Note

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2.4.8 Solver comparison

This example shows how to set up solvers explicitly and how to extract diagnostic information.

Deviation: 8.6e-05, 0.00018, 9.1e-05, 9.1e-05, 9.3e-05, explicit Euler solver, explicit, adaptive Runge-Kutta solver, implicit solver, Crank-Nicolson solver, Adam-Bashforth solver, scipy solver
Diagnostic information for explicit Euler solver:
{'controller': {'mpi_run': False, 't_start': 0, 't_end': 1.0, 'profiler': {'solver': 0.0015272600000031389, 'tracker': 5.125999999222586e-05, 'compilation': 5.394170932999998}, 'solver_start': '2026-04-18 21:38:40.764524+00:00', 'successful': True, 'stop_reason': 'Reached final time', 'solver_duration': '0:00:00.001568', 't_final': 1.0}, 'package_version': 'unknown', 'solver': {'class': 'EulerSolver', 'pde_class': 'DiffusionPDE', 'dt': 0.001, 'steps': 1000, 'dt_adaptive': False, 'stochastic': False, 'backend': {'name': 'numba', 'implementation': 'numba'}, 'post_step_data': None}}

Diagnostic information for explicit, adaptive Runge-Kutta solver:
{'controller': {'mpi_run': False, 't_start': 0, 't_end': 1.0, 'profiler': {'solver': 0.0003624400000035166, 'tracker': 4.047000000184653e-05, 'compilation': 6.578913187999994}, 'solver_start': '2026-04-18 21:38:47.352849+00:00', 'successful': True, 'stop_reason': 'Reached final time', 'solver_duration': '0:00:00.000395', 't_final': 1.0}, 'package_version': 'unknown', 'solver': {'class': 'RungeKuttaSolver', 'pde_class': 'DiffusionPDE', 'dt': 0.1974728536669598, 'steps': 12, 'dt_adaptive': True, 'stochastic': False, 'backend': {'name': 'numba', 'implementation': 'numba'}, 'dt_statistics': {'min': 0.001, 'max': 0.16357124408714668, 'mean': 0.08333333333333334, 'std': 0.05144090326391255, 'count': 12.0}, 'post_step_data': None}}

Diagnostic information for implicit solver:
{'controller': {'mpi_run': False, 't_start': 0, 't_end': 1.0, 'profiler': {'solver': 0.0077822269999927585, 'tracker': 4.5080000020902844e-05, 'compilation': 3.6097516719999874}, 'solver_start': '2026-04-18 21:38:50.974394+00:00', 'successful': True, 'stop_reason': 'Reached final time', 'solver_duration': '0:00:00.007819', 't_final': 1.0}, 'package_version': 'unknown', 'solver': {'class': 'ImplicitSolver', 'pde_class': 'DiffusionPDE', 'dt': 0.001, 'steps': 1000, 'dt_adaptive': False, 'stochastic': False, 'backend': {'name': 'numba', 'implementation': 'numba'}, 'function_evaluations': 0, 'post_step_data': None}}

Diagnostic information for Crank-Nicolson solver:
{'controller': {'mpi_run': False, 't_start': 0, 't_end': 1.0, 'profiler': {'solver': 0.011481795999998212, 'tracker': 4.4020000004252324e-05, 'compilation': 5.542617839000002}, 'solver_start': '2026-04-18 21:38:56.532661+00:00', 'successful': True, 'stop_reason': 'Reached final time', 'solver_duration': '0:00:00.011518', 't_final': 1.0}, 'package_version': 'unknown', 'solver': {'class': 'CrankNicolsonSolver', 'pde_class': 'DiffusionPDE', 'dt': 0.001, 'steps': 1000, 'dt_adaptive': False, 'stochastic': False, 'backend': {'name': 'numba', 'implementation': 'numba'}, 'function_evaluations': 0, 'post_step_data': None}}

Diagnostic information for Adam-Bashforth solver:
{'controller': {'mpi_run': False, 't_start': 0, 't_end': 1.0, 'profiler': {'solver': 3.3912777449999965, 'tracker': 4.552000001467604e-05, 'compilation': 1.7138511209999905}, 'solver_start': '2026-04-18 21:38:58.268223+00:00', 'successful': True, 'stop_reason': 'Reached final time', 'solver_duration': '0:00:03.393251', 't_final': 1.0}, 'package_version': 'unknown', 'solver': {'class': 'AdamsBashforthSolver', 'pde_class': 'DiffusionPDE', 'dt': 0.001, 'steps': 1000, 'dt_adaptive': False, 'stochastic': False, 'backend': {'name': 'numba', 'implementation': 'numba'}, 'post_step_data': None}}

Diagnostic information for scipy solver:
{'controller': {'mpi_run': False, 't_start': 0, 't_end': 1.0, 'profiler': {'solver': 0.6177487319999955, 'tracker': 3.1019999994441605e-05, 'compilation': 0.0009604400000000624}, 'solver_start': '2026-04-18 21:39:01.665085+00:00', 'successful': True, 'stop_reason': 'Reached final time', 'solver_duration': '0:00:00.617867', 't_final': np.float64(1.0)}, 'package_version': 'unknown', 'solver': {'class': 'ScipySolver', 'pde_class': 'DiffusionPDE', 'dt': 0.001, 'steps': 61, 'stochastic': False, 'backend': {'name': 'numba', 'implementation': 'numba'}}}


import pde

# initialize the grid, an initial condition, and the PDE
grid = pde.UnitGrid([32, 32])
field = pde.ScalarField.random_uniform(grid, -1, 1)
eq = pde.DiffusionPDE()


def run_solver(solver, label):
    """Helper function testing the solver."""
    controller = pde.Controller(solver, t_range=1, tracker=None)
    sol = controller.run(field, dt=1e-3)
    sol.label = label + " solver"
    print(f"Diagnostic information for {sol.label}:")
    print(controller.diagnostics)
    print()
    return sol


# try different solvers
solutions = [
    run_solver(pde.EulerSolver(eq), "explicit Euler"),
    run_solver(
        pde.RungeKuttaSolver(eq, adaptive=True), "explicit, adaptive Runge-Kutta"
    ),
    run_solver(pde.ImplicitSolver(eq), "implicit"),
    run_solver(pde.CrankNicolsonSolver(eq), "Crank-Nicolson"),
    run_solver(pde.AdamsBashforthSolver(eq), "Adam-Bashforth"),
    run_solver(pde.ScipySolver(eq), "scipy"),
]

# plot both fields and give the deviation as the title
deviations = [(solutions[0] - sol).fluctuations for sol in solutions]
title = "Deviation: " + ", ".join(f"{deviation:.2g}" for deviation in deviations[1:])
pde.FieldCollection(solutions).plot(title=title, arrangement=(2, 3))

Total running time of the script: (0 minutes 27.376 seconds)