# Standard library modules.
import math, time, threading, queue, logging
# Third-party library modules.
import numpy as np
# set up logger for module
log = logging.getLogger(__file__)
################################################################
[docs]class DoublePendulumController(object):
"""Prototype for a double-pendulum controller. This class is typically subclassed to customize the control strategy and the subclass passed into the common application framework.
:ivar initial_state: four-element numpy array used to initialize the simulator state: [q1, q2, qd1, qd2]
:ivar kp: two-element numpy array with default proportional position gains
:ivar ki: two-element numpy array with default integral gains
:ivar kd: two-element numpy array with default velocity damping gain
:ivar identity: zero-based serial number identifying the instance in the case of multiple simulations
"""
def __init__(self):
# delegate object to which debugging and status messages can be printed; it must implement write()
self.console = None
# delegate object to query for kinematics parameters and solutions
self.model = None
# zero-based serial number identifying the instance from multiple simulations
self.identity = 0
# world object to query for other system information
self.world = None
# fixed controller parameters
self.initial_state = np.array([0.0, 0.0, 0.0, 0.0])
self.d_state = np.array((1.0, 0.5*math.pi, 0.0, 0.0))
self.kp = np.array((16.0, 8.0))
self.ki = np.array((4.0, 2.0))
self.kd = np.array((4.0, 2.0))
return
#================================================================
[docs] def connect_console(self, console):
"""Attach a console object to be used for debugging output. The object needs to implement write()."""
self.console = console
return
[docs] def set_identity(self, serial_number):
"""Set the specific identification number for this controller out of multiples."""
self.identity = serial_number
[docs] def set_world(self, world):
"""Set the 'world' object which can answer global information queries. This is a deliberately abstract interface between sub-classes
and the application framework."""
self.world = world
[docs] def write(self, string):
"""Write a message to the debugging console. If console is not available, writes to the log as an info message."""
if self.console is not None:
self.console.write(string)
else:
log.info(string)
return
[docs] def setup(self):
"""Hook for final one-time object configuration. This is called once prior to the start of the simulation. The default implementation does nothing."""
pass
[docs] def user_parameter_change(self, parameter, value):
"""Hook for interactive parameter changes (e.g. GUI sliders). The default implementation does nothing.
:param parameter: integer index of parameter, starting with zero
:param value: dimensionless parameter value, ranges from zero to one inclusive.
"""
pass
#================================================================
[docs] def apply_configuration(self, config):
"""Hook for applying parameters saved in a configuration file. The default implementation does nothing.
:param config: configparser object (which implements the mapping protocol)
"""
pass
[docs] def gather_configuration(self, config):
"""Hook for saving parameters in a configuration file. The default implementation does nothing.
:param config: configparser object (which implements the mapping protocol)
"""
pass
#================================================================
[docs] def compute_control(self, t, dt, state, tau):
"""Method called from numerical pendulum simulation to calculate the next step of applied torques. This is usually overridden in a subclass, but the default implementation applies a fixed-target PD position control.
:param t: time in seconds since simulation began
:param state: four element ndarray of joint positions q and joint velocities qd as [q1, q2, qd1, qd2], expressed in radians and radians/sec
:param tau: two element ndarray to fill in with joint torques to apply
"""
# convenience variables to notate the state variables
q1 = state[0] # 'shoulder' angle in radians
q2 = state[1] # 'elbow' angle in radians
qd1 = state[2] # 'shoulder' velocity in radians/second
qd2 = state[3] # 'elbow' velocity in radians/second
# calculate position and velocity error as difference from reference state
qerr = self.d_state - state
# apply PD control to reach the pose (no integral term)
tau[0] = (self.kp[0] * qerr[0]) + (self.kd[0] * qerr[2])
tau[1] = (self.kp[1] * qerr[1]) + (self.kd[1] * qerr[3])
return
################################################################
[docs]class DoublePendulumSimulator(object):
"""Numerical dynamic simulation of a frictionless double pendulum. It
communicates with a user-supplied control object to compute applied joint
torques.
:ivar t: simulated time in seconds
:ivar state: four-element vector of dynamic state [q1 q2 qd1 qd2] (position and velocity)
:ivar origin: two-element vector locating the pendulum base in world coordinates
"""
def __init__(self):
# the object used to calculate joint torques
self.control = None
# set default dynamics
self.set_default_dynamic_parameters()
# configure transient state
self.reset()
return
[docs] def connect_controller(self, controller):
"""Attach a controller object used to compute joint torques and set the initial state."""
self.control = controller
controller.model = self
self.reset()
return
[docs] def reset(self):
"""Reset or initialize all simulator state variables."""
self.t = 0.0
self.dt = 0.001
self.origin = np.zeros(2)
if self.control is not None:
self.state = self.control.initial_state.copy()
else:
self.state = np.array([0.0, 0.0, 0.0, 0.0])
self.tau = np.array([0.0, 0.0])
self.dydt = np.ndarray((4,))
return
[docs] def set_default_dynamic_parameters(self):
"""Set the default dynamics coefficients defining the rigid-body model physics."""
self.l1 = 1.0 # proximal link length, link1
self.l2 = 1.0 # distal link length, link2
self.lc1 = 0.5 # distance from proximal joint to link1 COM
self.lc2 = 0.5 # distance from distal joint to link2 COM
self.m1 = 1.0 # link1 mass
self.m2 = 1.0 # link2 mass
self.I1 = (self.m1 * self.l1**2) / 12 # link1 moment of inertia
self.I2 = (self.m2 * self.l2**2) / 12 # link2 moment of inertia
self.gravity = -9.81
return
#================================================================
[docs] def deriv(self):
"""Calculate the accelerations for a rigid body double-pendulum dynamics model.
:returns: system derivative vector as a numpy ndarray
"""
q1 = self.state[0]
q2 = self.state[1]
qd1 = self.state[2]
qd2 = self.state[3]
LC1 = self.lc1
LC2 = self.lc2
L1 = self.l1
M1 = self.m1
M2 = self.m2
d11 = M1*LC1*LC1 + M2*(L1*L1 + LC2*LC2 + 2*L1*LC2*math.cos(q2)) + self.I1 + self.I2
d12 = M2*(LC2*LC2 + L1*LC2*math.cos(q2)) + self.I2
d21 = d12
d22 = M2*LC2*LC2 + self.I2
h1 = -M2*L1*LC2*math.sin(q2)*qd2*qd2 - 2*M2*L1*LC2*math.sin(q2)*qd2*qd1
h2 = M2*L1*LC2*math.sin(q2)*qd1*qd1
phi1 = -M2*LC2*self.gravity*math.sin(q1+q2) - (M1*LC1 + M2*L1) * self.gravity * math.sin(q1)
phi2 = -M2*LC2*self.gravity*math.sin(q1+q2)
# now solve the equations for qdd:
# d11 qdd1 + d12 qdd2 + h1 + phi1 = tau1
# d21 qdd1 + d22 qdd2 + h2 + phi2 = tau2
rhs1 = self.tau[0] - h1 - phi1
rhs2 = self.tau[1] - h2 - phi2
# Apply Cramer's Rule to compute the accelerations using
# determinants by solving D qdd = rhs. First compute the
# denominator as the determinant of D:
denom = (d11 * d22) - (d21 * d12)
# the derivative of the position is trivially the current velocity
self.dydt[0] = qd1
self.dydt[1] = qd2
# the derivative of the velocity is the acceleration.
# the numerator of qdd[n] is the determinant of the matrix in
# which the nth column of D is replaced by RHS
self.dydt[2] = ((rhs1 * d22 ) - (rhs2 * d12)) / denom
self.dydt[3] = (( d11 * rhs2) - (d21 * rhs1)) / denom
return self.dydt
#================================================================
[docs] def timer_tick(self, delta_t):
"""Run the simulation for an interval.
:param delta_t: length of interval in simulated time seconds
"""
while delta_t > 0:
# calculate next control outputs
self.control.compute_control(self.t, self.dt, self.state, self.tau)
# calculate dynamics model
qd = self.deriv()
# Euler integration
self.state = self.state + self.dt * qd
delta_t -= self.dt
self.t += self.dt
#================================================================
[docs] def forwardKinematics(self, q):
"""Compute the forward kinematics. Returns the world-coordinate Cartesian position of the elbow
and endpoint for a given joint angle vector.
:param q: two-element list or ndarray with [q1, q2] joint angles
:return: tuple (elbow, end) of two-element ndarrays with [x,y] locations
"""
elbow = self.origin + np.array((self.l1 * math.sin(q[0]), -self.l1 * math.cos(q[0])))
end = elbow + np.array((self.l2 * math.sin(q[0]+q[1]), -self.l2 * math.cos(q[0]+q[1])))
return elbow, end
#================================================================
[docs] def endpointIK(self, target):
"""Compute two inverse kinematics solutions for a target end position. The
target is a Cartesian position vector (two-element ndarray) in world coordinates,
and the result vectors are joint angles as ndarrays [q0, q1].
If the target is out of reach, returns the closest pose.
"""
# translate the target vector into body coordinates
target = target - self.origin
# find the position of the point in polar coordinates
radiussq = np.dot(target, target)
radius = math.sqrt(radiussq)
# theta is the angle of target point w.r.t. -Y axis, same origin as arm
theta = math.atan2(target[0], -target[1])
# use the law of cosines to compute the elbow angle
# R**2 = l1**2 + l2**2 - 2*l1*l2*cos(pi - elbow)
# both elbow and -elbow are valid solutions
acosarg = (radiussq - self.l1**2 - self.l2**2) / (-2 * self.l1 * self.l2)
if acosarg < -1.0: elbow_supplement = math.pi
elif acosarg > 1.0: elbow_supplement = 0.0
else: elbow_supplement = math.acos(acosarg)
# use the law of sines to find the angle at the bottom vertex of the triangle defined by the links
# radius / sin(elbow_supplement) = l2 / sin(alpha)
if radius > 0.0:
alpha = math.asin(self.l2 * math.sin(elbow_supplement) / radius)
else:
alpha = 0.0
# compute the two solutions with opposite elbow sign
soln1 = np.array((theta - alpha, math.pi - elbow_supplement))
soln2 = np.array((theta + alpha, elbow_supplement - math.pi))
return soln1, soln2
################################################################