Generateurv2/backend/env/lib/python3.10/site-packages/sympy/physics/mechanics/kane.py

from sympy.core.backend import zeros, Matrix, diff, eye
from sympy import solve_linear_system_LU
from sympy.utilities import default_sort_key
from sympy.physics.vector import (ReferenceFrame, dynamicsymbols,
                                  partial_velocity)
from sympy.physics.mechanics.method import _Methods
from sympy.physics.mechanics.particle import Particle
from sympy.physics.mechanics.rigidbody import RigidBody
from sympy.physics.mechanics.functions import (msubs, find_dynamicsymbols,
                                               _f_list_parser)
from sympy.physics.mechanics.linearize import Linearizer
from sympy.utilities.iterables import iterable

__all__ = ['KanesMethod']


class KanesMethod(_Methods):
    """Kane's method object.

    Explanation
    ===========

    This object is used to do the "book-keeping" as you go through and form
    equations of motion in the way Kane presents in:
    Kane, T., Levinson, D. Dynamics Theory and Applications. 1985 McGraw-Hill

    The attributes are for equations in the form [M] udot = forcing.

    Attributes
    ==========

    q, u : Matrix
        Matrices of the generalized coordinates and speeds
    bodies : iterable
        Iterable of Point and RigidBody objects in the system.
    loads : iterable
        Iterable of (Point, vector) or (ReferenceFrame, vector) tuples
        describing the forces on the system.
    auxiliary : Matrix
        If applicable, the set of auxiliary Kane's
        equations used to solve for non-contributing
        forces.
    mass_matrix : Matrix
        The system's mass matrix
    forcing : Matrix
        The system's forcing vector
    mass_matrix_full : Matrix
        The "mass matrix" for the u's and q's
    forcing_full : Matrix
        The "forcing vector" for the u's and q's

    Examples
    ========

    This is a simple example for a one degree of freedom translational
    spring-mass-damper.

    In this example, we first need to do the kinematics.
    This involves creating generalized speeds and coordinates and their
    derivatives.
    Then we create a point and set its velocity in a frame.

        >>> from sympy import symbols
        >>> from sympy.physics.mechanics import dynamicsymbols, ReferenceFrame
        >>> from sympy.physics.mechanics import Point, Particle, KanesMethod
        >>> q, u = dynamicsymbols('q u')
        >>> qd, ud = dynamicsymbols('q u', 1)
        >>> m, c, k = symbols('m c k')
        >>> N = ReferenceFrame('N')
        >>> P = Point('P')
        >>> P.set_vel(N, u * N.x)

    Next we need to arrange/store information in the way that KanesMethod
    requires.  The kinematic differential equations need to be stored in a
    dict.  A list of forces/torques must be constructed, where each entry in
    the list is a (Point, Vector) or (ReferenceFrame, Vector) tuple, where the
    Vectors represent the Force or Torque.
    Next a particle needs to be created, and it needs to have a point and mass
    assigned to it.
    Finally, a list of all bodies and particles needs to be created.

        >>> kd = [qd - u]
        >>> FL = [(P, (-k * q - c * u) * N.x)]
        >>> pa = Particle('pa', P, m)
        >>> BL = [pa]

    Finally we can generate the equations of motion.
    First we create the KanesMethod object and supply an inertial frame,
    coordinates, generalized speeds, and the kinematic differential equations.
    Additional quantities such as configuration and motion constraints,
    dependent coordinates and speeds, and auxiliary speeds are also supplied
    here (see the online documentation).
    Next we form FR* and FR to complete: Fr + Fr* = 0.
    We have the equations of motion at this point.
    It makes sense to rearrange them though, so we calculate the mass matrix and
    the forcing terms, for E.o.M. in the form: [MM] udot = forcing, where MM is
    the mass matrix, udot is a vector of the time derivatives of the
    generalized speeds, and forcing is a vector representing "forcing" terms.

        >>> KM = KanesMethod(N, q_ind=[q], u_ind=[u], kd_eqs=kd)
        >>> (fr, frstar) = KM.kanes_equations(BL, FL)
        >>> MM = KM.mass_matrix
        >>> forcing = KM.forcing
        >>> rhs = MM.inv() * forcing
        >>> rhs
        Matrix([[(-c*u(t) - k*q(t))/m]])
        >>> KM.linearize(A_and_B=True)[0]
        Matrix([
        [   0,    1],
        [-k/m, -c/m]])

    Please look at the documentation pages for more information on how to
    perform linearization and how to deal with dependent coordinates & speeds,
    and how do deal with bringing non-contributing forces into evidence.

    """

    def __init__(self, frame, q_ind, u_ind, kd_eqs=None, q_dependent=None,
            configuration_constraints=None, u_dependent=None,
            velocity_constraints=None, acceleration_constraints=None,
            u_auxiliary=None, bodies=None, forcelist=None):

        """Please read the online documentation. """
        if not q_ind:
            q_ind = [dynamicsymbols('dummy_q')]
            kd_eqs = [dynamicsymbols('dummy_kd')]

        if not isinstance(frame, ReferenceFrame):
            raise TypeError('An inertial ReferenceFrame must be supplied')
        self._inertial = frame

        self._fr = None
        self._frstar = None

        self._forcelist = forcelist
        self._bodylist = bodies

        self._initialize_vectors(q_ind, q_dependent, u_ind, u_dependent,
                u_auxiliary)
        self._initialize_kindiffeq_matrices(kd_eqs)
        self._initialize_constraint_matrices(configuration_constraints,
                velocity_constraints, acceleration_constraints)

    def _initialize_vectors(self, q_ind, q_dep, u_ind, u_dep, u_aux):
        """Initialize the coordinate and speed vectors."""

        none_handler = lambda x: Matrix(x) if x else Matrix()

        # Initialize generalized coordinates
        q_dep = none_handler(q_dep)
        if not iterable(q_ind):
            raise TypeError('Generalized coordinates must be an iterable.')
        if not iterable(q_dep):
            raise TypeError('Dependent coordinates must be an iterable.')
        q_ind = Matrix(q_ind)
        self._qdep = q_dep
        self._q = Matrix([q_ind, q_dep])
        self._qdot = self.q.diff(dynamicsymbols._t)

        # Initialize generalized speeds
        u_dep = none_handler(u_dep)
        if not iterable(u_ind):
            raise TypeError('Generalized speeds must be an iterable.')
        if not iterable(u_dep):
            raise TypeError('Dependent speeds must be an iterable.')
        u_ind = Matrix(u_ind)
        self._udep = u_dep
        self._u = Matrix([u_ind, u_dep])
        self._udot = self.u.diff(dynamicsymbols._t)
        self._uaux = none_handler(u_aux)

    def _initialize_constraint_matrices(self, config, vel, acc):
        """Initializes constraint matrices."""

        # Define vector dimensions
        o = len(self.u)
        m = len(self._udep)
        p = o - m
        none_handler = lambda x: Matrix(x) if x else Matrix()

        # Initialize configuration constraints
        config = none_handler(config)
        if len(self._qdep) != len(config):
            raise ValueError('There must be an equal number of dependent '
                             'coordinates and configuration constraints.')
        self._f_h = none_handler(config)

        # Initialize velocity and acceleration constraints
        vel = none_handler(vel)
        acc = none_handler(acc)
        if len(vel) != m:
            raise ValueError('There must be an equal number of dependent '
                             'speeds and velocity constraints.')
        if acc and (len(acc) != m):
            raise ValueError('There must be an equal number of dependent '
                             'speeds and acceleration constraints.')
        if vel:
            u_zero = {i: 0 for i in self.u}
            udot_zero = {i: 0 for i in self._udot}

            # When calling kanes_equations, another class instance will be
            # created if auxiliary u's are present. In this case, the
            # computation of kinetic differential equation matrices will be
            # skipped as this was computed during the original KanesMethod
            # object, and the qd_u_map will not be available.
            if self._qdot_u_map is not None:
                vel = msubs(vel, self._qdot_u_map)

            self._f_nh = msubs(vel, u_zero)
            self._k_nh = (vel - self._f_nh).jacobian(self.u)
            # If no acceleration constraints given, calculate them.
            if not acc:
                _f_dnh = (self._k_nh.diff(dynamicsymbols._t) * self.u +
                          self._f_nh.diff(dynamicsymbols._t))
                if self._qdot_u_map is not None:
                    _f_dnh = msubs(_f_dnh, self._qdot_u_map)
                self._f_dnh = _f_dnh
                self._k_dnh = self._k_nh
            else:
                if self._qdot_u_map is not None:
                    acc = msubs(acc, self._qdot_u_map)
                self._f_dnh = msubs(acc, udot_zero)
                self._k_dnh = (acc - self._f_dnh).jacobian(self._udot)

            # Form of non-holonomic constraints is B*u + C = 0.
            # We partition B into independent and dependent columns:
            # Ars is then -B_dep.inv() * B_ind, and it relates dependent speeds
            # to independent speeds as: udep = Ars*uind, neglecting the C term.
            B_ind = self._k_nh[:, :p]
            B_dep = self._k_nh[:, p:o]
            self._Ars = -B_dep.LUsolve(B_ind)
        else:
            self._f_nh = Matrix()
            self._k_nh = Matrix()
            self._f_dnh = Matrix()
            self._k_dnh = Matrix()
            self._Ars = Matrix()

    def _initialize_kindiffeq_matrices(self, kdeqs):
        """Initialize the kinematic differential equation matrices."""

        if kdeqs:
            if len(self.q) != len(kdeqs):
                raise ValueError('There must be an equal number of kinematic '
                                 'differential equations and coordinates.')
            kdeqs = Matrix(kdeqs)

            u = self.u
            qdot = self._qdot
            # Dictionaries setting things to zero
            u_zero = {i: 0 for i in u}
            uaux_zero = {i: 0 for i in self._uaux}
            qdot_zero = {i: 0 for i in qdot}

            f_k = msubs(kdeqs, u_zero, qdot_zero)
            k_ku = (msubs(kdeqs, qdot_zero) - f_k).jacobian(u)
            k_kqdot = (msubs(kdeqs, u_zero) - f_k).jacobian(qdot)

            f_k = k_kqdot.LUsolve(f_k)
            k_ku = k_kqdot.LUsolve(k_ku)
            k_kqdot = eye(len(qdot))

            self._qdot_u_map = solve_linear_system_LU(
                    Matrix([k_kqdot.T, -(k_ku * u + f_k).T]).T, qdot)

            self._f_k = msubs(f_k, uaux_zero)
            self._k_ku = msubs(k_ku, uaux_zero)
            self._k_kqdot = k_kqdot
        else:
            self._qdot_u_map = None
            self._f_k = Matrix()
            self._k_ku = Matrix()
            self._k_kqdot = Matrix()

    def _form_fr(self, fl):
        """Form the generalized active force."""
        if fl is not None and (len(fl) == 0 or not iterable(fl)):
            raise ValueError('Force pairs must be supplied in an '
                'non-empty iterable or None.')

        N = self._inertial
        # pull out relevant velocities for constructing partial velocities
        vel_list, f_list = _f_list_parser(fl, N)
        vel_list = [msubs(i, self._qdot_u_map) for i in vel_list]
        f_list = [msubs(i, self._qdot_u_map) for i in f_list]

        # Fill Fr with dot product of partial velocities and forces
        o = len(self.u)
        b = len(f_list)
        FR = zeros(o, 1)
        partials = partial_velocity(vel_list, self.u, N)
        for i in range(o):
            FR[i] = sum(partials[j][i] & f_list[j] for j in range(b))

        # In case there are dependent speeds
        if self._udep:
            p = o - len(self._udep)
            FRtilde = FR[:p, 0]
            FRold = FR[p:o, 0]
            FRtilde += self._Ars.T * FRold
            FR = FRtilde

        self._forcelist = fl
        self._fr = FR
        return FR

    def _form_frstar(self, bl):
        """Form the generalized inertia force."""

        if not iterable(bl):
            raise TypeError('Bodies must be supplied in an iterable.')

        t = dynamicsymbols._t
        N = self._inertial
        # Dicts setting things to zero
        udot_zero = {i: 0 for i in self._udot}
        uaux_zero = {i: 0 for i in self._uaux}
        uauxdot = [diff(i, t) for i in self._uaux]
        uauxdot_zero = {i: 0 for i in uauxdot}
        # Dictionary of q' and q'' to u and u'
        q_ddot_u_map = {k.diff(t): v.diff(t) for (k, v) in
                self._qdot_u_map.items()}
        q_ddot_u_map.update(self._qdot_u_map)

        # Fill up the list of partials: format is a list with num elements
        # equal to number of entries in body list. Each of these elements is a
        # list - either of length 1 for the translational components of
        # particles or of length 2 for the translational and rotational
        # components of rigid bodies. The inner most list is the list of
        # partial velocities.
        def get_partial_velocity(body):
            if isinstance(body, RigidBody):
                vlist = [body.masscenter.vel(N), body.frame.ang_vel_in(N)]
            elif isinstance(body, Particle):
                vlist = [body.point.vel(N),]
            else:
                raise TypeError('The body list may only contain either '
                                'RigidBody or Particle as list elements.')
            v = [msubs(vel, self._qdot_u_map) for vel in vlist]
            return partial_velocity(v, self.u, N)
        partials = [get_partial_velocity(body) for body in bl]

        # Compute fr_star in two components:
        # fr_star = -(MM*u' + nonMM)
        o = len(self.u)
        MM = zeros(o, o)
        nonMM = zeros(o, 1)
        zero_uaux = lambda expr: msubs(expr, uaux_zero)
        zero_udot_uaux = lambda expr: msubs(msubs(expr, udot_zero), uaux_zero)
        for i, body in enumerate(bl):
            if isinstance(body, RigidBody):
                M = zero_uaux(body.mass)
                I = zero_uaux(body.central_inertia)
                vel = zero_uaux(body.masscenter.vel(N))
                omega = zero_uaux(body.frame.ang_vel_in(N))
                acc = zero_udot_uaux(body.masscenter.acc(N))
                inertial_force = (M.diff(t) * vel + M * acc)
                inertial_torque = zero_uaux((I.dt(body.frame) & omega) +
                    msubs(I & body.frame.ang_acc_in(N), udot_zero) +
                    (omega ^ (I & omega)))
                for j in range(o):
                    tmp_vel = zero_uaux(partials[i][0][j])
                    tmp_ang = zero_uaux(I & partials[i][1][j])
                    for k in range(o):
                        # translational
                        MM[j, k] += M * (tmp_vel & partials[i][0][k])
                        # rotational
                        MM[j, k] += (tmp_ang & partials[i][1][k])
                    nonMM[j] += inertial_force & partials[i][0][j]
                    nonMM[j] += inertial_torque & partials[i][1][j]
            else:
                M = zero_uaux(body.mass)
                vel = zero_uaux(body.point.vel(N))
                acc = zero_udot_uaux(body.point.acc(N))
                inertial_force = (M.diff(t) * vel + M * acc)
                for j in range(o):
                    temp = zero_uaux(partials[i][0][j])
                    for k in range(o):
                        MM[j, k] += M * (temp & partials[i][0][k])
                    nonMM[j] += inertial_force & partials[i][0][j]
        # Compose fr_star out of MM and nonMM
        MM = zero_uaux(msubs(MM, q_ddot_u_map))
        nonMM = msubs(msubs(nonMM, q_ddot_u_map),
                udot_zero, uauxdot_zero, uaux_zero)
        fr_star = -(MM * msubs(Matrix(self._udot), uauxdot_zero) + nonMM)

        # If there are dependent speeds, we need to find fr_star_tilde
        if self._udep:
            p = o - len(self._udep)
            fr_star_ind = fr_star[:p, 0]
            fr_star_dep = fr_star[p:o, 0]
            fr_star = fr_star_ind + (self._Ars.T * fr_star_dep)
            # Apply the same to MM
            MMi = MM[:p, :]
            MMd = MM[p:o, :]
            MM = MMi + (self._Ars.T * MMd)

        self._bodylist = bl
        self._frstar = fr_star
        self._k_d = MM
        self._f_d = -msubs(self._fr + self._frstar, udot_zero)
        return fr_star

    def to_linearizer(self):
        """Returns an instance of the Linearizer class, initiated from the
        data in the KanesMethod class. This may be more desirable than using
        the linearize class method, as the Linearizer object will allow more
        efficient recalculation (i.e. about varying operating points)."""

        if (self._fr is None) or (self._frstar is None):
            raise ValueError('Need to compute Fr, Fr* first.')

        # Get required equation components. The Kane's method class breaks
        # these into pieces. Need to reassemble
        f_c = self._f_h
        if self._f_nh and self._k_nh:
            f_v = self._f_nh + self._k_nh*Matrix(self.u)
        else:
            f_v = Matrix()
        if self._f_dnh and self._k_dnh:
            f_a = self._f_dnh + self._k_dnh*Matrix(self._udot)
        else:
            f_a = Matrix()
        # Dicts to sub to zero, for splitting up expressions
        u_zero = {i: 0 for i in self.u}
        ud_zero = {i: 0 for i in self._udot}
        qd_zero = {i: 0 for i in self._qdot}
        qd_u_zero = {i: 0 for i in Matrix([self._qdot, self.u])}
        # Break the kinematic differential eqs apart into f_0 and f_1
        f_0 = msubs(self._f_k, u_zero) + self._k_kqdot*Matrix(self._qdot)
        f_1 = msubs(self._f_k, qd_zero) + self._k_ku*Matrix(self.u)
        # Break the dynamic differential eqs into f_2 and f_3
        f_2 = msubs(self._frstar, qd_u_zero)
        f_3 = msubs(self._frstar, ud_zero) + self._fr
        f_4 = zeros(len(f_2), 1)

        # Get the required vector components
        q = self.q
        u = self.u
        if self._qdep:
            q_i = q[:-len(self._qdep)]
        else:
            q_i = q
        q_d = self._qdep
        if self._udep:
            u_i = u[:-len(self._udep)]
        else:
            u_i = u
        u_d = self._udep

        # Form dictionary to set auxiliary speeds & their derivatives to 0.
        uaux = self._uaux
        uauxdot = uaux.diff(dynamicsymbols._t)
        uaux_zero = {i: 0 for i in Matrix([uaux, uauxdot])}

        # Checking for dynamic symbols outside the dynamic differential
        # equations; throws error if there is.
        sym_list = set(Matrix([q, self._qdot, u, self._udot, uaux, uauxdot]))
        if any(find_dynamicsymbols(i, sym_list) for i in [self._k_kqdot,
                self._k_ku, self._f_k, self._k_dnh, self._f_dnh, self._k_d]):
            raise ValueError('Cannot have dynamicsymbols outside dynamic \
                             forcing vector.')

        # Find all other dynamic symbols, forming the forcing vector r.
        # Sort r to make it canonical.
        r = list(find_dynamicsymbols(msubs(self._f_d, uaux_zero), sym_list))
        r.sort(key=default_sort_key)

        # Check for any derivatives of variables in r that are also found in r.
        for i in r:
            if diff(i, dynamicsymbols._t) in r:
                raise ValueError('Cannot have derivatives of specified \
                                 quantities when linearizing forcing terms.')
        return Linearizer(f_0, f_1, f_2, f_3, f_4, f_c, f_v, f_a, q, u, q_i,
                q_d, u_i, u_d, r)

    # TODO : Remove `new_method` after 1.1 has been released.
    def linearize(self, *, new_method=None, **kwargs):
        """ Linearize the equations of motion about a symbolic operating point.

        Explanation
        ===========

        If kwarg A_and_B is False (default), returns M, A, B, r for the
        linearized form, M*[q', u']^T = A*[q_ind, u_ind]^T + B*r.

        If kwarg A_and_B is True, returns A, B, r for the linearized form
        dx = A*x + B*r, where x = [q_ind, u_ind]^T. Note that this is
        computationally intensive if there are many symbolic parameters. For
        this reason, it may be more desirable to use the default A_and_B=False,
        returning M, A, and B. Values may then be substituted in to these
        matrices, and the state space form found as
        A = P.T*M.inv()*A, B = P.T*M.inv()*B, where P = Linearizer.perm_mat.

        In both cases, r is found as all dynamicsymbols in the equations of
        motion that are not part of q, u, q', or u'. They are sorted in
        canonical form.

        The operating points may be also entered using the ``op_point`` kwarg.
        This takes a dictionary of {symbol: value}, or a an iterable of such
        dictionaries. The values may be numeric or symbolic. The more values
        you can specify beforehand, the faster this computation will run.

        For more documentation, please see the ``Linearizer`` class."""
        linearizer = self.to_linearizer()
        result = linearizer.linearize(**kwargs)
        return result + (linearizer.r,)

    def kanes_equations(self, bodies=None, loads=None):
        """ Method to form Kane's equations, Fr + Fr* = 0.

        Explanation
        ===========

        Returns (Fr, Fr*). In the case where auxiliary generalized speeds are
        present (say, s auxiliary speeds, o generalized speeds, and m motion
        constraints) the length of the returned vectors will be o - m + s in
        length. The first o - m equations will be the constrained Kane's
        equations, then the s auxiliary Kane's equations. These auxiliary
        equations can be accessed with the auxiliary_eqs().

        Parameters
        ==========

        bodies : iterable
            An iterable of all RigidBody's and Particle's in the system.
            A system must have at least one body.
        loads : iterable
            Takes in an iterable of (Particle, Vector) or (ReferenceFrame, Vector)
            tuples which represent the force at a point or torque on a frame.
            Must be either a non-empty iterable of tuples or None which corresponds
            to a system with no constraints.
        """
        if bodies is None:
            bodies = self.bodies
        if  loads is None and self._forcelist is not None:
            loads = self._forcelist
        if loads == []:
            loads = None
        if not self._k_kqdot:
            raise AttributeError('Create an instance of KanesMethod with '
                    'kinematic differential equations to use this method.')
        fr = self._form_fr(loads)
        frstar = self._form_frstar(bodies)
        if self._uaux:
            if not self._udep:
                km = KanesMethod(self._inertial, self.q, self._uaux,
                             u_auxiliary=self._uaux)
            else:
                km = KanesMethod(self._inertial, self.q, self._uaux,
                        u_auxiliary=self._uaux, u_dependent=self._udep,
                        velocity_constraints=(self._k_nh * self.u +
                        self._f_nh))
            km._qdot_u_map = self._qdot_u_map
            self._km = km
            fraux = km._form_fr(loads)
            frstaraux = km._form_frstar(bodies)
            self._aux_eq = fraux + frstaraux
            self._fr = fr.col_join(fraux)
            self._frstar = frstar.col_join(frstaraux)
        return (self._fr, self._frstar)

    def _form_eoms(self):
        fr, frstar = self.kanes_equations(self.bodylist, self.forcelist)
        return fr + frstar

    def rhs(self, inv_method=None):
        """Returns the system's equations of motion in first order form. The
        output is the right hand side of::

           x' = |q'| =: f(q, u, r, p, t)
                |u'|

        The right hand side is what is needed by most numerical ODE
        integrators.

        Parameters
        ==========

        inv_method : str
            The specific sympy inverse matrix calculation method to use. For a
            list of valid methods, see
            :meth:`~sympy.matrices.matrices.MatrixBase.inv`

        """
        rhs = zeros(len(self.q) + len(self.u), 1)
        kdes = self.kindiffdict()
        for i, q_i in enumerate(self.q):
            rhs[i] = kdes[q_i.diff()]

        if inv_method is None:
            rhs[len(self.q):, 0] = self.mass_matrix.LUsolve(self.forcing)
        else:
            rhs[len(self.q):, 0] = (self.mass_matrix.inv(inv_method,
                                                         try_block_diag=True) *
                                    self.forcing)

        return rhs

    def kindiffdict(self):
        """Returns a dictionary mapping q' to u."""
        if not self._qdot_u_map:
            raise AttributeError('Create an instance of KanesMethod with '
                    'kinematic differential equations to use this method.')
        return self._qdot_u_map

    @property
    def auxiliary_eqs(self):
        """A matrix containing the auxiliary equations."""
        if not self._fr or not self._frstar:
            raise ValueError('Need to compute Fr, Fr* first.')
        if not self._uaux:
            raise ValueError('No auxiliary speeds have been declared.')
        return self._aux_eq

    @property
    def mass_matrix(self):
        """The mass matrix of the system."""
        if not self._fr or not self._frstar:
            raise ValueError('Need to compute Fr, Fr* first.')
        return Matrix([self._k_d, self._k_dnh])

    @property
    def mass_matrix_full(self):
        """The mass matrix of the system, augmented by the kinematic
        differential equations."""
        if not self._fr or not self._frstar:
            raise ValueError('Need to compute Fr, Fr* first.')
        o = len(self.u)
        n = len(self.q)
        return ((self._k_kqdot).row_join(zeros(n, o))).col_join((zeros(o,
                n)).row_join(self.mass_matrix))

    @property
    def forcing(self):
        """The forcing vector of the system."""
        if not self._fr or not self._frstar:
            raise ValueError('Need to compute Fr, Fr* first.')
        return -Matrix([self._f_d, self._f_dnh])

    @property
    def forcing_full(self):
        """The forcing vector of the system, augmented by the kinematic
        differential equations."""
        if not self._fr or not self._frstar:
            raise ValueError('Need to compute Fr, Fr* first.')
        f1 = self._k_ku * Matrix(self.u) + self._f_k
        return -Matrix([f1, self._f_d, self._f_dnh])

    @property
    def q(self):
        return self._q

    @property
    def u(self):
        return self._u

    @property
    def bodylist(self):
        return self._bodylist

    @property
    def forcelist(self):
        return self._forcelist

    @property
    def bodies(self):
        return self._bodylist

    @property
    def loads(self):
        return self._forcelist