Coverage for pySDC/helpers/spectral_helper.py: 89%

1import numpy as np 

2import scipy 

3from pySDC.implementations.datatype_classes.mesh import mesh 

4from scipy.special import factorial 

5from functools import partial, wraps 

6import logging 

7 

8 

9def cache(func): 

10 """ 

11 Decorator for caching return values of functions. 

12 This is very similar to `functools.cache`, but without the memory leaks (see 

13 https://docs.astral.sh/ruff/rules/cached-instance-method/). 

14 

15 Example: 

16 

17 .. code-block:: python 

18 

19 num_calls = 0 

20 

21 @cache 

22 def increment(x): 

23 num_calls += 1 

24 return x + 1 

25 

26 increment(0) # returns 1, num_calls = 1 

27 increment(1) # returns 2, num_calls = 2 

28 increment(0) # returns 1, num_calls = 2 

29 

30 

31 Args: 

32 func (function): The function you want to cache the return value of 

33 

34 Returns: 

35 return value of func 

36 """ 

37 attr_cache = f"_{func.__name__}_cache" 

38 

39 @wraps(func) 

40 def wrapper(self, *args, **kwargs): 

41 if not hasattr(self, attr_cache): 

42 setattr(self, attr_cache, {}) 

43 

44 cache = getattr(self, attr_cache) 

45 

46 key = (args, frozenset(kwargs.items())) 

47 if key in cache: 

48 return cache[key] 

49 result = func(self, *args, **kwargs) 

50 cache[key] = result 

51 return result 

52 

53 return wrapper 

54 

55 

56class SpectralHelper1D: 

57 """ 

58 Abstract base class for 1D spectral discretizations. Defines a common interface with parameters and functions that 

59 all bases need to have. 

60 

61 When implementing new bases, please take care to use the modules that are supplied as class attributes to enable 

62 the code for GPUs. 

63 

64 Attributes: 

65 N (int): Resolution 

66 x0 (float): Coordinate of left boundary 

67 x1 (float): Coordinate of right boundary 

68 L (float): Length of the domain 

69 useGPU (bool): Whether to use GPUs 

70 

71 """ 

72 

73 fft_lib = scipy.fft 

74 sparse_lib = scipy.sparse 

75 linalg = scipy.sparse.linalg 

76 xp = np 

77 distributable = False 

78 

79 def __init__(self, N, x0=None, x1=None, useGPU=False, useFFTW=False): 

80 """ 

81 Constructor 

82 

83 Args: 

84 N (int): Resolution 

85 x0 (float): Coordinate of left boundary 

86 x1 (float): Coordinate of right boundary 

87 useGPU (bool): Whether to use GPUs 

88 useFFTW (bool): Whether to use FFTW for the transforms 

89 """ 

90 self.N = N 

91 self.x0 = x0 

92 self.x1 = x1 

93 self.L = x1 - x0 

94 self.useGPU = useGPU 

95 self.plans = {} 

96 self.logger = logging.getLogger(name=type(self).__name__) 

97 

98 if useGPU: 

99 self.setup_GPU() 

100 else: 

101 self.setup_CPU(useFFTW=useFFTW) 

102 

103 if useGPU and useFFTW: 

104 raise ValueError('Please run either on GPUs or with FFTW, not both!') 

105 

106 @classmethod 

107 def setup_GPU(cls): 

108 """switch to GPU modules""" 

109 import cupy as cp 

110 import cupyx.scipy.sparse as sparse_lib 

111 import cupyx.scipy.sparse.linalg as linalg 

112 import cupyx.scipy.fft as fft_lib 

113 from pySDC.implementations.datatype_classes.cupy_mesh import cupy_mesh 

114 

115 cls.xp = cp 

116 cls.sparse_lib = sparse_lib 

117 cls.linalg = linalg 

118 cls.fft_lib = fft_lib 

119 

120 @classmethod 

121 def setup_CPU(cls, useFFTW=False): 

122 """switch to CPU modules""" 

123 

124 cls.xp = np 

125 cls.sparse_lib = scipy.sparse 

126 cls.linalg = scipy.sparse.linalg 

127 

128 if useFFTW: 

129 from mpi4py_fft import fftw 

130 

131 cls.fft_backend = 'fftw' 

132 cls.fft_lib = fftw 

133 else: 

134 cls.fft_backend = 'scipy' 

135 cls.fft_lib = scipy.fft 

136 

137 cls.fft_comm_backend = 'MPI' 

138 cls.dtype = mesh 

139 

140 def get_Id(self): 

141 """ 

142 Get identity matrix 

143 

144 Returns: 

145 sparse diagonal identity matrix 

146 """ 

147 return self.sparse_lib.eye(self.N) 

148 

149 def get_zero(self): 

150 """ 

151 Get a matrix with all zeros of the correct size. 

152 

153 Returns: 

154 sparse matrix with zeros everywhere 

155 """ 

156 return 0 * self.get_Id() 

157 

158 def get_differentiation_matrix(self): 

159 raise NotImplementedError() 

160 

161 def get_integration_matrix(self): 

162 raise NotImplementedError() 

163 

164 def get_wavenumbers(self): 

165 """ 

166 Get the grid in spectral space 

167 """ 

168 raise NotImplementedError 

169 

170 def get_empty_operator_matrix(self, S, O): 

171 """ 

172 Return a matrix of operators to be filled with the connections between the solution components. 

173 

174 Args: 

175 S (int): Number of components in the solution 

176 O (sparse matrix): Zero matrix used for initialization 

177 

178 Returns: 

179 list of lists containing sparse zeros 

180 """ 

181 return [[O for _ in range(S)] for _ in range(S)] 

182 

183 def get_basis_change_matrix(self, *args, **kwargs): 

184 """ 

185 Some spectral discretization change the basis during differentiation. This method can be used to transfer 

186 between the various bases. 

187 

188 This method accepts arbitrary arguments that may not be used in order to provide an easy interface for multi- 

189 dimensional bases. For instance, you may combine an FFT discretization with an ultraspherical discretization. 

190 The FFT discretization will always be in the same base, but the ultraspherical discretization uses a different 

191 base for every derivative. You can then ask all bases for transfer matrices from one ultraspherical derivative 

192 base to the next. The FFT discretization will ignore this and return an identity while the ultraspherical 

193 discretization will return the desired matrix. After a Kronecker product, you get the 2D version of the matrix 

194 you want. This is what the `SpectralHelper` does when you call the method of the same name on it. 

195 

196 Returns: 

197 sparse bases change matrix 

198 """ 

199 return self.sparse_lib.eye(self.N) 

200 

201 def get_BC(self, kind): 

202 """ 

203 To facilitate boundary conditions (BCs) we use either a basis where all functions satisfy the BCs automatically, 

204 as is the case in FFT basis for periodic BCs, or boundary bordering. In boundary bordering, specific lines in 

205 the matrix are replaced by the boundary conditions as obtained by this method. 

206 

207 Args: 

208 kind (str): The type of BC you want to implement please refer to the implementations of this method in the 

209 individual 1D bases for what is implemented 

210 

211 Returns: 

212 self.xp.array: Boundary condition 

213 """ 

214 raise NotImplementedError(f'No boundary conditions of {kind=!r} implemented!') 

215 

216 def get_filter_matrix(self, kmin=0, kmax=None): 

217 """ 

218 Get a bandpass filter. 

219 

220 Args: 

221 kmin (int): Lower limit of the bandpass filter 

222 kmax (int): Upper limit of the bandpass filter 

223 

224 Returns: 

225 sparse matrix 

226 """ 

227 

228 k = abs(self.get_wavenumbers()) 

229 

230 kmax = max(k) if kmax is None else kmax 

231 

232 mask = self.xp.logical_or(k >= kmax, k < kmin) 

233 

234 if self.useGPU: 

235 Id = self.get_Id().get() 

236 else: 

237 Id = self.get_Id() 

238 F = Id.tolil() 

239 F[:, mask] = 0 

240 return F.tocsc() 

241 

242 def get_1dgrid(self): 

243 """ 

244 Get the grid in physical space 

245 

246 Returns: 

247 self.xp.array: Grid 

248 """ 

249 raise NotImplementedError 

250 

251 

252class ChebychevHelper(SpectralHelper1D): 

253 """ 

254 The Chebychev base consists of special kinds of polynomials, with the main advantage that you can easily transform 

255 between physical and spectral space by discrete cosine transform. 

256 The differentiation in the Chebychev T base is dense, but can be preconditioned to yield a differentiation operator 

257 that moves to Chebychev U basis during differentiation, which is sparse. When using this technique, problems need to 

258 be formulated in first order formulation. 

259 

260 This implementation is largely based on the Dedalus paper (https://doi.org/10.1103/PhysRevResearch.2.023068). 

261 """ 

262 

263 def __init__(self, *args, x0=-1, x1=1, **kwargs): 

264 """ 

265 Constructor. 

266 Please refer to the parent class for additional arguments. Notably, you have to supply a resolution `N` and you 

267 may choose to run on GPUs via the `useGPU` argument. 

268 

269 Args: 

270 x0 (float): Coordinate of left boundary. Note that only -1 is currently implented 

271 x1 (float): Coordinate of right boundary. Note that only +1 is currently implented 

272 """ 

273 # need linear transformation y = ax + b with a = (x1-x0)/2 and b = (x1+x0)/2 

274 self.lin_trf_fac = (x1 - x0) / 2 

275 self.lin_trf_off = (x1 + x0) / 2 

276 super().__init__(*args, x0=x0, x1=x1, **kwargs) 

277 

278 self.norm = self.get_norm() 

279 

280 def get_1dgrid(self): 

281 ''' 

282 Generates a 1D grid with Chebychev points. These are clustered at the boundary. You need this kind of grid to 

283 use discrete cosine transformation (DCT) to get the Chebychev representation. If you want a different grid, you 

284 need to do an affine transformation before any Chebychev business. 

285 

286 Returns: 

287 numpy.ndarray: 1D grid 

288 ''' 

289 return self.lin_trf_fac * self.xp.cos(np.pi / self.N * (self.xp.arange(self.N) + 0.5)) + self.lin_trf_off 

290 

291 def get_wavenumbers(self): 

292 """Get the domain in spectral space""" 

293 return self.xp.arange(self.N) 

294 

295 @cache 

296 def get_conv(self, name, N=None): 

297 ''' 

298 Get conversion matrix between different kinds of polynomials. The supported kinds are 

299 - T: Chebychev polynomials of first kind 

300 - U: Chebychev polynomials of second kind 

301 - D: Dirichlet recombination. 

302 

303 You get the desired matrix by choosing a name as ``A2B``. I.e. ``T2U`` for the conversion matrix from T to U. 

304 Once generates matrices are cached. So feel free to call the method as often as you like. 

305 

306 Args: 

307 name (str): Conversion code, e.g. 'T2U' 

308 N (int): Size of the matrix (optional) 

309 

310 Returns: 

311 scipy.sparse: Sparse conversion matrix 

312 ''' 

313 N = N if N else self.N 

314 sp = self.sparse_lib 

315 

316 def get_forward_conv(name): 

317 if name == 'T2U': 

318 mat = (sp.eye(N) - sp.eye(N, k=2)).tocsc() / 2.0 

319 mat[:, 0] *= 2 

320 elif name == 'D2T': 

321 mat = sp.eye(N) - sp.eye(N, k=2) 

322 elif name[0] == name[-1]: 

323 mat = self.sparse_lib.eye(self.N) 

324 else: 

325 raise NotImplementedError(f'Don\'t have conversion matrix {name!r}') 

326 return mat 

327 

328 try: 

329 mat = get_forward_conv(name) 

330 except NotImplementedError as E: 

331 try: 

332 fwd = get_forward_conv(name[::-1]) 

333 import scipy.sparse as sp 

334 

335 if self.sparse_lib == sp: 

336 mat = self.sparse_lib.linalg.inv(fwd.tocsc()) 

337 else: 

338 mat = self.sparse_lib.csc_matrix(sp.linalg.inv(fwd.tocsc().get())) 

339 except NotImplementedError: 

340 raise NotImplementedError from E 

341 

342 return mat 

343 

344 def get_basis_change_matrix(self, conv='T2T', **kwargs): 

345 """ 

346 As the differentiation matrix in Chebychev-T base is dense but is sparse when simultaneously changing base to 

347 Chebychev-U, you may need a basis change matrix to transfer the other matrices as well. This function returns a 

348 conversion matrix from `ChebychevHelper.get_conv`. Not that `**kwargs` are used to absorb arguments for other 

349 bases, see documentation of `SpectralHelper1D.get_basis_change_matrix`. 

350 

351 Args: 

352 conv (str): Conversion code, i.e. T2U 

353 

354 Returns: 

355 Sparse conversion matrix 

356 """ 

357 return self.get_conv(conv) 

358 

359 def get_integration_matrix(self, lbnd=0): 

360 """ 

361 Get matrix for integration 

362 

363 Args: 

364 lbnd (float): Lower bound for integration, only 0 is currently implemented 

365 

366 Returns: 

367 Sparse integration matrix 

368 """ 

369 S = self.sparse_lib.diags(1 / (self.xp.arange(self.N - 1) + 1), offsets=-1) @ self.get_conv('T2U') 

370 n = self.xp.arange(self.N) 

371 if lbnd == 0: 

372 S = S.tocsc() 

373 S[0, 1::2] = ( 

374 (n / (2 * (self.xp.arange(self.N) + 1)))[1::2] 

375 * (-1) ** (self.xp.arange(self.N // 2)) 

376 / (np.append([1], self.xp.arange(self.N // 2 - 1) + 1)) 

377 ) * self.lin_trf_fac 

378 else: 

379 raise NotImplementedError(f'This function allows to integrate only from x=0, you attempted from x={lbnd}.') 

380 return S 

381 

382 def get_differentiation_matrix(self, p=1): 

383 ''' 

384 Keep in mind that the T2T differentiation matrix is dense. 

385 

386 Args: 

387 p (int): Derivative you want to compute 

388 

389 Returns: 

390 numpy.ndarray: Differentiation matrix 

391 ''' 

392 D = self.xp.zeros((self.N, self.N)) 

393 for j in range(self.N): 

394 for k in range(j): 

395 D[k, j] = 2 * j * ((j - k) % 2) 

396 

397 D[0, :] /= 2 

398 return self.sparse_lib.csc_matrix(self.xp.linalg.matrix_power(D, p)) / self.lin_trf_fac**p 

399 

400 @cache 

401 def get_norm(self, N=None): 

402 ''' 

403 Get normalization for converting Chebychev coefficients and DCT 

404 

405 Args: 

406 N (int, optional): Resolution 

407 

408 Returns: 

409 self.xp.array: Normalization 

410 ''' 

411 N = self.N if N is None else N 

412 norm = self.xp.ones(N) / N 

413 norm[0] /= 2 

414 return norm 

415 

416 def transform(self, u, *args, axes=None, shape=None, **kwargs): 

417 """ 

418 DCT along axes. `kwargs` will be passed on to the FFT library. 

419 

420 Args: 

421 u: Data you want to transform 

422 axes (tuple): Axes you want to transform along 

423 

424 Returns: 

425 Data in spectral space 

426 """ 

427 axes = axes if axes else tuple(i for i in range(u.ndim)) 

428 kwargs['s'] = shape 

429 kwargs['norm'] = kwargs.get('norm', 'backward') 

430 

431 trf = self.fft_lib.dctn(u, *args, axes=axes, type=2, **kwargs) 

432 for axis in axes: 

433 

434 if self.N < trf.shape[axis]: 

435 # mpi4py-fft implements padding only for FFT, where the frequencies are sorted such that the zeros are 

436 # removed in the middle rather than the end. We need to resort this here and put the highest frequencies 

437 # in the middle. 

438 _trf = self.xp.zeros_like(trf) 

439 N = self.N 

440 N_pad = _trf.shape[axis] - N 

441 end_first_half = N // 2 + 1 

442 

443 # copy first "half" 

444 su = [slice(None)] * trf.ndim 

445 su[axis] = slice(0, end_first_half) 

446 _trf[tuple(su)] = trf[tuple(su)] 

447 

448 # copy second "half" 

449 su = [slice(None)] * u.ndim 

450 su[axis] = slice(end_first_half + N_pad, None) 

451 s_u = [slice(None)] * u.ndim 

452 s_u[axis] = slice(end_first_half, N) 

453 _trf[tuple(su)] = trf[tuple(s_u)] 

454 

455 # # copy values to be cut 

456 # su = [slice(None)] * u.ndim 

457 # su[axis] = slice(end_first_half, end_first_half + N_pad) 

458 # s_u = [slice(None)] * u.ndim 

459 # s_u[axis] = slice(-N_pad, None) 

460 # _trf[tuple(su)] = trf[tuple(s_u)] 

461 

462 trf = _trf 

463 

464 expansion = [np.newaxis for _ in u.shape] 

465 expansion[axis] = slice(0, u.shape[axis], 1) 

466 norm = self.xp.ones(trf.shape[axis]) * self.norm[-1] 

467 norm[: self.N] = self.norm 

468 trf *= norm[(*expansion,)] 

469 return trf 

470 

471 def itransform(self, u, *args, axes=None, shape=None, **kwargs): 

472 """ 

473 Inverse DCT along axis. 

474 

475 Args: 

476 u: Data you want to transform 

477 axes (tuple): Axes you want to transform along 

478 

479 Returns: 

480 Data in physical space 

481 """ 

482 axes = axes if axes else tuple(i for i in range(u.ndim)) 

483 kwargs['s'] = shape 

484 kwargs['norm'] = kwargs.get('norm', 'backward') 

485 kwargs['overwrite_x'] = kwargs.get('overwrite_x', False) 

486 

487 for axis in axes: 

488 

489 if self.N == u.shape[axis]: 

490 _u = u.copy() 

491 else: 

492 # mpi4py-fft implements padding only for FFT, where the frequencies are sorted such that the zeros are 

493 # added in the middle rather than the end. We need to resort this here and put the padding in the end. 

494 N = self.N 

495 _u = self.xp.zeros_like(u) 

496 

497 # copy first half 

498 su = [slice(None)] * u.ndim 

499 su[axis] = slice(0, N // 2 + 1) 

500 _u[tuple(su)] = u[tuple(su)] 

501 

502 # copy second half 

503 su = [slice(None)] * u.ndim 

504 su[axis] = slice(-(N // 2), None) 

505 s_u = [slice(None)] * u.ndim 

506 s_u[axis] = slice(N // 2, N // 2 + (N // 2)) 

507 _u[tuple(s_u)] = u[tuple(su)] 

508 

509 if N % 2 == 0: 

510 su = [slice(None)] * u.ndim 

511 su[axis] = N // 2 

512 _u[tuple(su)] *= 2 

513 

514 # generate norm 

515 expansion = [np.newaxis for _ in u.shape] 

516 expansion[axis] = slice(0, u.shape[axis], 1) 

517 norm = self.xp.ones(_u.shape[axis]) 

518 norm[: self.N] = self.norm 

519 norm = self.get_norm(u.shape[axis]) * _u.shape[axis] / self.N 

520 

521 _u /= norm[(*expansion,)] 

522 

523 return self.fft_lib.idctn(_u, *args, axes=axes, type=2, **kwargs) 

524 

525 def get_BC(self, kind, **kwargs): 

526 """ 

527 Get boundary condition row for boundary bordering. `kwargs` will be passed on to implementations of the BC of 

528 the kind you choose. Specifically, `x` for `'dirichlet'` boundary condition, which is the coordinate at which to 

529 set the BC. 

530 

531 Args: 

532 kind ('integral' or 'dirichlet'): Kind of boundary condition you want 

533 """ 

534 if kind.lower() == 'integral': 

535 return self.get_integ_BC_row(**kwargs) 

536 elif kind.lower() == 'dirichlet': 

537 return self.get_Dirichlet_BC_row(**kwargs) 

538 else: 

539 return super().get_BC(kind) 

540 

541 def get_integ_BC_row(self): 

542 """ 

543 Get a row for generating integral BCs with T polynomials. 

544 It returns the values of the integrals of T polynomials over the entire interval. 

545 

546 Returns: 

547 self.xp.ndarray: Row to put into a matrix 

548 """ 

549 n = self.xp.arange(self.N) + 1 

550 me = self.xp.zeros_like(n).astype(float) 

551 me[2:] = ((-1) ** n[1:-1] + 1) / (1 - n[1:-1] ** 2) 

552 me[0] = 2.0 

553 return me 

554 

555 def get_Dirichlet_BC_row(self, x): 

556 """ 

557 Get a row for generating Dirichlet BCs at x with T polynomials. 

558 It returns the values of the T polynomials at x. 

559 

560 Args: 

561 x (float): Position of the boundary condition 

562 

563 Returns: 

564 self.xp.ndarray: Row to put into a matrix 

565 """ 

566 if x == -1: 

567 return (-1) ** self.xp.arange(self.N) 

568 elif x == 1: 

569 return self.xp.ones(self.N) 

570 elif x == 0: 

571 n = (1 + (-1) ** self.xp.arange(self.N)) / 2 

572 n[2::4] *= -1 

573 return n 

574 else: 

575 raise NotImplementedError(f'Don\'t know how to generate Dirichlet BC\'s at {x=}!') 

576 

577 def get_Dirichlet_recombination_matrix(self): 

578 ''' 

579 Get matrix for Dirichlet recombination, which changes the basis to have sparse boundary conditions. 

580 This makes for a good right preconditioner. 

581 

582 Returns: 

583 scipy.sparse: Sparse conversion matrix 

584 ''' 

585 N = self.N 

586 sp = self.sparse_lib 

587 

588 return sp.eye(N) - sp.eye(N, k=2) 

589 

590 

591class UltrasphericalHelper(ChebychevHelper): 

592 """ 

593 This implementation follows https://doi.org/10.1137/120865458. 

594 The ultraspherical method works in Chebychev polynomials as well, but also uses various Gegenbauer polynomials. 

595 The idea is that for every derivative of Chebychev T polynomials, there is a basis of Gegenbauer polynomials where the differentiation matrix is a single off-diagonal. 

596 There are also conversion operators from one derivative basis to the next that are sparse. 

597 

598 This basis is used like this: For every equation that you have, look for the highest derivative and bump all matrices to the correct basis. If your highest derivative is 2 and you have an identity, it needs to get bumped from 0 to 1 and from 1 to 2. If you have a first derivative as well, it needs to be bumped from 1 to 2. 

599 You don't need the same resulting basis in all equations. You just need to take care that you translate the right hand side to the correct basis as well. 

600 """ 

601 

602 def get_differentiation_matrix(self, p=1): 

603 """ 

604 Notice that while sparse, this matrix is not diagonal, which means the inversion cannot be parallelized easily. 

605 

606 Args: 

607 p (int): Order of the derivative 

608 

609 Returns: 

610 sparse differentiation matrix 

611 """ 

612 sp = self.sparse_lib 

613 xp = self.xp 

614 N = self.N 

615 l = p 

616 return 2 ** (l - 1) * factorial(l - 1) * sp.diags(xp.arange(N - l) + l, offsets=l) / self.lin_trf_fac**p 

617 

618 def get_S(self, lmbda): 

619 """ 

620 Get matrix for bumping the derivative base by one from lmbda to lmbda + 1. This is the same language as in 

621 https://doi.org/10.1137/120865458. 

622 

623 Args: 

624 lmbda (int): Ingoing derivative base 

625 

626 Returns: 

627 sparse matrix: Conversion from derivative base lmbda to lmbda + 1 

628 """ 

629 N = self.N 

630 

631 if lmbda == 0: 

632 sp = scipy.sparse 

633 mat = ((sp.eye(N) - sp.eye(N, k=2)) / 2.0).tolil() 

634 mat[:, 0] *= 2 

635 else: 

636 sp = self.sparse_lib 

637 xp = self.xp 

638 mat = sp.diags(lmbda / (lmbda + xp.arange(N))) - sp.diags( 

639 lmbda / (lmbda + 2 + xp.arange(N - 2)), offsets=+2 

640 ) 

641 

642 return self.sparse_lib.csc_matrix(mat) 

643 

644 def get_basis_change_matrix(self, p_in=0, p_out=0, **kwargs): 

645 """ 

646 Get a conversion matrix from derivative base `p_in` to `p_out`. 

647 

648 Args: 

649 p_out (int): Resulting derivative base 

650 p_in (int): Ingoing derivative base 

651 """ 

652 mat_fwd = self.sparse_lib.eye(self.N) 

653 for i in range(min([p_in, p_out]), max([p_in, p_out])): 

654 mat_fwd = self.get_S(i) @ mat_fwd 

655 

656 if p_out > p_in: 

657 return mat_fwd 

658 

659 else: 

660 # We have to invert the matrix on CPU because the GPU equivalent is not implemented in CuPy at the time of writing. 

661 import scipy.sparse as sp 

662 

663 if self.useGPU: 

664 mat_fwd = mat_fwd.get() 

665 

666 mat_bck = sp.linalg.inv(mat_fwd.tocsc()) 

667 

668 return self.sparse_lib.csc_matrix(mat_bck) 

669 

670 def get_integration_matrix(self): 

671 """ 

672 Get an integration matrix. Please use `UltrasphericalHelper.get_integration_constant` afterwards to compute the 

673 integration constant such that integration starts from x=-1. 

674 

675 Example: 

676 

677 .. code-block:: python 

678 

679 import numpy as np 

680 from pySDC.helpers.spectral_helper import UltrasphericalHelper 

681 

682 N = 4 

683 helper = UltrasphericalHelper(N) 

684 coeffs = np.random.random(N) 

685 coeffs[-1] = 0 

686 

687 poly = np.polynomial.Chebyshev(coeffs) 

688 

689 S = helper.get_integration_matrix() 

690 U_hat = S @ coeffs 

691 U_hat[0] = helper.get_integration_constant(U_hat, axis=-1) 

692 

693 assert np.allclose(poly.integ(lbnd=-1).coef[:-1], U_hat) 

694 

695 Returns: 

696 sparse integration matrix 

697 """ 

698 return ( 

699 self.sparse_lib.diags(1 / (self.xp.arange(self.N - 1) + 1), offsets=-1) 

700 @ self.get_basis_change_matrix(p_out=1, p_in=0) 

701 * self.lin_trf_fac 

702 ) 

703 

704 def get_integration_constant(self, u_hat, axis): 

705 """ 

706 Get integration constant for lower bound of -1. See documentation of `UltrasphericalHelper.get_integration_matrix` for details. 

707 

708 Args: 

709 u_hat: Solution in spectral space 

710 axis: Axis you want to integrate over 

711 

712 Returns: 

713 Integration constant, has one less dimension than `u_hat` 

714 """ 

715 slices = [ 

716 None, 

717 ] * u_hat.ndim 

718 slices[axis] = slice(1, u_hat.shape[axis]) 

719 return self.xp.sum(u_hat[(*slices,)] * (-1) ** (self.xp.arange(u_hat.shape[axis] - 1)), axis=axis) 

720 

721 

722class FFTHelper(SpectralHelper1D): 

723 distributable = True 

724 

725 def __init__(self, *args, x0=0, x1=2 * np.pi, **kwargs): 

726 """ 

727 Constructor. 

728 Please refer to the parent class for additional arguments. Notably, you have to supply a resolution `N` and you 

729 may choose to run on GPUs via the `useGPU` argument. 

730 

731 Args: 

732 x0 (float, optional): Coordinate of left boundary 

733 x1 (float, optional): Coordinate of right boundary 

734 """ 

735 super().__init__(*args, x0=x0, x1=x1, **kwargs) 

736 

737 def get_1dgrid(self): 

738 """ 

739 We use equally spaced points including the left boundary and not including the right one, which is the left boundary. 

740 """ 

741 dx = self.L / self.N 

742 return self.xp.arange(self.N) * dx + self.x0 

743 

744 def get_wavenumbers(self): 

745 """ 

746 Be careful that this ordering is very unintuitive. 

747 """ 

748 return self.xp.fft.fftfreq(self.N, 1.0 / self.N) * 2 * np.pi / self.L 

749 

750 def get_differentiation_matrix(self, p=1): 

751 """ 

752 This matrix is diagonal, allowing to invert concurrently. 

753 

754 Args: 

755 p (int): Order of the derivative 

756 

757 Returns: 

758 sparse differentiation matrix 

759 """ 

760 k = self.get_wavenumbers() 

761 

762 if self.useGPU: 

763 if p > 1: 

764 # Have to raise the matrix to power p on CPU because the GPU equivalent is not implemented in CuPy at the time of writing. 

765 from scipy.sparse.linalg import matrix_power 

766 

767 D = self.sparse_lib.diags(1j * k).get() 

768 return self.sparse_lib.csc_matrix(matrix_power(D, p)) 

769 else: 

770 return self.sparse_lib.diags(1j * k) 

771 else: 

772 return self.linalg.matrix_power(self.sparse_lib.diags(1j * k), p) 

773 

774 def get_integration_matrix(self, p=1): 

775 """ 

776 Get integration matrix to compute `p`-th integral over the entire domain. 

777 

778 Args: 

779 p (int): Order of integral you want to compute 

780 

781 Returns: 

782 sparse integration matrix 

783 """ 

784 k = self.xp.array(self.get_wavenumbers(), dtype='complex128') 

785 k[0] = 1j * self.L 

786 return self.linalg.matrix_power(self.sparse_lib.diags(1 / (1j * k)), p) 

787 

788 def get_plan(self, u, forward, *args, **kwargs): 

789 if self.fft_lib.__name__ == 'mpi4py_fft.fftw': 

790 if 'axes' in kwargs.keys(): 

791 kwargs['axes'] = tuple(kwargs['axes']) 

792 key = (forward, u.shape, args, *(me for me in kwargs.values())) 

793 if key in self.plans.keys(): 

794 return self.plans[key] 

795 else: 

796 self.logger.debug(f'Generating FFT plan for {key=}') 

797 transform = self.fft_lib.fftn(u, *args, **kwargs) if forward else self.fft_lib.ifftn(u, *args, **kwargs) 

798 self.plans[key] = transform 

799 

800 return self.plans[key] 

801 else: 

802 if forward: 

803 return partial(self.fft_lib.fftn, norm=kwargs.get('norm', 'backward')) 

804 else: 

805 return partial(self.fft_lib.ifftn, norm=kwargs.get('norm', 'forward')) 

806 

807 def transform(self, u, *args, axes=None, shape=None, **kwargs): 

808 """ 

809 FFT along axes. `kwargs` are passed on to the FFT library. 

810 

811 Args: 

812 u: Data you want to transform 

813 axes (tuple): Axes you want to transform over 

814 

815 Returns: 

816 transformed data 

817 """ 

818 axes = axes if axes else tuple(i for i in range(u.ndim)) 

819 kwargs['s'] = shape 

820 plan = self.get_plan(u, *args, forward=True, axes=axes, **kwargs) 

821 return plan(u, *args, axes=axes, **kwargs) 

822 

823 def itransform(self, u, *args, axes=None, shape=None, **kwargs): 

824 """ 

825 Inverse FFT. 

826 

827 Args: 

828 u: Data you want to transform 

829 axes (tuple): Axes over which to transform 

830 

831 Returns: 

832 transformed data 

833 """ 

834 axes = axes if axes else tuple(i for i in range(u.ndim)) 

835 kwargs['s'] = shape 

836 plan = self.get_plan(u, *args, forward=False, axes=axes, **kwargs) 

837 return plan(u, *args, axes=axes, **kwargs) / np.prod([u.shape[axis] for axis in axes]) 

838 

839 def get_BC(self, kind): 

840 """ 

841 Get a sort of boundary condition. You can use `kind=integral`, to fix the integral, or you can use `kind=Nyquist`. 

842 The latter is not really a boundary condition, but is used to set the Nyquist mode to some value, preferably zero. 

843 You should set the Nyquist mode zero when the solution in physical space is real and the resolution is even. 

844