def reduce_adaptive_greedy(fom, reductor, validation_mus,
extension_alg_name, max_extensions, use_estimator,
rho, gamma, theta, pool):
from pymor.algorithms.adaptivegreedy import rb_adaptive_greedy
# run greedy
greedy_data = rb_adaptive_greedy(fom, reductor, validation_mus=-validation_mus,
use_estimator=use_estimator, error_norm=fom.h1_0_semi_norm,
extension_params={'method': extension_alg_name}, max_extensions=max_extensions,
rho=rho, gamma=gamma, theta=theta, pool=pool)
rom = greedy_data['rom']
# generate summary
real_rb_size = rom.solution_space.dim
# the validation set consists of `validation_mus` random parameters plus the centers of the adaptive sample set cells
validation_mus += 1
summary = f'''Adaptive greedy basis generation:
initial size of validation set: {validation_mus}
error estimator used: {use_estimator}
extension method: {extension_alg_name}
prescribed basis size: {max_extensions}
actual basis size: {real_rb_size}
elapsed time: {greedy_data["time"]}
'''
return rom, summary
def thermalblock_demo(args):
args['--grid'] = int(args['--grid'])
args['RBSIZE'] = int(args['RBSIZE'])
args['--test'] = int(args['--test'])
args['--ipython-engines'] = int(args['--ipython-engines'])
args['--extension-alg'] = args['--extension-alg'].lower()
assert args['--extension-alg'] in {'trivial', 'gram_schmidt'}
args['--product'] = args['--product'].lower()
assert args['--product'] in {'trivial', 'h1'}
args['--reductor'] = args['--reductor'].lower()
assert args['--reductor'] in {'traditional', 'residual_basis'}
args['--cache-region'] = args['--cache-region'].lower()
args['--validation-mus'] = int(args['--validation-mus'])
args['--rho'] = float(args['--rho'])
args['--gamma'] = float(args['--gamma'])
args['--theta'] = float(args['--theta'])
problem = thermal_block_problem(num_blocks=(2, 2))
functionals = [
ExpressionParameterFunctional('diffusion[0]', {'diffusion': 2}),
ExpressionParameterFunctional('diffusion[1]**2', {'diffusion': 2}),
ExpressionParameterFunctional('diffusion[0]', {'diffusion': 2}),
ExpressionParameterFunctional('diffusion[1]', {'diffusion': 2})
]
problem = problem.with_(
diffusion=problem.diffusion.with_(coefficients=functionals), )
print('Discretize ...')
fom, _ = discretize_stationary_cg(problem, diameter=1. / args['--grid'])
if args['--list-vector-array']:
from pymor.discretizers.builtin.list import convert_to_numpy_list_vector_array
fom = convert_to_numpy_list_vector_array(fom)
if args['--cache-region'] != 'none':
# building a cache_id is only needed for persistent CacheRegions
cache_id = f"pymordemos.thermalblock_adaptive {args['--grid']}"
fom.enable_caching(args['--cache-region'], cache_id)
if args['--plot-solutions']:
print('Showing some solutions')
Us = ()
legend = ()
for mu in problem.parameter_space.sample_randomly(2):
print(f"Solving for diffusion = \n{mu['diffusion']} ... ")
sys.stdout.flush()
Us = Us + (fom.solve(mu), )
legend = legend + (str(mu['diffusion']), )
fom.visualize(Us,
legend=legend,
title='Detailed Solutions for different parameters',
block=True)
print('RB generation ...')
product = fom.h1_0_semi_product if args['--product'] == 'h1' else None
coercivity_estimator = ExpressionParameterFunctional(
'min([diffusion[0], diffusion[1]**2])', fom.parameters)
reductors = {
'residual_basis':
CoerciveRBReductor(fom,
product=product,
coercivity_estimator=coercivity_estimator),
'traditional':
SimpleCoerciveRBReductor(fom,
product=product,
coercivity_estimator=coercivity_estimator)
}
reductor = reductors[args['--reductor']]
pool = new_parallel_pool(ipython_num_engines=args['--ipython-engines'],
ipython_profile=args['--ipython-profile'])
greedy_data = rb_adaptive_greedy(
fom,
reductor,
problem.parameter_space,
validation_mus=args['--validation-mus'],
rho=args['--rho'],
gamma=args['--gamma'],
theta=args['--theta'],
use_estimator=not args['--without-estimator'],
error_norm=fom.h1_0_semi_norm,
max_extensions=args['RBSIZE'],
visualize=not args['--no-visualize-refinement'])
rom = greedy_data['rom']
if args['--pickle']:
print(
f"\nWriting reduced model to file {args['--pickle']}_reduced ...")
with open(args['--pickle'] + '_reduced', 'wb') as f:
dump(rom, f)
print(
f"Writing detailed model and reductor to file {args['--pickle']}_detailed ..."
)
with open(args['--pickle'] + '_detailed', 'wb') as f:
dump((fom, reductor), f)
print('\nSearching for maximum error on random snapshots ...')
results = reduction_error_analysis(
rom,
fom=fom,
reductor=reductor,
estimator=True,
error_norms=(fom.h1_0_semi_norm, ),
condition=True,
test_mus=problem.parameter_space.sample_randomly(args['--test']),
basis_sizes=25 if args['--plot-error-sequence'] else 1,
plot=True,
pool=pool)
real_rb_size = rom.solution_space.dim
print('''
*** RESULTS ***
Problem:
number of blocks: 2x2
h: sqrt(2)/{args[--grid]}
Greedy basis generation:
estimator disabled: {args[--without-estimator]}
extension method: {args[--extension-alg]}
product: {args[--product]}
prescribed basis size: {args[RBSIZE]}
actual basis size: {real_rb_size}
elapsed time: {greedy_data[time]}
'''.format(**locals()))
print(results['summary'])
sys.stdout.flush()
if args['--plot-error-sequence']:
from matplotlib import pyplot as plt
plt.show(results['figure'])
if args['--plot-err']:
mumax = results['max_error_mus'][0, -1]
U = fom.solve(mumax)
URB = reductor.reconstruct(rom.solve(mumax))
fom.visualize(
(U, URB, U - URB),
legend=('Detailed Solution', 'Reduced Solution', 'Error'),
title='Maximum Error Solution',
separate_colorbars=True,
block=True)
def main(
rbsize: int = Argument(..., help='Size of the reduced basis.'),
cache_region: Choices('none memory disk persistent') = Option(
'none',
help='Name of cache region to use for caching solution snapshots.'
),
error_estimator: bool = Option(True, help='Use error estimator for basis generation.'),
gamma: float = Option(0.2, help='Weight factor for age penalty term in refinement indicators.'),
grid: int = Option(100, help='Use grid with 2*NI*NI elements.'),
ipython_engines: int = Option(
0,
help='If positive, the number of IPython cluster engines to use for parallel greedy search. '
'If zero, no parallelization is performed.'
),
ipython_profile: str = Option(None, help='IPython profile to use for parallelization.'),
list_vector_array: bool = Option(
False,
help='Solve using ListVectorArray[NumpyVector] instead of NumpyVectorArray.'
),
pickle: str = Option(
None,
help='Pickle reduced discretization, as well as reductor and high-dimensional model to files with this prefix.'
),
plot_err: bool = Option(False, help='Plot error.'),
plot_solutions: bool = Option(False, help='Plot some example solutions.'),
plot_error_sequence: bool = Option(False, help='Plot reduction error vs. basis size.'),
product: Choices('euclidean h1') = Option(
'h1',
help='Product w.r.t. which to orthonormalize and calculate Riesz representatives.'
),
reductor: Choices('traditional residual_basis') = Option(
'residual_basis',
help='Reductor (error estimator) to choose (traditional, residual_basis).'
),
rho: float = Option(1.1, help='Maximum allowed ratio between error on validation set and on training set.'),
test: int = Option(10, help='Use COUNT snapshots for stochastic error estimation.'),
theta: float = Option(0., help='Ratio of elements to refine.'),
validation_mus: int = Option(0, help='Size of validation set.'),
visualize_refinement: bool = Option(True, help='Visualize the training set refinement indicators.'),
):
"""Modified thermalblock demo using adaptive greedy basis generation algorithm."""
problem = thermal_block_problem(num_blocks=(2, 2))
functionals = [ExpressionParameterFunctional('diffusion[0]', {'diffusion': 2}),
ExpressionParameterFunctional('diffusion[1]**2', {'diffusion': 2}),
ExpressionParameterFunctional('diffusion[0]', {'diffusion': 2}),
ExpressionParameterFunctional('diffusion[1]', {'diffusion': 2})]
problem = problem.with_(
diffusion=problem.diffusion.with_(coefficients=functionals),
)
print('Discretize ...')
fom, _ = discretize_stationary_cg(problem, diameter=1. / grid)
if list_vector_array:
from pymor.discretizers.builtin.list import convert_to_numpy_list_vector_array
fom = convert_to_numpy_list_vector_array(fom)
if cache_region != 'none':
# building a cache_id is only needed for persistent CacheRegions
cache_id = f"pymordemos.thermalblock_adaptive {grid}"
fom.enable_caching(cache_region.value, cache_id)
if plot_solutions:
print('Showing some solutions')
Us = ()
legend = ()
for mu in problem.parameter_space.sample_randomly(2):
print(f"Solving for diffusion = \n{mu['diffusion']} ... ")
sys.stdout.flush()
Us = Us + (fom.solve(mu),)
legend = legend + (str(mu['diffusion']),)
fom.visualize(Us, legend=legend, title='Detailed Solutions for different parameters', block=True)
print('RB generation ...')
product_op = fom.h1_0_semi_product if product == 'h1' else None
coercivity_estimator = ExpressionParameterFunctional('min([diffusion[0], diffusion[1]**2])',
fom.parameters)
reductors = {'residual_basis': CoerciveRBReductor(fom, product=product_op,
coercivity_estimator=coercivity_estimator),
'traditional': SimpleCoerciveRBReductor(fom, product=product_op,
coercivity_estimator=coercivity_estimator)}
reductor = reductors[reductor]
pool = new_parallel_pool(ipython_num_engines=ipython_engines, ipython_profile=ipython_profile)
greedy_data = rb_adaptive_greedy(
fom, reductor, problem.parameter_space,
validation_mus=validation_mus,
rho=rho,
gamma=gamma,
theta=theta,
use_error_estimator=error_estimator,
error_norm=fom.h1_0_semi_norm,
max_extensions=rbsize,
visualize=visualize_refinement
)
rom = greedy_data['rom']
if pickle:
print(f"\nWriting reduced model to file {pickle}_reduced ...")
with open(pickle + '_reduced', 'wb') as f:
dump(rom, f)
print(f"Writing detailed model and reductor to file {pickle}_detailed ...")
with open(pickle + '_detailed', 'wb') as f:
dump((fom, reductor), f)
print('\nSearching for maximum error on random snapshots ...')
results = reduction_error_analysis(rom,
fom=fom,
reductor=reductor,
error_estimator=True,
error_norms=(fom.h1_0_semi_norm,),
condition=True,
test_mus=problem.parameter_space.sample_randomly(test),
basis_sizes=25 if plot_error_sequence else 1,
plot=True,
pool=pool)
real_rb_size = rom.solution_space.dim
print('''
*** RESULTS ***
Problem:
number of blocks: 2x2
h: sqrt(2)/{grid}
Greedy basis generation:
error estimator enalbed: {error_estimator}
product: {product}
prescribed basis size: {rbsize}
actual basis size: {real_rb_size}
elapsed time: {greedy_data[time]}
'''.format(**locals()))
print(results['summary'])
sys.stdout.flush()
if plot_error_sequence:
from matplotlib import pyplot as plt
plt.show()
if plot_err:
mumax = results['max_error_mus'][0, -1]
U = fom.solve(mumax)
URB = reductor.reconstruct(rom.solve(mumax))
fom.visualize((U, URB, U - URB), legend=('Detailed Solution', 'Reduced Solution', 'Error'),
title='Maximum Error Solution', separate_colorbars=True, block=True)
