Force Calculation

All of the force calculations are done in the ISO coordinate system.

Vertical Force



Figure 1. Front view of tire at an inclination angle


Where is the vertical stiffness of the tire. The lateral deflection is ignored in the calculation.



Where is the tire penetration velocity.

The vertical force can only be positive: in the case of a lift off condition of the tire from the ground, the resulting negative reaction force is set to 0.

If a [DEFLECTION_LOAD_CURVE] block is present in tire property file, then the data inside the block is used to calculate the vertical force. In this case the VERTICAL_STIFFNESS value is ignored. The data in DEFLECTION_LOAD_CURVE should be monotonically increasing. An example of such table is given below:



Friction Coefficient

The friction coefficient is calculated by interpolating the Umax and Umin value using Comprehensive slip.




Figure 2. Friction Coefficient versus Slip

If there is a [MU_SLIP] present in the tire property file than the friction coefficient is calculated by interpolating the data in the table. The data in [MU_SLIP] curve should be monotonically increasing. An example of such table is shown below:



Longitudinal Force

The calculation of the longitudinal force (Fx) depends on the longitudinal slip condition of the tire. Typically, there are two distinct slip states: an elastic deformation state (where the longitudinal slip is less that a critical slip value) and a pure sliding state (where the longitudinal slip exceeds the critical slip value).

The critical longitudinal slip is calculated below:



In case of pure elastic deformation



In case of pure sliding



Where:





Lateral Force

Similar to the critical slip for longitudinal force, a critical lateral slip factor is calculated. It determines the boundary between pure elastic deformation conditions and pure sliding condition of the tire.



In case of elastic deformation state

and are the lateral forces due to later slip and camber respectively.



is the camber angle, when



And if >



Where:



In case of sliding



Overturning Moment

An overturning moment is caused by the shift of the contact point (at which the vertical force is applied) in the lateral direction.


Figure 3. Overturning Moment at the inclination angle

Rolling Resistance Moment

In the FIALA tire model the rolling resistance moment is purely a function of the normal force Fz:

Where omega is angular velocity of tire about spin axis.

Aligning Torque

The same critical lateral slip used in the Fy calculation is also used in determining the condition of the tire.


Figure 4. Point of action longitudinal force which creates a moment about the vertical axis

In case of elastic deformation state

Where is half of the contact patch length. The scaling factor here is half of the contact patch length, however in a FIALA model; the tire width is used as a scaling factor.

In case of sliding