forked from jan/fdfd_tools
ec674fe3f4
Solvers submodule includes a generic solver in case you already have a sparse matrix solver, or in case you have no solver at all. Example file now uses alternate solvers if available, and has a nicer way of picking which solver gets used.
226 lines
6.9 KiB
Python
226 lines
6.9 KiB
Python
import importlib
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import numpy
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from numpy.linalg import norm
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from fdfd_tools import vec, unvec, waveguide_mode
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import fdfd_tools
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import fdfd_tools.functional
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import fdfd_tools.grid
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from fdfd_tools.solvers import generic as generic_solver
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import gridlock
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from matplotlib import pyplot
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__author__ = 'Jan Petykiewicz'
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def test0(solver=generic_solver):
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dx = 50 # discretization (nm/cell)
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pml_thickness = 10 # (number of cells)
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wl = 1550 # Excitation wavelength
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omega = 2 * numpy.pi / wl
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# Device design parameters
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radii = (1, 0.6)
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th = 220
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center = [0, 0, 0]
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# refractive indices
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n_ring = numpy.sqrt(12.6) # ~Si
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n_air = 4.0 # air
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# Half-dimensions of the simulation grid
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xyz_max = numpy.array([1.2, 1.2, 0.3]) * 1000 + pml_thickness * dx
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# Coordinates of the edges of the cells.
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half_edge_coords = [numpy.arange(dx/2, m + dx, step=dx) for m in xyz_max]
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edge_coords = [numpy.hstack((-h[::-1], h)) for h in half_edge_coords]
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# #### Create the grid, mask, and draw the device ####
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grid = gridlock.Grid(edge_coords, initial=n_air**2, num_grids=3)
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grid.draw_cylinder(surface_normal=gridlock.Direction.z,
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center=center,
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radius=max(radii),
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thickness=th,
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eps=n_ring**2,
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num_points=24)
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grid.draw_cylinder(surface_normal=gridlock.Direction.z,
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center=center,
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radius=min(radii),
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thickness=th*1.1,
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eps=n_air ** 2,
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num_points=24)
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dxes = [grid.dxyz, grid.autoshifted_dxyz()]
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for a in (0, 1, 2):
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for p in (-1, 1):
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dxes = fdfd_tools.grid.stretch_with_scpml(dxes, axis=a, polarity=p, omega=omega,
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thickness=pml_thickness)
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J = [numpy.zeros_like(grid.grids[0], dtype=complex) for _ in range(3)]
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J[1][15, grid.shape[1]//2, grid.shape[2]//2] = 1e5
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'''
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Solve!
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'''
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x = solver(J=vec(J), **sim_args)
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A = fdfd_tools.functional.e_full(omega, dxes, vec(grid.grids)).tocsr()
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b = -1j * omega * vec(J)
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print('Norm of the residual is ', norm(A @ x - b))
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E = unvec(x, grid.shape)
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'''
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Plot results
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'''
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pyplot.figure()
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pyplot.pcolor(numpy.real(E[1][:, :, grid.shape[2]//2]), cmap='seismic')
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pyplot.axis('equal')
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pyplot.show()
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def test1(solver=generic_solver):
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dx = 40 # discretization (nm/cell)
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pml_thickness = 10 # (number of cells)
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wl = 1550 # Excitation wavelength
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omega = 2 * numpy.pi / wl
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# Device design parameters
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w = 600
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th = 220
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center = [0, 0, 0]
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# refractive indices
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n_wg = numpy.sqrt(12.6) # ~Si
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n_air = 1.0 # air
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# Half-dimensions of the simulation grid
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xyz_max = numpy.array([0.8, 0.9, 0.6]) * 1000 + (pml_thickness + 2) * dx
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# Coordinates of the edges of the cells.
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half_edge_coords = [numpy.arange(dx/2, m + dx/2, step=dx) for m in xyz_max]
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edge_coords = [numpy.hstack((-h[::-1], h)) for h in half_edge_coords]
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# #### Create the grid and draw the device ####
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grid = gridlock.Grid(edge_coords, initial=n_air**2, num_grids=3)
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grid.draw_cuboid(center=center, dimensions=[8e3, w, th], eps=n_wg**2)
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dxes = [grid.dxyz, grid.autoshifted_dxyz()]
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for a in (0, 1, 2):
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for p in (-1, 1):
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dxes = fdfd_tools.grid.stretch_with_scpml(dxes,omega=omega, axis=a, polarity=p,
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thickness=pml_thickness)
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half_dims = numpy.array([10, 20, 15]) * dx
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dims = [-half_dims, half_dims]
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dims[1][0] = dims[0][0]
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ind_dims = (grid.pos2ind(dims[0], which_shifts=None).astype(int),
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grid.pos2ind(dims[1], which_shifts=None).astype(int))
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wg_args = {
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'omega': omega,
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'slices': [slice(i, f+1) for i, f in zip(*ind_dims)],
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'dxes': dxes,
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'axis': 0,
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'polarity': +1,
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}
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wg_results = waveguide_mode.solve_waveguide_mode(mode_number=0, **wg_args, epsilon=grid.grids)
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J = waveguide_mode.compute_source(**wg_args, **wg_results)
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H_overlap = waveguide_mode.compute_overlap_e(**wg_args, **wg_results)
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pecg = gridlock.Grid(edge_coords, initial=0.0, num_grids=3)
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# pecg.draw_cuboid(center=[700, 0, 0], dimensions=[80, 1e8, 1e8], eps=1)
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# pecg.visualize_isosurface()
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pmcg = gridlock.Grid(edge_coords, initial=0.0, num_grids=3)
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# pmcg.draw_cuboid(center=[700, 0, 0], dimensions=[80, 1e8, 1e8], eps=1)
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# pmcg.visualize_isosurface()
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'''
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Solve!
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'''
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sim_args = {
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'omega': omega,
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'dxes': dxes,
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'epsilon': vec(grid.grids),
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'pec': vec(pecg.grids),
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'pmc': vec(pmcg.grids),
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}
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x = solver(J=vec(J), **sim_args)
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b = -1j * omega * vec(J)
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A = fdfd_tools.operators.e_full(**sim_args).tocsr()
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print('Norm of the residual is ', norm(A @ x - b))
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E = unvec(x, grid.shape)
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'''
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Plot results
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'''
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def pcolor(v):
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vmax = numpy.max(numpy.abs(v))
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pyplot.pcolor(v, cmap='seismic', vmin=-vmax, vmax=vmax)
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pyplot.axis('equal')
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pyplot.colorbar()
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center = grid.pos2ind([0, 0, 0], None).astype(int)
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pyplot.figure()
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pyplot.subplot(2, 2, 1)
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pcolor(numpy.real(E[1][center[0], :, :]))
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pyplot.subplot(2, 2, 2)
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pyplot.plot(numpy.log10(numpy.abs(E[1][:, center[1], center[2]]) + 1e-10))
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pyplot.subplot(2, 2, 3)
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pcolor(numpy.real(E[1][:, :, center[2]]))
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pyplot.subplot(2, 2, 4)
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def poyntings(E):
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e = vec(E)
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h = fdfd_tools.operators.e2h(omega, dxes) @ e
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cross1 = fdfd_tools.operators.poynting_e_cross(e, dxes) @ h.conj()
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cross2 = fdfd_tools.operators.poynting_h_cross(h.conj(), dxes) @ e
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s1 = unvec(0.5 * numpy.real(cross1), grid.shape)
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s2 = unvec(0.5 * numpy.real(-cross2), grid.shape)
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return s1, s2
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s1x, s2x = poyntings(E)
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pyplot.plot(s1x[0].sum(axis=2).sum(axis=1))
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pyplot.hold(True)
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pyplot.plot(s2x[0].sum(axis=2).sum(axis=1))
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pyplot.show()
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q = []
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for i in range(-5, 30):
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H_rolled = [numpy.roll(h, i, axis=0) for h in H_overlap]
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q += [numpy.abs(vec(E) @ vec(H_rolled))]
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pyplot.figure()
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pyplot.plot(q)
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pyplot.title('Overlap with mode')
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pyplot.show()
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print('Average overlap with mode:', sum(q)/len(q))
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def module_available(name):
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return importlib.util.find_spec(name) is not None
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if __name__ == '__main__':
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# test0()
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if module_available('opencl_fdfd'):
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from opencl_fdfd import cg_solver as opencl_solver
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test1(opencl_solver)
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# from opencl_fdfd.csr import fdfd_cg_solver as opencl_csr_solver
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# test1(opencl_csr_solver)
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# elif module_available('magma_fdfd'):
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# from magma_fdfd import solver as magma_solver
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# test1(magma_solver)
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else:
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test1()
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