Inertial parameters of triangle meshes


An accurate simulation requires physically plausible inertial parameters: the mass, center of mass location, and the moment of inertia matrix of all links. This tutorial will guide you through the process of obtaining and setting these parameters if you have 3D models of the links.

Assuming homogeneous bodies (uniform mass density), it is shown how to obtain inertial data using the free software MeshLab. If you wish to skip the setup and only compute the volume, center of mass, or inertia properties of your model, or quickly clean the model, you can use Mesh Cleaner, a tool which runs MeshLab internally for this purpose. You can also use the commercial product SolidWorks to compute these information. For a guide on using SolidWorks, please refer to this question on

Summary of inertial parameters


The mass is most easily measured by weighing an object. It is a scalar with default units in Gazebo of kilograms (kg). For a 3D uniform mesh, mass is computed by calculating the geometric volume [length3] and multiplying by density [mass / length3].

Center of Mass

The center of mass is the point where the sum of weighted mass moments is zero. For a uniform body, this is equivalent to the geometric centroid. This parameter is a Vector3 with units of position [length].

Moment of Inertia Matrix

The moments of inertia represent the spatial distribution of mass in a rigid body. It depends on the mass, size, and shape of a body with units of [mass * length2]. The moments of inertia can be expressed as the components of a symmetric positive-definite 3x3 matrix, with 3 diagonal elements, and 3 unique off-diagonal elements. Each inertia matrix is defined relative to a coordinate frame or set of axes. Diagonalizing the matrix yields its principal moments of inertia (the eigenvalues) and the orientation of its principal axes (the eigenvectors).

The moments of inertia are proportional to mass but vary in a non-linear manner with respect to size. Additionally, there are constraints on the relative values of the principal moments that typically make it much more difficult to estimate moments of inertia than mass or center of mass location. This difficulty motivates the use of software tools for computing moment of inertia.

If you're curious about the math behind the inertia matrix, or just want an easy way to calculate the tensor for simple shapes, this wikipedia entry is a great resource.


Installing MeshLab

Download MeshLab from the official website and install it on your computer. The installation should be straightforward.

Once installed, you can view your meshes in MeshLab (both DAE and STL formats are supported, which are those ones supported by Gazebo/ROS).

Computing the inertial parameters

Computing inertia of sphere

Open the mesh file in MeshLab. For this example, a sphere.dae mesh is used. To compute the inertial parameters, you first need to display the Layers dialog - View->Show Layer Dialog. A panel opens in the right part of the window which is split in half - we're interested in the lower part containing text output.

Next, command MeshLab to compute the inertial parameters. Choose Filters->Quality Measure and Computations->Compute Geometric Measures from the menu. The lower part of the Layers dialog should now show some info about the inertial measures. The sphere gives the following output:

Mesh Bounding Box Size 2.000000 2.000000 2.000000
Mesh Bounding Box Diag 3.464102
Mesh Volume is 4.094867
Mesh Surface is 12.425012
Thin shell barycenter -0.000000 -0.000000 -0.000000
Center of Mass is -0.000000 0.000000 -0.000000
Inertia Tensor is :
| 1.617916 -0.000000 0.000000 |
| -0.000000 1.604620 -0.000000 |
| 0.000000 -0.000000 1.617916 |
Principal axes are :
| 0.000000 1.000000 0.000000 |
| -0.711101 -0.000000 0.703089 |
| -0.703089 0.000000 -0.711101 |
axis momenta are :
| 1.604620 1.617916 1.617916 |


The bounding box of the sphere is a cube with side length 2.0, which implies that the sphere has a radius of 1.0.


A sphere of radius 1.0 should have a volume of 4/3*PI (4.189), which is close to the computed value of 4.095. It is not exact since it is a triangular approximation.

Surface Area

The surface area should be 4*PI (12.566), which is close to the computed value of 12.425.

Center of Mass

The center of mass is given as the origin (0,0,0).

Inertia matrix

The inertia matrix (aka inertia tensor) of a sphere should be diagonal with principal moments of inertia of 2/5 mass since radius = 1. It is not explicitly stated in the output, but the mass is equal to the volume (implicitly using a density of 1), so we would expect diagonal matrix entries of 8/15*PI (1.676). The computed inertia tensor appears diagonal for the given precision with principal moments ranging from [1.604,1.618], which is close to the expected value.

Duplicate faces

One thing to keep in mind is that duplicate faces within a mesh will affect the calculation of volume and moment of inertia. For example, consider another spherical mesh: ball.dae. Meshlab gives the following output for this mesh:

Mesh Bounding Box Size 1.923457 1.990389 1.967965
Mesh Bounding Box Diag 3.396207
Mesh Volume is 7.690343
Mesh Surface is 23.967396
Thin shell barycenter 0.000265 0.000185 0.000255
Center of Mass is 0.000257 0.000195 0.000292
Inertia Tensor is :
| 2.912301 0.001190 0.000026 |
| 0.001190 2.903731 0.002124 |
| 0.000026 0.002124 2.906963 |
Principal axes are :
| 0.108262 -0.895479 0.431738 |
| -0.120000 0.419343 0.899862 |
| 0.986853 0.149229 0.062058 |
axis momenta are :
| 2.902563 2.907949 2.912483 |

This mesh is approximately the same size, with bounding box dimensions in the range [1.92,1.99], but its calculations are different by nearly double:

  • volume: 7.69 vs. 4.09
  • principal moments: [2.90,2.91] vs. [1.60,1.62]

There is a clue to the difference when you look at the numbers of vertices and faces (listed in the bottom of the MeshLab window):

  • sphere.dae: 382 vertices, 760 faces
  • ball.dae: 362 vertices, 1440 faces

Each mesh has a similar number of vertices, but ball.dae has roughly twice as many faces. Running the command Filters -> Cleaning and Repairing -> Remove Duplicate Faces reduces the number of faces in ball.dae to 720 and gives more reasonable values for the volume (3.84) and principal moments of inertia (1.45). It makes sense that these values are slightly smaller since the bounding box is slightly smaller as well.

Scaling to increase numerical precision

Meshlab currently prints the geometric information with 6 digits of fixed point precision. If your mesh is too small, this may substantially limit the precision of the inertia tensor, for example:

Mesh Bounding Box Size 0.044000 0.221000 0.388410
Mesh Bounding Box Diag 0.449043
Mesh Volume is 0.001576
Mesh Surface is 0.136169
Thin shell barycenter -0.021954 0.008976 0.012835
Center of Mass is -0.021993 0.001259 0.001489
Inertia Tensor is :
| 0.000008 -0.000000 -0.000000 |
| -0.000000 0.000001 -0.000000 |
| -0.000000 -0.000000 0.000007 |
Principal axes are :
| 0.999999 0.000166 0.001241 |
| -0.000113 0.999104 -0.042310 |
| -0.001247 0.042310 0.999104 |
axis momenta are :
| 0.000008 0.000001 0.000007 |

It seems like we have what we were seeking for. But when you look thoroughly, you will see one bad thing - the output is written out only up to 6 decimal digits. As a consequence, we lose most of the valuable information in the inertia tensor. To overcome lack of precision in the Inertia Tensor, you can scale up the model so that the magnitude of the inertia is increased. The model can be scaled using Filters->Normals, Curvatures and Orientation->Transform: Scale. Enter a scale in the dialog and hit Apply.

To decide the scaling factor s to choose, recall that MeshLab uses the volume as a proxy for mass, which will vary as s3. Furthermore, the inertia has an addition dependence on length2, so the moment of inertia will change according to s5. Since there is such a large dependence on s, scaling by a factor of 10 or 100 may be sufficient.

Now, instruct MeshLab to recompute the geometrical measures again, and the Inertia Tensor entry should have more precision. Then multiply the inertia tensor by 1/s5 to undo the scaling.

Getting the Center of Mass

It is not always the case that MeshLab uses the same length units as you'd want (meters for Gazebo). However, you can easily tell the ratio of MeshLab units to your desired units by looking at the Mesh Bounding Box Size entry. You can e.g. compute the bounding box size in your desired units and compare to the MeshLab's one.

Multiply the Center of Mass entry with the computed ratio and you have the coordinates of the Center of Mass of your mesh. However, if the link you are modeling is not homogeneous, you will have to compute the Center of Mass using other methods (most probably by real experiments).

Rescaling the moment of inertia values

Just like the center of mass location must be scaled to the correct units, the moment of inertia should be scaled as well, though the scale factor should be squared to account for the length2 dependence in the moment of inertia. In addition, the inertia should be multiplied by the measured mass and divided by the computed volume from the text output.

Filling in the tags in URDF or SDF

The next step is to record the computed values to the URDF or SDF file containing your robot (it is assumed you already have the robot model; if not, follow the tutorial Make a Model).

In each link you should have the <inertial> tag. It should look like the following (in SDF):

<link name='antenna'>
    <pose>-0.022 0.0203 0.02917 0 0 0</pose>
  <collision name='antenna_collision'>
  <visual name='antenna_visual'>

or like this one (in URDF):

<link name="antenna">
    <origin rpy="0 0 0" xyz="-0.022 0.0203 0.02917"/>
    <mass value="0.56"/>
    <inertia ixx="0.004878" ixy="-6.2341e-07" ixz="-7.4538e-07" iyy="0.00090164" iyz="-0.00014394" izz="0.0042946"/>

The <mass> should be entered in kilograms and you have to find it out experimentally (or from specifications).

The <origin> or <pose> are used to enter the Center of Mass position (relative to the link's origin; especially not relative to the link's visual or collision origin). The rotational elements can define a different coordinate from for the moment of inertia axes. If you've found out the center of mass experimentally, fill in this value, otherwise fill in the correctly scaled value computed by MeshLab.

The <inertia> tag contains the inertia tensor you have computed in the previous step. Since the matrix is symmetric, only 6 numbers are sufficient to represent it. The mapping from MeshLab's output is the following:

| ixx ixy ixz |
| ixy iyy iyz |
| ixz iyz izz |

As a quick check that the matrix is sane, you can use the rule that the diagonal entries should have the largest values and be positive, and the off-diagonal numbers should more or less approach zero.

Precisely, the matrix has to be positive definite (use your favorite maths tool to verify that). Its diagonal entries also have to satisfy the triangle inequality, ie. ixx + iyy >= izz, ixx + izz >= iyy and iyy + izz >= ixx.

Checking in Gazebo

To check if everything is done correctly, you can use Gazebo's GUI client.

  • Using Gazebo standalone

    1. Run Gazebo

    2. Spawn your robot

      gz model -f my_robot.sdf
  • Using Gazebo with ROS

    1. Run Gazebo

      roslaunch gazebo_ros empty_world.launch
    2. Spawn your robot (substitute my_robot, my_robot_description and MyRobot with your robot's package/name):

      • SDF model:

        rosrun gazebo_ros spawn_model -sdf -file `rospack find my_robot_description`/urdf/my_robot.sdf -model MyRobot
      • URDF model:

        rosrun gazebo_ros spawn_model -urdf -file `rospack find my_robot_description`/urdf/my_robot.urdf -model MyRobot

As soon as your model loads, pause the world and delete the ground_plane (this is not needed, but it usually makes debugging easier).

Go to the Gazebo menu and select View->Inertia. Every link should now display a purple box with green axes. The center of each box is aligned with the specified center of mass of its link. The sizes and orientations of the boxes correspond to unit-mass boxes with the same inertial behavior as their corresponding links. This is useful for debugging the inertial parameters, but we can make one more thing to have the debugging easier.

You can temporarily set all the links to have a mass of 1.0 (by editing the URDF or SDF file). Then all the purple boxes should have more or less the same shapes as the bounding boxes of their links. This way you can easily detect problems like misplaced Center of Mass or wrongly rotated Inertia Matrix. Do not forget to enter the correct masses when you finish debugging.

To fix a wrongly rotated Inertia Matrix (which in fact happens often), just swap the ixx, iyy, izz entries in the model file until the purple box aligns with its link. Then you obviously also have to appropriately swap the ixy, ixz and iyz values (when you swap ixx<->iyy, then you should negate ixy and swap ixz<->iyz).

Further improvements

Simplify the model

MeshLab only computes correct inertia parameters for closed shapes. If your link is open or if it is a very complex or concave shape, it might be a good idea to simplify the model (e.g. in Blender) before computing the inertial parameters. Or, if you have the collision shapes for your model, use them in place of the full-resolution model.

Non-homogeneous bodies

For strongly non-homogeneous bodies, this tutorial might not work. There are two problems. The first one is that MeshLab assumes uniform-density bodies. The other is that MeshLab computes the Inertia Tensor relative to the computed center of mass. However, for strongly non-homogeneous bodies, the computed center of mass will be far from the real center of mass, and therefore the computed inertia tensor might be just wrong.

One solution is to subdivide your link to more homogeneous parts and connect them with fixed joints, but that is not always possible. The only other solution would be to find out the inertia tensor experimentally, which would surely take a lot of time and effort.


We have shown the process of getting the correct inertia parameters for your robot model, the way how to enter them in a URDF or SDF file, and also the way how to make sure the parameters are entered correctly.