none in case it's not needed

490 kwargs.setdefault("inputs", None)

491

492 samples_probs = model(params=params, execution_type="probs", **kwargs)

493 if n_samples == 1:

494 samples_probs = [samples_probs]

495

496 ce_measure = np.zeros(len(samples_probs))

497

498 for i, probs in enumerate(samples_probs):

499 ce_measure[i] = 1 - probs[0]

500

501 # Average all iterated states

502 entangling_capability = min(max(ce_measure.mean(), 0.0), 1.0)

503 log.debug(f"Variance of measure: {ce_measure.var()}")

504

505 # catch floating point errors

506 return float(entangling_capability)

507

508

509def sample_random_separable_states(

510 n_qubits: int, n_samples: int, rng: np.random.Generator, take_log: bool = False

511) -> np.ndarray:

512 """

513 Sample random separable states (density matrix).

514

515 Args:

516 n_qubits (int): number of qubits in the state

517 n_samples (int): number of states

518 rng (np.random.Generator): random number generator

519 take_log (bool): if the matrix logarithm of the density matrix should be taken.

520

521 Returns:

522 np.ndarray: Density matrices of shape (n_samples, 2**n_qubits, 2**n_qubits)

523 """

524 model = Model(n_qubits, 1, "No_Entangling", data_reupload=False)

525 model.initialize_params(rng=rng, repeat=n_samples)

526 # explicitly set execution type because everything else won't work

527 sigmas = model(execution_type="density", inputs=None)

528 if take_log:

529 sigmas = logm_v(sigmas) / np.log(2)

530

531 return sigmas