examples/forward_dynamics/double_pendulum_universal.py
import numpy as np
from bionc import NaturalAxis, CartesianAxis, RK4, TransformationMatrixType, EulerSequence
from bionc.bionc_numpy import (
BiomechanicalModel,
NaturalSegment,
JointType,
SegmentNaturalCoordinates,
NaturalCoordinates,
SegmentNaturalVelocities,
NaturalVelocities,
)
def drop_the_pendulum(
model: BiomechanicalModel,
Q_init: NaturalCoordinates,
Qdot_init: NaturalVelocities,
t_final: float = 2,
steps_per_second: int = 200,
):
"""
This function simulates the dynamics of a natural segment falling from 0m during 2s
Parameters
----------
model : BiomechanicalModel
The model to be simulated
Q_init : SegmentNaturalCoordinates
The initial natural coordinates of the segment
Qdot_init : SegmentNaturalVelocities
The initial natural velocities of the segment
t_final : float, optional
The final time of the simulation, by default 2
steps_per_second : int, optional
The number of steps per second, by default 50
Returns
-------
tuple:
time_steps : np.ndarray
The time steps of the simulation
all_states : np.ndarray
The states of the system at each time step X = [Q, Qdot]
dynamics : Callable
The dynamics of the system, f(t, X) = [Xdot, lambdas]
"""
print("Evaluate Rigid Body Constraints:")
print(model.rigid_body_constraints(Q_init))
print("Evaluate Rigid Body Constraints Jacobian Derivative:")
print(model.rigid_body_constraint_jacobian_derivative(Qdot_init))
if (model.rigid_body_constraints(Q_init) > 1e-6).any():
print(model.rigid_body_constraints(Q_init))
raise ValueError(
"The segment natural coordinates don't satisfy the rigid body constraint, at initial conditions."
)
t_final = t_final # [s]
steps_per_second = steps_per_second
time_steps = np.linspace(0, t_final, steps_per_second * t_final + 1)
# initial conditions, x0 = [Qi, Qidot]
states_0 = np.concatenate((Q_init.to_array(), Qdot_init.to_array()), axis=0)
# Create the forward dynamics function Callable (f(t, x) -> xdot)
def dynamics(t, states):
idx_coordinates = slice(0, model.nb_Q)
idx_velocities = slice(model.nb_Q, model.nb_Q + model.nb_Qdot)
qddot, lambdas = model.forward_dynamics(
NaturalCoordinates(states[idx_coordinates]),
NaturalVelocities(states[idx_velocities]),
)
return np.concatenate((states[idx_velocities], qddot.to_array()), axis=0), lambdas
# Solve the Initial Value Problem (IVP) for each time step
all_states = RK4(t=time_steps, f=lambda t, states: dynamics(t, states)[0], y0=states_0)
return time_steps, all_states, dynamics
def post_computations(model: BiomechanicalModel, time_steps: np.ndarray, all_states: np.ndarray, dynamics):
"""
This function computes:
- the rigid body constraint error
- the rigid body constraint jacobian derivative error
- the joint constraint error
- the lagrange multipliers of the rigid body constraint
Parameters
----------
model : NaturalSegment
The segment to be simulated
time_steps : np.ndarray
The time steps of the simulation
all_states : np.ndarray
The states of the system at each time step X = [Q, Qdot]
dynamics : Callable
The dynamics of the system, f(t, X) = [Xdot, lambdas]
Returns
-------
tuple:
rigid_body_constraint_error : np.ndarray
The rigid body constraint error at each time step
rigid_body_constraint_jacobian_derivative_error : np.ndarray
The rigid body constraint jacobian derivative error at each time step
joint_constraints: np.ndarray
The joint constraints at each time step
lambdas : np.ndarray
The lagrange multipliers of the rigid body constraint at each time step
"""
idx_coordinates = slice(0, model.nb_Q)
idx_velocities = slice(model.nb_Q, model.nb_Q + model.nb_Qdot)
# compute the quantities of interest after the integration
all_lambdas = np.zeros((model.nb_holonomic_constraints, len(time_steps)))
defects = np.zeros((model.nb_rigid_body_constraints, len(time_steps)))
defects_dot = np.zeros((model.nb_rigid_body_constraints, len(time_steps)))
joint_defects = np.zeros((model.nb_joint_constraints, len(time_steps)))
joint_defects_dot = np.zeros((model.nb_joint_constraints, len(time_steps)))
for i in range(len(time_steps)):
defects[:, i] = model.rigid_body_constraints(NaturalCoordinates(all_states[idx_coordinates, i]))
defects_dot[:, i] = model.rigid_body_constraints_derivative(
NaturalCoordinates(all_states[idx_coordinates, i]), NaturalVelocities(all_states[idx_velocities, i])
)
joint_defects[:, i] = model.joint_constraints(NaturalCoordinates(all_states[idx_coordinates, i]))
# todo : to be implemented
# joint_defects_dot = model.joint_constraints_derivative(
# NaturalCoordinates(all_states[idx_coordinates, i]),
# NaturalVelocities(all_states[idx_velocities, i]))
# )
all_lambdas[:, i : i + 1] = dynamics(time_steps[i], all_states[:, i])[1]
return defects, defects_dot, joint_defects, all_lambdas
def main(show_results: bool = True):
# Let's create a model
model = BiomechanicalModel()
# fill the biomechanical model with the segment
model["pendulum0"] = NaturalSegment.with_cartesian_inertial_parameters(
name="pendulum0",
alpha=np.pi / 2, # setting alpha, beta, gamma to pi/2 creates a orthogonal coordinate system
beta=np.pi / 2,
gamma=np.pi / 2,
length=1,
mass=1,
center_of_mass=np.array([00, 0.1, 00]), # in segment coordinates system
inertia=np.array([[0.01, 0, 0], [0, 0.01, 0], [0, 0, 0.01]]), # in segment coordinates system
)
model._add_joint(
dict(
name="universal0",
joint_type=JointType.GROUND_UNIVERSAL,
parent="GROUND",
child="pendulum0",
# meaning we pivot around the cartesian x-axis
parent_axis=CartesianAxis.X,
child_axis=NaturalAxis.V,
theta=np.pi / 2,
)
)
model["pendulum1"] = NaturalSegment.with_cartesian_inertial_parameters(
name="pendulum1",
alpha=np.pi / 2, # setting alpha, beta, gamma to pi/2 creates a orthogonal coordinate system
beta=np.pi / 2,
gamma=np.pi / 2,
length=1,
mass=1,
center_of_mass=np.array([00, 0.1, 00]), # in segment coordinates system
inertia=np.array([[0.01, 0, 0], [0, 0.01, 0], [0, 0, 0.01]]), # in segment coordinates system
)
model._add_joint(
dict(
name="universal1",
joint_type=JointType.UNIVERSAL,
parent="pendulum0",
child="pendulum1",
# meaning we pivot around the cartesian x-axis
parent_axis=NaturalAxis.W,
child_axis=NaturalAxis.V,
theta=np.pi / 2,
)
)
model.save("double_universal_pendulum.nmod")
print(model.joints)
print(model.nb_joints)
print(model.nb_joint_constraints)
tuple_of_Q = [
SegmentNaturalCoordinates.from_components(u=[1, 0, 0], rp=[0, -i, 0], rd=[0, -i - 1, 0], w=[0, 0, 1])
for i in range(0, model.nb_segments)
]
Q = NaturalCoordinates.from_qi(tuple(tuple_of_Q))
tuple_of_Qdot = [
SegmentNaturalVelocities.from_components(udot=[0, 0, 0], rpdot=[0, 0, 0], rddot=[0, 0, 0], wdot=[0, 0, 0])
for i in range(0, model.nb_segments)
]
Qdot = NaturalVelocities.from_qdoti(tuple(tuple_of_Qdot))
print(model.joint_constraints(Q))
print(model.joint_constraints_jacobian(Q))
print(model.holonomic_constraints(Q))
print(model.holonomic_constraints_jacobian(Q))
# The actual simulation
t_final = 2
time_steps, all_states, dynamics = drop_the_pendulum(
model=model,
Q_init=Q,
Qdot_init=Qdot,
t_final=t_final,
)
if show_results:
defects, defects_dot, joint_defects, all_lambdas = post_computations(
model=model,
time_steps=time_steps,
all_states=all_states,
dynamics=dynamics,
)
from viz import plot_series
plot_series(time_steps, all_states[: model.nb_Q, :], legend="all_states")
# Plot the results
# the following graphs have to be near zero the more the simulation is long, the more constraints drift from zero
plot_series(time_steps, defects, legend="rigid_constraint") # Phi_r
plot_series(time_steps, defects_dot, legend="rigid_constraint_derivative") # Phi_r_dot
plot_series(time_steps, joint_defects, legend="joint_constraint") # Phi_j
# the lagrange multipliers are the forces applied to maintain the system (rigidbody and joint constraints)
plot_series(time_steps, all_lambdas, legend="lagrange_multipliers") # lambda
return model, all_states
if __name__ == "__main__":
model, all_states = main(show_results=False)
# still experimental
model.segments.segments["pendulum0"].transformation_matrix_type = TransformationMatrixType.Buv
model.segments.segments["pendulum1"].transformation_matrix_type = TransformationMatrixType.Buv
model.joints.joints["universal0"].projection_basis = EulerSequence.XYZ
model.joints.joints["universal1"].projection_basis = EulerSequence.XYZ
minimal_coordinate_time_series = np.zeros((6, all_states.shape[1]))
for i in range(all_states.shape[1]):
minimal_coordinate_time_series[:, i] = (
model.natural_coordinates_to_joint_angles(NaturalCoordinates(all_states[: model.nb_Q, i]))
.reshape(-1, 1)
.squeeze()
)
from viz import plot_series
plot_series(np.linspace(0, 2, 401), minimal_coordinate_time_series, legend="minimal_coordinates")
# animate the motion
from bionc import Viz
viz = Viz(model, show_natural_mesh=True)
viz.animate(
all_states[: model.nb_Q, :],
None,
frame_rate=50,
)