# velocityProduct

Joint torques that cancel velocity-induced forces

## Description

computes the joint torques required to cancel the forces induced by
the specified joint velocities under a certain joint configuration.
Gravity torque is not included in this calculation.`jointTorq`

= velocityProduct(`robot`

,`configuration`

,`jointVel`

)

## Examples

### Compute Velocity-Induced Joint Torques

Load a model of the Quanser Q-Arm from the Robotics System Toolbox™ `loadrobot`

, which is returned as a `rigidBodyTree`

object. Update the data format to "`row"`

. For all dynamics calculations, the data format must be either "`row"`

or "`column"`

.

robot = loadrobot("quanserQArm", DataFormat="row", Gravity=[0 0 -9.81]); show(robot);

Set the joint velocity vector.

qdot = [0.2 -0.3 0 0.1];

Compute the joint torques required to cancel the velocity-induced joint torques at the robot home configuration (`[]`

input). The velocity-induced joint torques equal the negative of the `velocityProduct`

output.

tau = -velocityProduct(robot,[],qdot)

`tau = `*1×4*
0.0045 0.0015 -0.0023 -0.0000

## Input Arguments

`robot`

— Robot model

`rigidBodyTree`

object

Robot model, specified as a `rigidBodyTree`

object. To use the
`velocityProduct`

function, set
the `DataFormat`

property to
either `'row'`

or
`'column'`

.

`configuration`

— Robot configuration

vector

Robot configuration, specified as a vector with positions for all nonfixed joints in the robot
model. You can generate a configuration using
`homeConfiguration(robot)`

,
`randomConfiguration(robot)`

, or by specifying your own joint
positions. To use the vector form of `configuration`

, set the
`DataFormat`

property for the `robot`

to
either `'row'`

or `'column'`

.

`jointVel`

— Joint velocities

vector

Joint velocities, specified as a vector. The number of joint velocities is equal to the
velocity degrees of freedom of the robot. To use the
vector form of `jointVel`

, set
the `DataFormat`

property for the
`robot`

to either
`'row'`

or
`'column'`

.

## Output Arguments

`jointTorq`

— Joint torques

vector

Joint torques, specified as a vector. Each element corresponds to a torque applied to a specific joint.

## More About

### Dynamics Properties

When working with robot dynamics, specify the information for individual bodies of your manipulator robot using these properties of the `rigidBody`

objects:

`Mass`

— Mass of the rigid body in kilograms.`CenterOfMass`

— Center of mass position of the rigid body, specified as a vector of the form`[x y z]`

. The vector describes the location of the center of mass of the rigid body, relative to the body frame, in meters. The`centerOfMass`

object function uses these rigid body property values when computing the center of mass of a robot.`Inertia`

— Inertia of the rigid body, specified as a vector of the form`[Ixx Iyy Izz Iyz Ixz Ixy]`

. The vector is relative to the body frame in kilogram square meters. The inertia tensor is a positive definite matrix of the form:The first three elements of the

`Inertia`

vector are the moment of inertia, which are the diagonal elements of the inertia tensor. The last three elements are the product of inertia, which are the off-diagonal elements of the inertia tensor.

For information related to the entire manipulator robot model, specify these `rigidBodyTree`

object properties:

`Gravity`

— Gravitational acceleration experienced by the robot, specified as an`[x y z]`

vector in m/s^{2}. By default, there is no gravitational acceleration.`DataFormat`

— The input and output data format for the kinematics and dynamics functions, specified as`"struct"`

,`"row"`

, or`"column"`

.

### Dynamics Equations

Manipulator rigid body dynamics are governed by this equation:

$$\frac{d}{dt}\left[\begin{array}{c}q\\ \dot{q}\end{array}\right]=\left[\begin{array}{c}\dot{q}\\ M{(q)}^{-1}\left(-C(q,\dot{q})\dot{q}-G(q)-J{(q)}^{T}{f}_{Ext}+\tau \right)\end{array}\right]$$

also written as:

$$M(q)\ddot{q}=-C(q,\dot{q})\dot{q}-G(q)-J{(q)}^{T}{f}_{Ext}+\tau $$

where:

$$M(q)$$ — is a joint-space mass matrix based on the current robot configuration. Calculate this matrix by using the

`massMatrix`

object function.$$C(q,\dot{q})$$ — are the Coriolis terms, which are multiplied by $$\dot{q}$$ to calculate the velocity product. Calculate the velocity product by using by the

`velocityProduct`

object function.$$G(q)$$ — is the gravity torques and forces required for all joints to maintain their positions in the specified gravity

`Gravity`

. Calculate the gravity torque by using the`gravityTorque`

object function.$$J(q)$$ — is the geometric Jacobian for the specified joint configuration. Calculate the geometric Jacobian by using the

`geometricJacobian`

object function.$${f}_{Ext}$$ — is a matrix of the external forces applied to the rigid body. Generate external forces by using the

`externalForce`

object function.$$\tau $$ — are the joint torques and forces applied directly as a vector to each joint.

$$q,\dot{q},\ddot{q}$$ — are the joint configuration, joint velocities, and joint accelerations, respectively, as individual vectors. For revolute joints, specify values in radians, rad/s, and rad/s

^{2}, respectively. For prismatic joints, specify in meters, m/s, and m/s^{2}.

To compute the dynamics directly, use the `forwardDynamics`

object function. The function calculates the joint accelerations for the specified combinations of the above inputs.

To achieve a certain set of motions, use the `inverseDynamics`

object function. The function calculates the joint torques required to achieve the specified configuration, velocities, accelerations, and external forces.

## Extended Capabilities

### C/C++ Code Generation

Generate C and C++ code using MATLAB® Coder™.

Usage notes and limitations:

When creating the `rigidBodyTree`

object, use the syntax that specifies the
`MaxNumBodies`

as an upper bound for adding bodies to the robot model.
You must also specify the `DataFormat`

property as a name-value pair. For
example:

robot = rigidBodyTree("MaxNumBodies",15,"DataFormat","row")

To minimize data usage, limit the upper bound to a number close to the expected number of bodies in the model. All data formats are supported for code generation. To use the dynamics functions, the data format must be set to `"row"`

or `"column"`

.

The `show`

and `showdetails`

functions do not support code generation.

## Version History

**Introduced in R2017a**

### R2024a: Static memory allocation support

`velocityProduct`

now supports code generation with disabled dynamic memory allocation. For more information about disabling dynamic memory allocation, see Set Dynamic Memory Allocation Threshold (MATLAB Coder).

## See Also

`rigidBodyTree`

| `inverseDynamics`

| `gravityTorque`

| `massMatrix`

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