def discretize_pymor(xblocks, yblocks, grid_num_intervals, use_list_vector_array): from pymor.analyticalproblems.thermalblock import ThermalBlockProblem from pymor.discretizers.elliptic import discretize_elliptic_cg from pymor.playground.discretizers.numpylistvectorarray import convert_to_numpy_list_vector_array print('Discretize ...') # setup analytical problem problem = ThermalBlockProblem(num_blocks=(args['XBLOCKS'], args['YBLOCKS'])) # discretize using continuous finite elements d, _ = discretize_elliptic_cg(problem, diameter=1. / args['--grid']) if use_list_vector_array: d = convert_to_numpy_list_vector_array(d) summary = '''pyMOR discretization: number of blocks: {xblocks}x{yblocks} grid intervals: {grid_num_intervals} ListVectorArray: {use_list_vector_array} '''.format(**locals()) return d, summary
def discretize_pymor(xblocks, yblocks, grid_num_intervals, use_list_vector_array): from pymor.analyticalproblems.thermalblock import thermal_block_problem from pymor.discretizers.builtin import discretize_stationary_cg from pymor.playground.discretizers.numpylistvectorarray import convert_to_numpy_list_vector_array print('Discretize ...') # setup analytical problem problem = thermal_block_problem(num_blocks=(xblocks, yblocks)) # discretize using continuous finite elements fom, _ = discretize_stationary_cg(problem, diameter=1. / grid_num_intervals) if use_list_vector_array: fom = convert_to_numpy_list_vector_array(fom) summary = f'''pyMOR model: number of blocks: {xblocks}x{yblocks} grid intervals: {grid_num_intervals} ListVectorArray: {use_list_vector_array} ''' return fom, summary
def discretize_pymor(xblocks, yblocks, grid_num_intervals, use_list_vector_array): from pymor.analyticalproblems.thermalblock import thermal_block_problem from pymor.discretizers.cg import discretize_stationary_cg from pymor.playground.discretizers.numpylistvectorarray import convert_to_numpy_list_vector_array print('Discretize ...') # setup analytical problem problem = thermal_block_problem(num_blocks=(xblocks, yblocks)) # discretize using continuous finite elements fom, _ = discretize_stationary_cg(problem, diameter=1. / grid_num_intervals) if use_list_vector_array: fom = convert_to_numpy_list_vector_array(fom) summary = f'''pyMOR model: number of blocks: {xblocks}x{yblocks} grid intervals: {grid_num_intervals} ListVectorArray: {use_list_vector_array} ''' return fom, summary
def discretize_pymor(xblocks, yblocks, grid_num_intervals, use_list_vector_array): from pymor.analyticalproblems.thermalblock import ThermalBlockProblem from pymor.discretizers.elliptic import discretize_elliptic_cg from pymor.playground.discretizers.numpylistvectorarray import convert_to_numpy_list_vector_array print('Discretize ...') # setup analytical problem problem = ThermalBlockProblem(num_blocks=(xblocks, yblocks)) # discretize using continuous finite elements d, _ = discretize_elliptic_cg(problem, diameter=1. / grid_num_intervals) if use_list_vector_array: d = convert_to_numpy_list_vector_array(d) summary = '''pyMOR discretization: number of blocks: {xblocks}x{yblocks} grid intervals: {grid_num_intervals} ListVectorArray: {use_list_vector_array} '''.format(**locals()) return d, 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), parameter_space=CubicParameterSpace({'diffusion': (2, )}, 0.1, 1.)) print('Discretize ...') fom, _ = discretize_stationary_cg(problem, diameter=1. / args['--grid']) if args['--list-vector-array']: from pymor.playground.discretizers.numpylistvectorarray import convert_to_numpy_list_vector_array fom = convert_to_numpy_list_vector_array(fom) if args['--cache-region'] != 'none': fom.enable_caching(args['--cache-region']) if args['--plot-solutions']: print('Showing some solutions') Us = () legend = () for mu in fom.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.parameter_type) 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, 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=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 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['--estimator-norm'] = args['--estimator-norm'].lower() assert args['--estimator-norm'] in {'trivial', 'h1'} args['--extension-alg'] = args['--extension-alg'].lower() assert args['--extension-alg'] in {'trivial', 'gram_schmidt', 'h1_gram_schmidt'} 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']) print('Solving on TriaGrid(({0},{0}))'.format(args['--grid'])) print('Setup Problem ...') problem = ThermalBlockProblem(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 = EllipticProblem(domain=problem.domain, diffusion_functions=problem.diffusion_functions, diffusion_functionals=functionals, rhs=problem.rhs, parameter_space=CubicParameterSpace({'diffusion': (2,)}, 0.1, 1.)) print('Discretize ...') discretization, _ = discretize_elliptic_cg(problem, diameter=1. / args['--grid']) if args['--list-vector-array']: from pymor.playground.discretizers.numpylistvectorarray import convert_to_numpy_list_vector_array discretization = convert_to_numpy_list_vector_array(discretization) if args['--cache-region'] != 'none': discretization.enable_caching(args['--cache-region']) print('The parameter type is {}'.format(discretization.parameter_type)) if args['--plot-solutions']: print('Showing some solutions') Us = () legend = () for mu in discretization.parameter_space.sample_randomly(2): print('Solving for diffusion = \n{} ... '.format(mu['diffusion'])) sys.stdout.flush() Us = Us + (discretization.solve(mu),) legend = legend + (str(mu['diffusion']),) discretization.visualize(Us, legend=legend, title='Detailed Solutions for different parameters', block=True) print('RB generation ...') product = discretization.h1_0_semi_product if args['--estimator-norm'] == 'h1' else None coercivity_estimator=ExpressionParameterFunctional('min([diffusion[0], diffusion[1]**2])', discretization.parameter_type) reductors = {'residual_basis': partial(reduce_coercive, product=product, coercivity_estimator=coercivity_estimator), 'traditional': partial(reduce_coercive_simple, product=product, coercivity_estimator=coercivity_estimator)} reductor = reductors[args['--reductor']] extension_algorithms = {'trivial': trivial_basis_extension, 'gram_schmidt': gram_schmidt_basis_extension, 'h1_gram_schmidt': partial(gram_schmidt_basis_extension, product=discretization.h1_0_semi_product)} extension_algorithm = extension_algorithms[args['--extension-alg']] pool = new_parallel_pool(ipython_num_engines=args['--ipython-engines'], ipython_profile=args['--ipython-profile']) greedy_data = adaptive_greedy(discretization, reductor, validation_mus=args['--validation-mus'], rho=args['--rho'], gamma=args['--gamma'], theta=args['--theta'], use_estimator=not args['--without-estimator'], error_norm=discretization.h1_0_semi_norm, extension_algorithm=extension_algorithm, max_extensions=args['RBSIZE'], visualize=args['--visualize-refinement']) rb_discretization, reconstructor = greedy_data['reduced_discretization'], greedy_data['reconstructor'] if args['--pickle']: print('\nWriting reduced discretization to file {} ...'.format(args['--pickle'] + '_reduced')) with open(args['--pickle'] + '_reduced', 'wb') as f: dump(rb_discretization, f) print('Writing detailed discretization and reconstructor to file {} ...'.format(args['--pickle'] + '_detailed')) with open(args['--pickle'] + '_detailed', 'wb') as f: dump((discretization, reconstructor), f) print('\nSearching for maximum error on random snapshots ...') results = reduction_error_analysis(rb_discretization, discretization=discretization, reconstructor=reconstructor, estimator=True, error_norms=(discretization.h1_0_semi_norm,), condition=True, test_mus=args['--test'], basis_sizes=25 if args['--plot-error-sequence'] else 1, plot=True, pool=pool) real_rb_size = rb_discretization.solution_space.dim print(''' *** RESULTS *** Problem: number of blocks: 2x2 h: sqrt(2)/{args[--grid]} Greedy basis generation: estimator disabled: {args[--without-estimator]} estimator norm: {args[--estimator-norm]} extension method: {args[--extension-alg]} 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 = discretization.solve(mumax) URB = reconstructor.reconstruct(rb_discretization.solve(mumax)) discretization.visualize((U, URB, U - URB), legend=('Detailed Solution', 'Reduced Solution', 'Error'), title='Maximum Error Solution', separate_colorbars=True, block=True)