Source code for sfepy.terms.terms_adj_navier_stokes

import numpy as nm

from sfepy.terms.terms import Term, terms
from sfepy.base.base import get_default

[docs] def grad_as_vector(grad): grad = grad.transpose((0, 1, 3, 2)) sh = grad.shape return grad.reshape((sh[0], sh[1], sh[2] * sh[3], 1))
[docs] class AdjDivGradTerm(Term): r""" Gateaux differential of :math:`\Psi(\ul{u}) = \int_{\Omega} \nu\ \nabla \ul{v} : \nabla \ul{u}` w.r.t. :math:`\ul{u}` in the direction :math:`\ul{v}` or adjoint term to `dw_div_grad`. :Definition: .. math:: w \delta_{u} \Psi(\ul{u}) \circ \ul{v} :Arguments: - material_1 : :math:`w` (weight) - material_2 : :math:`\nu` (viscosity) - virtual : :math:`\ul{v}` - state : :math:`\ul{u}` """ name = 'dw_adj_div_grad' arg_types = ('material_1', 'material_2', 'virtual', 'parameter') arg_shapes = {'material_1' : '1, 1', 'material_2' : '1, 1', 'virtual' : ('D', None), 'parameter' : 'D'} function = staticmethod(terms.term_ns_asm_div_grad)
[docs] def get_fargs(self, mat1, mat2, virtual, state, mode=None, term_mode=None, diff_var=None, **kwargs): vgv, _ = self.get_mapping(virtual) vgs, _ = self.get_mapping(state) if diff_var is None: grad = grad_as_vector(self.get(state, 'grad')) fmode = 0 else: grad = nm.array([0], ndmin=4, dtype=nm.float64) fmode = 1 return grad, mat1 * mat2, vgv, vgs, fmode
[docs] class AdjConvect1Term(Term): r""" The first adjoint term to nonlinear convective term `dw_convect`. :Definition: .. math:: \int_{\Omega} ((\ul{v} \cdot \nabla) \ul{u}) \cdot \ul{w} :Arguments: - virtual : :math:`\ul{v}` - state : :math:`\ul{w}` - parameter : :math:`\ul{u}` """ name = 'dw_adj_convect1' arg_types = ('virtual', 'state', 'parameter' ) arg_shapes = {'virtual' : ('D', 'state'), 'state' : 'D', 'parameter' : 'D'} function = staticmethod(terms.dw_adj_convect1)
[docs] def get_fargs(self, virtual, state, parameter, mode=None, term_mode=None, diff_var=None, **kwargs): vg, _ = self.get_mapping(state) val_w = self.get(state, 'val') grad_u = self.get(parameter, 'grad') # No transposition here! fmode = diff_var is not None return val_w, grad_u, vg, fmode
[docs] class AdjConvect2Term(Term): r""" The second adjoint term to nonlinear convective term `dw_convect`. :Definition: .. math:: \int_{\Omega} ((\ul{u} \cdot \nabla) \ul{v}) \cdot \ul{w} :Arguments: - virtual : :math:`\ul{v}` - state : :math:`\ul{w}` - parameter : :math:`\ul{u}` """ name = 'dw_adj_convect2' arg_types = ('virtual', 'state', 'parameter' ) arg_shapes = {'virtual' : ('D', 'state'), 'state' : 'D', 'parameter' : 'D'} function = staticmethod(terms.dw_adj_convect2)
[docs] def get_fargs(self, virtual, state, parameter, mode=None, term_mode=None, diff_var=None, **kwargs): vg, _ = self.get_mapping(state) val_w = self.get(state, 'val') val_u = self.get(parameter, 'val') fmode = diff_var is not None return val_w, val_u, vg, fmode
[docs] class SUPGCAdjStabilizationTerm(Term): r""" Adjoint term to SUPG stabilization term `dw_st_supg_c`. :Definition: .. math:: \sum_{K \in \Ical_h}\int_{T_K} \delta_K\ [ ((\ul{v} \cdot \nabla) \ul{u}) ((\ul{u} \cdot \nabla) \ul{w}) + ((\ul{u} \cdot \nabla) \ul{u}) ((\ul{v} \cdot \nabla) \ul{w}) ] :Arguments: - material : :math:`\delta_K` - virtual : :math:`\ul{v}` - state : :math:`\ul{w}` - parameter : :math:`\ul{u}` """ name = 'dw_st_adj_supg_c' arg_types = ('material', 'virtual', 'parameter', 'state') arg_shapes = {'material' : '1, 1', 'virtual' : ('D', 'state'), 'state' : 'D', 'parameter' : 'D'} function = staticmethod(terms.dw_st_adj_supg_c)
[docs] def get_fargs(self, mat, virtual, state, parameter, mode=None, term_mode=None, diff_var=None, **kwargs): vg, _ = self.get_mapping(state) val_u = self.get(parameter, 'val') grad_u = self.get(parameter, 'grad').transpose((0, 1, 3, 2)).copy() conn = state.field.get_econn(self.act_integration, self.region) fmode = diff_var is not None return state(), val_u, grad_u, mat, vg, conn, fmode
[docs] class SUPGPAdj1StabilizationTerm(Term): r""" The first adjoint term to SUPG stabilization term `dw_st_supg_p`. :Definition: .. math:: \sum_{K \in \Ical_h}\int_{T_K} \delta_K\ \nabla p (\ul{v} \cdot \nabla \ul{w}) :Arguments: - material : :math:`\delta_K` - virtual : :math:`\ul{v}` - state : :math:`\ul{w}` - parameter : :math:`p` """ name = 'dw_st_adj1_supg_p' arg_types = ('material', 'virtual', 'state', 'parameter') arg_shapes = {'material' : '1, 1', 'virtual' : ('D', 'state'), 'state' : 'D', 'parameter' : 1} function = staticmethod(terms.dw_st_adj1_supg_p)
[docs] def get_fargs(self, mat, virtual, state, parameter, mode=None, term_mode=None, diff_var=None, **kwargs): vg_w, _ = self.get_mapping(state) grad_p = self.get(parameter, 'grad') conn_w = state.field.get_econn(self.act_integration, self.region) fmode = diff_var is not None return state(), grad_p, mat, vg_w, conn_w, fmode
[docs] class SUPGPAdj2StabilizationTerm(Term): r""" The second adjoint term to SUPG stabilization term `dw_st_supg_p` as well as adjoint term to PSPG stabilization term `dw_st_pspg_c`. :Definition: .. math:: \sum_{K \in \Ical_h}\int_{T_K} \tau_K\ \nabla r (\ul{v} \cdot \nabla \ul{u}) :Arguments: - material : :math:`\tau_K` - virtual : :math:`\ul{v}` - parameter : :math:`\ul{u}` - state : :math:`r` """ name = 'dw_st_adj2_supg_p' arg_types = ('material', 'virtual', 'parameter', 'state') arg_shapes = {'material' : '1, 1', 'virtual' : ('D', 'state'), 'state' : 1, 'parameter' : 'D'} function = staticmethod(terms.dw_st_adj2_supg_p)
[docs] def get_fargs(self, mat, virtual, parameter, state, mode=None, term_mode=None, diff_var=None, **kwargs): vg_r, _ = self.get_mapping(state) vg_u, _ = self.get_mapping(parameter) grad_u = self.get(parameter, 'grad').transpose((0, 1, 3, 2)).copy() conn_r = state.field.get_econn(self.act_integration, self.region) fmode = diff_var is not None return grad_u, state(), mat, vg_u, vg_r, conn_r, fmode
[docs] class SDDotTerm(Term): r""" Sensitivity (shape derivative) of dot product of scalars or vectors. :Definition: .. math:: \int_{\Omega} p q (\nabla \cdot \ul{\Vcal}) \mbox{ , } \int_{\Omega} (\ul{u} \cdot \ul{w}) (\nabla \cdot \ul{\Vcal}) :Arguments: - parameter_1 : :math:`p` or :math:`\ul{u}` - parameter_2 : :math:`q` or :math:`\ul{w}` - parameter_mv : :math:`\ul{\Vcal}` """ name = 'ev_sd_dot' arg_types = ('parameter_1', 'parameter_2', 'parameter_mv') arg_shapes = [{'parameter_1' : 'D', 'parameter_2' : 'D', 'parameter_mv' : 'D'}, {'parameter_1' : 1, 'parameter_2' : 1}] function = staticmethod(terms.d_sd_volume_dot)
[docs] def get_fargs(self, par1, par2, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): vg, _ = self.get_mapping(par1) val1 = self.get(par1, 'val') val2 = self.get(par2, 'val') div_mv = self.get(par_mv, 'div') return val1, val2, div_mv, vg, get_default(term_mode, 1)
[docs] def get_eval_shape(self, par1, par2, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): n_el, n_qp, dim, n_en, n_c = self.get_data_shape(par1) return (n_el, 1, 1, 1), par1.dtype
[docs] class SDDivTerm(Term): r""" Sensitivity (shape derivative) of Stokes term `dw_stokes` in 'div' mode. Supports the following term modes: 1 (sensitivity) or 0 (original term value). :Definition: .. math:: \int_{\Omega} p [ (\nabla \cdot \ul{w}) (\nabla \cdot \ul{\Vcal}) - \pdiff{\Vcal_k}{x_i} \pdiff{w_i}{x_k} ] :Arguments: - parameter_u : :math:`\ul{u}` - parameter_p : :math:`p` - parameter_mv : :math:`\ul{\Vcal}` """ name = 'ev_sd_div' arg_types = ('parameter_u', 'parameter_p', 'parameter_mv') arg_shapes = {'parameter_u' : 'D', 'parameter_p' : 1, 'parameter_mv' : 'D'} function = staticmethod(terms.d_sd_div)
[docs] def get_fargs(self, par_u, par_p, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): vg, _ = self.get_mapping(par_u) div_u = self.get(par_u, 'div') grad_u = grad_as_vector(self.get(par_u, 'grad')) val_p = self.get(par_p, 'val') div_mv = self.get(par_mv, 'div') grad_mv = grad_as_vector(self.get(par_mv, 'grad')) return (div_u, grad_u, val_p, div_mv, grad_mv, vg, get_default(term_mode, 1))
[docs] def get_eval_shape(self, par_u, par_p, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): n_el, n_qp, dim, n_en, n_c = self.get_data_shape(par_u) return (n_el, 1, 1, 1), par_u.dtype
[docs] class SDDivGradTerm(Term): r""" Sensitivity (shape derivative) of diffusion term `dw_div_grad`. Supports the following term modes: 1 (sensitivity) or 0 (original term value). :Definition: .. math:: \int_{\Omega} \hat{I} \nabla \ul{v} : \nabla \ul{u} \mbox{ , } \int_{\Omega} \nu \hat{I} \nabla \ul{v} : \nabla \ul{u} .. math:: \hat{I}_{ijkl} = \delta_{ik}\delta_{jl} \nabla \cdot \ul{\Vcal} - \delta_{ik}\delta_{js} {\partial \Vcal_l \over \partial x_s} - \delta_{is}\delta_{jl} {\partial \Vcal_k \over \partial x_s} :Arguments: - material : :math:`\nu` (viscosity, optional) - parameter_u : :math:`\ul{u}` - parameter_w : :math:`\ul{w}` - parameter_mv : :math:`\ul{\Vcal}` """ name = 'ev_sd_div_grad' arg_types = ('opt_material', 'parameter_u', 'parameter_w', 'parameter_mv') arg_shapes = [{'opt_material' : '1, 1', 'parameter_u' : 'D', 'parameter_w' : 'D', 'parameter_mv' : 'D'}, {'opt_material' : None}] function = staticmethod(terms.d_sd_div_grad)
[docs] def get_fargs(self, mat, par_u, par_w, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): vg, _ = self.get_mapping(par_u) grad_u = grad_as_vector(self.get(par_u, 'grad')) grad_w = grad_as_vector(self.get(par_w, 'grad')) div_mv = self.get(par_mv, 'div') grad_mv = grad_as_vector(self.get(par_mv, 'grad')) if mat is None: mat = nm.ones((1, div_mv.shape[1], 1, 1), dtype=nm.float64) return (grad_u, grad_w, div_mv, grad_mv, mat, vg, get_default(term_mode, 1))
[docs] def get_eval_shape(self, mat, par_u, par_w, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): n_el, n_qp, dim, n_en, n_c = self.get_data_shape(par_u) return (n_el, 1, 1, 1), par_u.dtype
[docs] class SDConvectTerm(Term): r""" Sensitivity (shape derivative) of convective term `dw_convect`. Supports the following term modes: 1 (sensitivity) or 0 (original term value). :Definition: .. math:: \int_{\Omega} [ u_k \pdiff{u_i}{x_k} w_i (\nabla \cdot \Vcal) - u_k \pdiff{\Vcal_j}{x_k} \pdiff{u_i}{x_j} w_i ] :Arguments: - parameter_u : :math:`\ul{u}` - parameter_w : :math:`\ul{w}` - parameter_mv : :math:`\ul{\Vcal}` """ name = 'ev_sd_convect' arg_types = ('parameter_u', 'parameter_w', 'parameter_mv') arg_shapes = {'parameter_u' : 'D', 'parameter_w' : 'D', 'parameter_mv' : 'D'} function = staticmethod(terms.d_sd_convect)
[docs] def get_fargs(self, par_u, par_w, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): vg, _ = self.get_mapping(par_u) val_u = self.get(par_u, 'val') grad_u = grad_as_vector(self.get(par_u, 'grad')) val_w = self.get(par_w, 'val') div_mv = self.get(par_mv, 'div') grad_mv = grad_as_vector(self.get(par_mv, 'grad')) return (val_u, grad_u, val_w, div_mv, grad_mv, vg, get_default(term_mode, 1))
[docs] def get_eval_shape(self, par_u, par_w, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): n_el, n_qp, dim, n_en, n_c = self.get_data_shape(par_u) return (n_el, 1, 1, 1), par_u.dtype
[docs] class NSOFMinGradTerm(Term): name = 'd_of_ns_min_grad' arg_types = ('material_1', 'material_2', 'parameter') arg_shapes = {'material_1' : '1, 1', 'material_2' : '1, 1', 'parameter' : 1} function = staticmethod(terms.d_of_nsMinGrad)
[docs] def get_fargs(self, weight, mat, parameter, mode=None, term_mode=None, diff_var=None, **kwargs): vg, _ = self.get_mapping(parameter) grad = grad_as_vector(self.get(parameter, 'grad')) return grad, weight * mat, vg
[docs] def get_eval_shape(self, weight, mat, parameter, mode=None, term_mode=None, diff_var=None, **kwargs): return (1, 1, 1, 1), parameter.dtype
[docs] class NSOFSurfMinDPressTerm(Term): r""" Sensitivity of :math:`\Psi(p)`. :Definition: .. math:: \delta \Psi(p) = \delta \left( \int_{\Gamma_{in}}p - \int_{\Gamma_{out}}bpress \right) :Arguments: - material_1 : :math:`w` (weight) - material_2 : :math:`bpress` (given pressure) - parameter : :math:`p` """ name = 'ev_of_ns_surf_min_d_press' arg_types = ('material_1', 'material_2', 'parameter') arg_shapes = {'material_1' : 1, 'material_2' : 1, 'parameter' : 1} integration = 'facet' function = staticmethod(terms.d_of_nsSurfMinDPress)
[docs] def get_fargs(self, weight, bpress, parameter, mode=None, term_mode=None, diff_var=None, **kwargs): sg, _ = self.get_mapping(parameter) val_p = self.get(parameter, 'val') return val_p, weight, bpress, sg, 0
[docs] def get_eval_shape(self, weight, bpress, parameter, mode=None, term_mode=None, diff_var=None, **kwargs): return (1, 1, 1, 1), parameter.dtype
[docs] class NSOFSurfMinDPressDiffTerm(NSOFSurfMinDPressTerm): r""" Gateaux differential of :math:`\Psi(p)` w.r.t. :math:`p` in the direction :math:`q`. :Definition: .. math:: w \delta_{p} \Psi(p) \circ q :Arguments: - material : :math:`w` (weight) - virtual : :math:`q` """ name = 'dw_of_ns_surf_min_d_press_diff' arg_types = ('material', 'virtual') arg_shapes = {'material' : 1, 'virtual' : (1, None)}
[docs] def get_fargs(self, weight, virtual, mode=None, term_mode=None, diff_var=None, **kwargs): sg, _ = self.get_mapping(virtual) aux = nm.array([0], ndmin=4, dtype=nm.float64) return aux, weight, 0.0, sg, 1
[docs] class SDGradDivStabilizationTerm(Term): r""" Sensitivity (shape derivative) of stabilization term `dw_st_grad_div`. :Definition: .. math:: \gamma \int_{\Omega} [ (\nabla \cdot \ul{u}) (\nabla \cdot \ul{w}) (\nabla \cdot \ul{\Vcal}) - \pdiff{u_i}{x_k} \pdiff{\Vcal_k}{x_i} (\nabla \cdot \ul{w}) - (\nabla \cdot \ul{u}) \pdiff{w_i}{x_k} \pdiff{\Vcal_k}{x_i} ] :Arguments: - material : :math:`\gamma` - parameter_u : :math:`\ul{u}` - parameter_w : :math:`\ul{w}` - parameter_mv : :math:`\ul{\Vcal}` - mode : 1 (sensitivity) or 0 (original term value) """ name = 'ev_sd_st_grad_div' arg_types = ('material', 'parameter_u', 'parameter_w', 'parameter_mv') arg_shapes = {'material' : '1, 1', 'parameter_u' : 'D', 'parameter_w' : 'D', 'parameter_mv' : 'D'} function = staticmethod(terms.d_sd_st_grad_div)
[docs] def get_fargs(self, mat, par_u, par_w, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): vg, _ = self.get_mapping(par_u) div_u = self.get(par_u, 'div') grad_u = grad_as_vector(self.get(par_u, 'grad')) div_w = self.get(par_w, 'div') grad_w = grad_as_vector(self.get(par_w, 'grad')) div_mv = self.get(par_mv, 'div') grad_mv = grad_as_vector(self.get(par_mv, 'grad')) return (div_u, grad_u, div_w, grad_w, div_mv, grad_mv, mat, vg, get_default(term_mode, 1))
[docs] def get_eval_shape(self, mat, par_u, par_w, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): n_el, n_qp, dim, n_en, n_c = self.get_data_shape(par_u) return (n_el, 1, 1, 1), par_u.dtype
[docs] class SDSUPGCStabilizationTerm(Term): r""" Sensitivity (shape derivative) of stabilization term `dw_st_supg_c`. :Definition: .. math:: \sum_{K \in \Ical_h}\int_{T_K} \delta_K\ [ (\ul{b} \cdot \nabla u_k) (\ul{b} \cdot \nabla w_k) (\nabla \cdot \Vcal) - (\ul{b} \cdot \nabla \Vcal_i) \pdiff{u_k}{x_i} (\ul{b} \cdot \nabla w_k) - (\ul{u} \cdot \nabla u_k) (\ul{b} \cdot \nabla \Vcal_i) \pdiff{w_k}{x_i} ] :Arguments: - material : :math:`\delta_K` - parameter_b : :math:`\ul{b}` - parameter_u : :math:`\ul{u}` - parameter_w : :math:`\ul{w}` - parameter_mv : :math:`\ul{\Vcal}` - mode : 1 (sensitivity) or 0 (original term value) """ name = 'ev_sd_st_supg_c' arg_types = ('material', 'parameter_b', 'parameter_u', 'parameter_w', 'parameter_mv') arg_shapes = {'material' : '1, 1', 'parameter_b' : 'D', 'parameter_u' : 'D', 'parameter_w' : 'D', 'parameter_mv' : 'D'} function = staticmethod(terms.d_sd_st_supg_c)
[docs] def get_fargs(self, mat, par_b, par_u, par_w, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): vg, _ = self.get_mapping(par_u) val_b = self.get(par_b, 'val') grad_u = self.get(par_u, 'grad').transpose((0, 1, 3, 2)).copy() grad_w = self.get(par_w, 'grad').transpose((0, 1, 3, 2)).copy() div_mv = self.get(par_mv, 'div') grad_mv = self.get(par_mv, 'grad').transpose((0, 1, 3, 2)).copy() return (val_b, grad_u, grad_w, div_mv, grad_mv, mat, vg, get_default(term_mode, 1))
[docs] def get_eval_shape(self, mat, par_b, par_u, par_w, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): n_el, n_qp, dim, n_en, n_c = self.get_data_shape(par_u) return (n_el, 1, 1, 1), par_u.dtype
[docs] class SDPSPGCStabilizationTerm(Term): r""" Sensitivity (shape derivative) of stabilization terms `dw_st_supg_p` or `dw_st_pspg_c`. :Definition: .. math:: \sum_{K \in \Ical_h}\int_{T_K} \delta_K\ [ \pdiff{r}{x_i} (\ul{b} \cdot \nabla u_i) (\nabla \cdot \Vcal) - \pdiff{r}{x_k} \pdiff{\Vcal_k}{x_i} (\ul{b} \cdot \nabla u_i) - \pdiff{r}{x_k} (\ul{b} \cdot \nabla \Vcal_k) \pdiff{u_i}{x_k} ] :Arguments: - material : :math:`\delta_K` - parameter_b : :math:`\ul{b}` - parameter_u : :math:`\ul{u}` - parameter_r : :math:`r` - parameter_mv : :math:`\ul{\Vcal}` - mode : 1 (sensitivity) or 0 (original term value) """ name = 'ev_sd_st_pspg_c' arg_types = ('material', 'parameter_b', 'parameter_u', 'parameter_r', 'parameter_mv') arg_shapes = {'material' : '1, 1', 'parameter_b' : 'D', 'parameter_u' : 'D', 'parameter_r' : 1, 'parameter_mv' : 'D'} function = staticmethod(terms.d_sd_st_pspg_c)
[docs] def get_fargs(self, mat, par_b, par_u, par_r, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): vg, _ = self.get_mapping(par_u) val_b = self.get(par_b, 'val') grad_u = self.get(par_u, 'grad').transpose((0, 1, 3, 2)).copy() grad_r = self.get(par_r, 'grad') div_mv = self.get(par_mv, 'div') grad_mv = self.get(par_mv, 'grad').transpose((0, 1, 3, 2)).copy() return (val_b, grad_u, grad_r, div_mv, grad_mv, mat, vg, get_default(term_mode, 1))
[docs] def get_eval_shape(self, mat, par_b, par_u, par_r, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): n_el, n_qp, dim, n_en, n_c = self.get_data_shape(par_u) return (n_el, 1, 1, 1), par_u.dtype
[docs] class SDPSPGPStabilizationTerm(Term): r""" Sensitivity (shape derivative) of stabilization term `dw_st_pspg_p`. :Definition: .. math:: \sum_{K \in \Ical_h}\int_{T_K} \tau_K\ [ (\nabla r \cdot \nabla p) (\nabla \cdot \Vcal) - \pdiff{r}{x_k} (\nabla \Vcal_k \cdot \nabla p) - (\nabla r \cdot \nabla \Vcal_k) \pdiff{p}{x_k} ] :Arguments: - material : :math:`\tau_K` - parameter_r : :math:`r` - parameter_p : :math:`p` - parameter_mv : :math:`\ul{\Vcal}` - mode : 1 (sensitivity) or 0 (original term value) """ name = 'ev_sd_st_pspg_p' arg_types = ('material', 'parameter_r', 'parameter_p', 'parameter_mv') arg_shapes = {'material' : '1, 1', 'parameter_r' : 1, 'parameter_p' : 1, 'parameter_mv' : 'D'} function = staticmethod(terms.d_sd_st_pspg_p)
[docs] def get_fargs(self, mat, par_r, par_p, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): vg, _ = self.get_mapping(par_p) grad_r = self.get(par_r, 'grad') grad_p = self.get(par_p, 'grad') div_mv = self.get(par_mv, 'div') grad_mv = self.get(par_mv, 'grad').transpose((0, 1, 3, 2)).copy() return (grad_r, grad_p, div_mv, grad_mv, mat, vg, get_default(term_mode, 1))
[docs] def get_eval_shape(self, mat, par_r, par_p, par_mv, mode=None, term_mode=None, diff_var=None, **kwargs): n_el, n_qp, dim, n_en, n_c = self.get_data_shape(par_p) return (n_el, 1, 1, 1), par_p.dtype