Global-Local Finite Element Analysis for Predicting Separation in Cord-Rubber Composites of Radial Truck Tires

A global-local finite element modeling technique is employed in this paper to predict the separation in steel cord-rubber composite materials of radial truck tires. The local model uses a finite element analysis in conjunction with a global-local technique in ABAQUS. A 3-dimensional finite element local model calculates the maximum cyclic shear strain of an interface between steel cord and rubber materials at the carcass ply shoulder region. It is found that the maximum cyclic shear strain is reliable as a result of the analysis of carcass ply separation in radial truck tires. Using the analysis of the local model, a study of the cyclic shear strain is performed in the shoulder region and used to determine the carcass ply separation. The effect of the change of carcass ply design on the separation in steel cord-rubber composite materials of radial truck tires is discussed.


Introduction
In recent years, composite materials have been widely used in several applications due to their superior mechanical properties including high strength, high stiffness, and low density. In the past, the remarkable advancements in theoreti- global-local finite element method (GLFEM) are powerful tools for solving the boundary value problems. Tire durability due to large local loading, stiffness discontinuities, and production flaws is frequently related to the fracture of tire components such as belt separation, carcass ply separation, or lug cracking in radial truck tire [1] [2] [3] [4] [5]. Influence factors on fracture and durability of rubber material and tires are manifold. Accordingly, understanding the fracture and fatigue behaviors of the tire component is the key to improve durability and assess lifetime of the radial truck tire [6].
A separation between the plies in a multi-ply radial passenger car tire is a rare event. It is most closely associated with bias and bias-belted tires. Even in radial passenger car tires with ply angles slightly off radial, a separation between the plies is rare. These separations will appear as bulges or softness in sidewall. Unless they have cracked open to allow a good inspection, cutting open the sidewall is the only method to inspect the interior sections [7]. Unlike passenger car tires, carcass plies are made of steel material in radial truck tires. Usually an externally visible bulge on the top sidewall of the truck tire indicates that cord-rubber composites have been separated inside the carcass ply shoulder region and is the risk of truck tire failure at some time in the future. The separation example from a cord-rubber composite material in truck tires is as shown in Figure 1. Figure   1(a) and Figure 1(b) show the outside and inside surface of the crack propagation at the carcass ply shoulder region. It is shown that the cord and rubber are completely separated from the cut section surface of the truck tire as shown in Figure 1(c). In general, the separation in carcass ply of radial truck tires first begins to rust on the surface of the steel cord and then completely separate as the crack grows around the steel cord as shown in Figure 2.
Due to the combination of high stress/strain, high temperature and large thickness, the tire shoulder and bead parts are among the most vulnerable areas in tire components. As for the radial truck tires, the combination of high load and high inflation pressure makes the belt edge or the ply turn-up endurance problem more severe. Several researchers have studied fracture mechanics of tire. Fracture mechanics provides a fundamental approach to analyze the fracture and fatigue crack growth in tires. Ebbott [1] used a finite element-based  method to analyze the severity of internal cracks in cord-rubber structures. Yan et al. [8] have studied for the endurance of radial truck tires with finite element modeling by using two approaches: stress analysis parameter approach and tire structure parameter approach. Han et al. [3] and Jeong et al. [4] performed a failure analysis of truck tires based on fracture mechanics, using a global-local finite element model. The suggested model has proved effective in a variety of analysis for the prediction of tire lifetime. Zhong [9] formulated to study fatigue crack growth and durability in tires using a three-dimensional fracture mechanics model. The application of this model in a radial truck tire reveals fracture characteristics of belt edge cracks and helps to explain mechanical and material changes in the tire subject to indoor accelerated durability tests. However, the carcass ply separation of radial truck tires has not been studied.
The main purpose of this paper is to predict the separation in cord-rubber composite materials of radial truck tires based on static and steady-state rolling assumption. Cord-rubber composites primarily control the overall performance characteristics of tires. Micromechanical parameters including fiber and void volume fractions cannot be studied by the macroscopic modeling of carcass in tires. In order to predict the separation of carcass ply in truck tires, the local model uses a finite element analysis in conjunction with a global-local finite element analysis in ABAQUS [10]. It is found that the maximum cyclic shear strain is reliable as a result of the analysis of carcass ply separation in radial truck tires. Using the analysis of the local model, a study of the shear strain is performed in the shoulder region and used to determine the separation in carcass ply shoulder region of radial truck tires. The effect of the design change on the separation in steel cord-rubber composite materials of radial truck tires is discussed.

Tire Model
A tire usually consists of several rubber components, each of which is designed to contribute to some particular factors for tire performance in addition to several cords and rubber composites. These components play a role in maintaining the stiffness and strength required in a tire. Figure 3 shows the 2D and 3D finite element mesh on the general structure with a size of 12R22.5 found in radial truck and bus tires, where the roles of tire components are well described in a book by Clark [11]. It consists of a carcass ply, four belt plies, steel chafer, bead wires and several rubber components. Figure 3

Material Model
In general, the material composition of a radial truck tire is largely divided into fiber-reinforced rubber parts and the remaining pure rubber part. The fiber-reinforced rubber parts are composed of a single-ply steel carcass, four steel belt layers, and several steel bead cords. Because the structures of fiber-reinforced rubber parts are very complex, their material models are chosen based on the goal of the numerical simulation. When the fiber-reinforced rubber parts are modeled using finite element analysis, the physical properties of the rubber and cords are combined to yield the resulting physical behavior of the FRR [12] [13], the internal cords are modelled using beam elements [14] or using rebar elements [15] [16] [17] [18]. Studies that have modeled belts based on a single physical behavior have de-fined the behavior using isotropic elasticity [12], hyperelasticity [19], the Halpin-Tsai composite equation [11], or theoretically derived belt constitutive equations [20] [21].
Rubbers except for the FRR parts are modeled by the penalized first-order Mooney-Rivlin model in which the strain-energy density function is defined [13].   (  )   2  1  2  3  10  1  01  2  3 1 , , ; where i J are the invariants of the Green-Lagrangian strain tensor and 10 C and 01 C are the rubber material constants determined from the experiment. On the other hand, K is a sort of penalty parameter controlling the rubber incompressibility. The shear modulus τ and the bulk modulus κ of rubber are related as ( ) , from which one can easily obtain the following relation for Poisson's relation: It is clear that the incompressibility of the rubber is applied asymptotically as the penalty parameter approaches infinity, however, in general, it is better to choose 100 near K for a stable transient dynamic response with the reasonable time step size.

Composite Model
Structural tire analysis is often performed using the cured tire geometry as the reference configuration for the finite element model. However, the cord geometry is more conveniently specified with respect to the "green" or uncured, tire configuration. The tire lift equation provides mapping from the uncured geometry to the cured geometry as shown in Figure 4. This study can specify the spacing and orientation of the rebar cords with respect to the uncured configuration and let Abaqus [10] map these properties to the reference configuration of the cured tire. Using a cylindrical coordinate system, the spacing, s , and angular orientation, α , in the cured tire are obtained from where r is the position of the rebar along the radial direction in the cured geometry, 0 r is the position of the rebar in the uncured geometry, 0 s is the spacing in the uncured geometry, 0 α is the angle measured with respect to the projected local 1-direction in the uncured geometry, and e is the cord extension ratio. A local cylindrical coordinate system must be defined for the rebar if the rebar is associated with three-dimensional elements.

Local Model
The carcass ply topping rubber is the rubber coating that encapsulates the radial ply reinforcing cords. The topping rubber is calendered onto the carcass ply cords in thin sheets. It is analyzed that the reason is that the carcass ply provides the strength to contain the air pressure and provide for sidewall impact resis-

Boundary Condition
To simulate the contact between the tire and the rim, the general purpose interface is defined between a tire slave surface and a rigid body surface of the rim.
The inner and outer rim profiles are both modeled by axisymmetric rigid surfaces. Contact with friction is considered between the tire and the rim. The coefficient of friction is assumed to be 0.3. No other interface is used to model the contact between the rubber matrix and the beads or between the rubber matrix and the different layers, such as carcass ply, belt, bead wrap and steel chafer.

Global-Local Finite Element Analysis
A global-local technique can be applied quite generally in finite element analysis.
The material response defined for the local model may be different from that Using the global-local finite element method outlined in the previous section, a comprehensive study of a radial truck tire with a carcass ply separation is conducted. The local model is formed using a displacement boundary condition in a global finite element analysis of radial truck tire. Figure 6 is the procedure of a global-local finite element analysis for predicting separation of cord-rubber composite materials of radial truck tires.

Separation Analysis of Carcass Ply
In order to obtain the results of global-local finite element analysis, a radial truck tire, 12R22.5, is selected as the design change. It is decided to vary the carcass ply gage or carcass ply line, which have a significant impact on the carcass ply separation. The design change in the carcass ply shoulder region in the radial truck tires with the different carcass ply gage or carcass profile are shown in Figure 7.  strain, and temperature distribution were analyzed to select the most suitable simulation results for carcass ply separation. It is found that the cyclic shear strain increased with decreasing inflation pressure or increasing vertical loading as shown in Figure 8 and Figure 9. The effect of the vertical loading on the carcass ply separation is greater than the inflation pressure. Therefore, it can be seen that is important for the driver to maintain a proper load in order to prevent carcass ply separation in radial truck tires. It is found that the cyclic shear strain xz is reliable as a result of the analysis of carcass ply separation in radial truck tires.
The simulation results of carcass ply separation with the design change are shown in Figure 10 and Figure 11. The version 3 is vulnerable to carcass ply separation, and version 4 is the best as shown in Figure 10. It is found that the carcass ply separation is significantly affected by carcass profile changes compared to topping rubber gage change. In the local model, the measurement position of the maximum shear strain coincides with the crack initiation position of the carcass ply separation as shown in Figure 11. This result agrees with the experimental observation in Figure 1(c). Using the global-local finite element analysis proposed in this paper, we can confirm that the prediction of carcass ply separation in radial truck tires is valid.

Steady-State Rolling Analysis
The steady-state rolling contact analysis permits a local fine mesh near the contact zone while the transient rolling contact analysis requires a fine mesh along the entire tire surface. It leads to a large reduction of computation time in the steady-state rolling analysis. It is assumed that vehicle travels at 80km/h for classification of an angular velocity of a tire. Driving conditions considered in this paper are free-rolling, traction, and braking in order to understand how different driving contribute to the detrimental effects of carcass ply separation in truck tire failure. Figure 12 shows the cyclic shear strain for the driving condition. It is     found that the maximum cyclic shear strain is not affected by the driving conditions.

Conclusion
The global-local finite element modeling technique is employed to predict the separation in cord-rubber composite materials of radial truck tires based on the static loading analysis and the steady-state rolling analysis. The carcass ply separation in radial truck tires begins to rust on the surface of the steel cord and then completely separate as the crack grows around the steel cord. In order to study the carcass ply separation, the global-local finite element analysis is used. It is Open Journal of Modelling and Simulation found that the maximum cyclic shear strain can be used to determine which designs are more likely to cause carcass ply separation. The effect of the change of carcass ply design on the separation in steel cord-rubber composite materials of radial truck tires is discussed. It is found that the prediction of carcass ply separation using a global-local finite element method will be useful for the improvement of the separation of radial truck tire. Ver. 4