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The constant winding tension can make the filament arranged in order. The stress distribution between the filament balance fully gives play to the enhancement of filament, and increases the intensive workload of the composite winding material. This paper conducts the mechanical analysis for the unwinding roller and tension measuring roller of the cylindrical winding machine so that gets the mechanical model, gives error compensation formula caused by the radius change of the yarn group in the unwinding side, designs the closed-loop control system and utilizes the dynamical- integral PID control strategy to achieve the tension control during the process of the cylindrical winding.

The winding process consists of the production of mandrel and lining, the disposition of the glue solution, the filament drying, heat treatment, winding, solidification, testing, and reconditioning [

Many domestic scholars conduct the theoretical analysis and experimental research for the filament winding tension. Ding Baogeng, Yang Fujiang et al. deduced the winding tension formula with full consideration for the prerequisite of the relaxation effect of the circle of winding glass fiber on the various layers. Xu Pingan established a new precise tension control system in his master’s thesis, controlling the tension of the yarns accurately during the filament winding process. Ren Qile designed and set up the tension control system in his doctoral dissertation, regarding the winding roller and swing rod as the object of study respectively. He employed the closed-loop control system of which the integral separation PID is the control strategy. Zhang Zongyi, Deng Guide, Shou Binan, and Li Xiaoyang et al. came up with an equivalent cooling method which made the pre- stress caused by the winding tension equivalent to the pre-stress caused by the cooling of the composite layer. They deduced the computational formula between the winding pre-stress and the cooling temperature of composite layer and utilized the general finite element software to study the influence of the winding tension on the stress of the round winding composite gas bottle based on the equivalent cooling method. Zhu Guohui et al. analyzed the wingding vessel of the low stress inner shell designing and deduced the winding original stress formula of the steel band winding. Jia Xiaoning et al. came up with a static friction microcomputer control system of application of power and tension, which uses the torque motor directly connected with the yarn group axis to exert the original tension and control the original tension in the microcomputer. T Ueki, S Suzuki, R Morikawa and, H Hashimoto describe optimization method of winding tension for preventing the wound roll defects under unstable environmental temperature based on the optimum design technique by Hashimoto [

This paper conducts mechanical analysis for the unwinding roller during the cylindrical filament winding process. Based on the analyzed mechanical model, the control strategy of unwinding roller and winding process is deduced with the unwinding roller as the control target. This paper utilizes the dynamical-integral PID control strategy to achieve the control for the winding tension.

The winding tension control system includes unwinding, tension acquisition, auxiliary facilities, and control, as is shown in

The winding tension control needs to ensure the effective performance of the winding products’ enhancement of the various layers of filament. However, the features of the winding filament, the winding radius change, the friction, the resin content will influence the stability of the tension during the winding process [

The proper control of the filament winding tension can enhance the quality of the winding products effectively. The designed tension control system utilizes the closed-loop control method in this paper. The tension sensor feeds back the real-time tension and the system gives the control signal after calculation to drive the executive component to operate the AC servo motor to control the unwinding speed of the unwinding roller and finally the goal to control the tension is achieved. Utilize the operation of the motor to impose the torque resistance on the winding roller to control the feeding speed of the winding roller so as to achieve the goal of controlling the winding tension.

As is shown in

The balance equation of the dynamic torque of the stressed unwinding roller is:

In the equation,

T: filament tension (N);

R(t): real-time radius of the yarn group (m);

M(t): resistance torque of the motor (N∙m);

M_{vf}: friction torque of viscidity (N∙m);

ω: the speed of the yarn group (rad/s);

J: the rotational inertia of the winding roller (kg∙m^{2});

M_{0}: the friction torque of the dryness (N∙m).

From Equation (1), it can be known that the control target of the tension control system is a complex real-time system, including the radius of yarn group, the angular speed of the winding roller, and the rotational inertia of the unwinding roller, which change along with the time.

Therefore the above equation needs to be simplified, ignoring the elements which has less influence and has smaller change along with time. The detailed simplifying elements are analyzed as follows:

1) The dryness and viscidity friction have little change along with time and have little influence on the system, thus they can be ignored;

2) The instant change has little influence on tension thus it can be ignored, such as the J(t)ω(t), which is the rotational inertia of the unwinding roller and the rotational inertia of filament.

3) Because the rotational inertia of the yarn group is a steady state value which does not change along with time, the rotational inertia of yarn group can be ignored.

According to the above principles, the Equation (1) can be simplified into:

When the executive motor of the tension control system works normally, it usually is in a condition of dynamic braking. Its torque relationship is shown as Equation (3):

In the equation, M represents motor, the subscript c electromagnetic torque, 0 the no-load torque, d the dynamic torque; ω the angular speed.

Because there are few no-load motors during the winding process, the no-load torque M_{0} can be ignored; besides, when the motor is in a condition of steady rotation, its dynamic torque M_{d} is 0. Therefore the Equation (3) can be simplified into Equation (4):

Because,

In the above equation, K is the electric constant of the motor; Φ is the main flux and I_{d} is the torque current. And because:

In the above equation, R is the radius of the yarn group; F is the tension.

Deduced from the above:

Converse the Equation (7):

From the equation, it shows that the tension is related to the radius of the yarn group and the current component. To make the tension remain constant, the current I_{d} should be controlled linearly according to the radius change of the yarn group. In other words, the control of the braking torque of the motor is achieved through the control of the motor current, and then the tension control is achieved also. From the Equation (8), it is shown that the torque component Id can be confirmed and the closed-loop control of tension can be achieved through testing and feeding back the radius of yarn group and the tension.

The real-time tension acquisition is a significant feedback part in the tension control system. The proper periodical data acquisition for the real-time data of tension can enhance the control precision effectively. The popular tension acquisition method is shown as

implement.

The force analysis of the measuring device is indicated as

In the equation, J is the rotational inertia and ω is the angular speed of guide roller 2 respectively. M_{0} is the static friction torque of guide roller 2, l_{1} the filament length from guide roller 1 to guide roller 2, and l_{2} the filament length from guide roller 2 to guide roller 3. The static friction is ignored and the above equation can be simplified into:

When the two sides of guide roller 2 have tension change resulting from the speed change, the positive pressure of guide roller 2 is calculated as Equation (11).

In this equation, F_{0} is the original pressure in the condition of balance, which is decided by the original winding tension.

During the winding process, because the non-uniform speed of winding the yarn resulting from the acceleration and deceleration motions, the tension finally changes. Therefore the control system cannot follow up and adjust in time and finally the filament is broken or loose. Thus, during the winding process, when the acceleration or deceleration motion caused by certain elements occurs, to ensure the uniform speed of winding the yarn, the speed compensation is required for unwinding roller. Normally certain braking torque will be imposed on the executive motor of the unwinding roller so that the tension can be maintained as constant. The dynamic torque is:

In the above equation, J represents rotational inertia, p filament, m the roller.

During the filament winding process, the rotational inertia of filament is changing dynamically. It is in direct proportion to the radius change of the yarn. Therefore it can be calculated through Equation (13).

In the equation, ρ is the density of the yarn; b is the width of yarn; R is the radius of yarn group.

Then,

The simultaneous equation is:

As is shown in Equation (15), the dynamic torque M_{d} which needs compensation can be calculated through tracking the radius of the unwinding and winding yarn group and the accelerated speed of the unwinding roller. So it shows that the unwinding roller needs to remain a constant linear speed for achieving the control of the winding filament’s constant tension.

The filament winding tension takes the closed-loop control method [

The classic PID strategy is used broadly in various closed-loop control systems [

The input of the dynamic integral PID controller changes the contained integral and differential parts of PID controller through weighting coefficient β and finally achieve the steady control of the system [

When β = 0, the deviation e will exceeds the normal value. The PID controller uses the PD to control thus the system will have relatively fast responding speed and meanwhile it can be avoided to expand the overshoot.

When β = 1, the PID controller will use PI to control.

When 0 < β < 1, PID controller is controlled by the universal PID to ensure the control precision of system.

If the deviation time function is

From Equation (5) to Equation (8): n is the number of sampling, n = 0, 1, 2; T is the period of sampling; u(n) is the output at the nth sampling; e(n) is the deviation signal; K_{p} is the proportion coefficient, K_{I} is the integral coefficient, K_{D} is the differential coefficient.

According to the adjustment principles for the various coefficients of PID during the filament winding process, when the deviation of system is great, the integral action should be weakened and when the deviation reduces, the integral action should be enhanced. The dynamic integral PID can weaken the system fluctuation occurs during the adjustment process to enhance the stability of system. The dynamic integral indicates that when the deviation is huge, the integral acceleration should slow down and the integral action should be weakened correspondingly; when the deviation is small, the integral accumulation should accelerate and the integral action

should be enhanced correspondingly.

Set the coefficient G(e(n)), which is the function of deviation e(n). When the deviation increases, G(e(n)) will decrease, otherwise, it will increase. If the variation range of the time deviation

The integral term of the dynamic integral PID is shown as Equation (18).

As is shown in Equation (18), the interval of G(e(k)) is [0, 1]. When the deviation exceeds the expected value, make the coefficient

When

Substitute Equation (18) to Equation (17) and the equation of the dynamic integral PID is shown as Equation (20).

To test the dynamic integral PID control strategy, this paper chooses MatLab to have the simulation experiment. The step signal of 1 is chosen in the simulation. Its corresponding results show that the response and overshoot of the normal PID is shown in

To make the filament of the cylindrical winding product has constant tension and give full play to the fiber reinforced function, this paper analyzes the force on the unwinding roller and the tension acquisition part during the winding process, utilizes the motor to impose resistance torque on the unwinding roller during the process, designs and implements the tension closed-loop control system of which the unwinding roller is the control target. That system chooses dynamic integral PID control strategy. The simulation experiment results show that the response and overshoot of the normal PID obviously exceed those of dynamic integral PID. It indicates that the dynamic integral PID has better adjustment function for the overshoot, better steady-state performance, better adjustment quality, and better system transition. Therefore, the control system has relatively good stability, the overshoot is decreased efficiently, and the response time of system is shortened.

Hua Su,Xi’an Zhang, (2016) On the Mechanical Analysis and Control for the Tension System of the Cylindrical Filament Winding. Journal of Textile Science and Technology,02,7-15. doi: 10.4236/jtst.2016.22002