Self-Diagnostic Method for Resistive Displacement Sensors ^†

Abstract

Displacement sensors play a key role in the control of dynamic processes. Such sensors can be endowed with self-diagnostic capabilities to identify both the degradation of their conditions and the possible process anomalies that caused them, thus allowing researchers to monitor the process efficiency and therefore its sustainability. Within this scope, a self-diagnostic method is proposed to infer the conditions of a resistive displacement sensor by estimating its model parameters online during operation. Experimental results confirm the effectiveness of the presented method.

1. Introduction

The industrial world is constantly seeking sensors with increasing intelligence and robust measurement methods. In particular, a crucial demand regards the development of sensors with self-diagnostic capabilities to provide information on the sensor health status besides data on the measurand. Such diagnostic information can be exploited by suitable predictive maintenance techniques in order to improve service scheduling and minimize plant downtime [1]. Monitoring sensor conditions also allows researchers to derive information on process efficiency, which is useful in controlling and reducing material waste toward sustainable manufacturing. In this context, this work proposes a self-diagnostic method to infer the conditions of a resistive displacement sensor online during operation, i.e., without requiring the sensor disconnection from the ongoing dynamic process or specific test procedures. The method has been designed in order to meet the computational performances of typical microprocessors so that it can advantageously lead to implementation embedded in the sensor.

2. Materials and Methods

The sensitive element of a generic resistive displacement sensor is typically composed of a resistive track and a sliding cursor, and their failures are the primary fault modes of resistive displacement sensors [2]. The sensor of linear displacement x is modeled by the resistive circuit of Figure 1a, which comprises two parameters. Namely, R_c represents the contact resistance between the sliding cursor and the resistive track while ξ represents the resistive track resistance per unit length. The sensor conditions can be inferred from such parameters, since, for example, an excessive contact force between the sliding cursor and the resistive track causes the reduction of its thickness, implying ξ to increase. Furthermore, the sliding cursor wear is reflected into a variation of R_c. The proposed self-diagnostic method estimates online the model parameters vector p = [R_c, ξ] by solving the matrix system R = Ap reported in Figure 1a. The term R comprises the resistances between sensor terminal pairs (1;2), (2;3) and (1;3), which are named R₁₂, R₂₃ and R₁₃, respectively. The square matrix A depends on the sensor’s useful electrical stroke length FS for x.

The experimental setup adopted to test the self-diagnostic method consists of a thick film, linear resistive displacement sensor with FS = 100 mm (Gefran PK, Provaglio d’Iseo, Italy), a 6.5-digit digital multimeter (Keithley DAQ6510, Solon, USA) and a precision linear positioning stage (Physik Instruments LS-270, Eschbach, Germany) used to move the sensor sliding cursor in n = 500 different random positions. Assuming a constant temperature, firstly, the resistances R_12k, R_23k, and R_13k have been measured at each position k from 1 to n. Thus, the initial sensor parameters p₀ = [R_c0; ξ₀] have been estimated by solving the system R₀ = Ap₀. Subsequently, the sensor has been operated by moving the sliding cursor throughout the whole stroke back and forth 10⁶ times, causing wear. Figure 1b,c illustrate the undamaged and worn resistive track, respectively. Then, the worn sensor parameters p_w = [R_cw; ξ_w] have been estimated by following the same procedure adopted for p₀. The n values of the parameters p₀ and p_w versus the corresponding cursor positions are reported in Figure 2a.

3. Discussion

The mean value P₀ of p₀ over the n estimations is taken as the reference for an undamaged sensor. The proposed method detects the sensor conditions alteration by evaluating the difference vector ∆ = [∆R_c, ∆ξ] = p_w − P₀. A fault condition is detected whenever ∆R_c or ∆ξ are larger than specific alarm thresholds. Thresholds can be set by considering the impact of the individual parameters R_c and ξ on the sensor metrological performances compared with the requirements of the process under monitoring. From the sensor model, an updated estimation of the cursor position x′ can be obtained as x′ = (R₁₂ − R_c)/ξ. The mean value P_w of p_w over the n cursor positions is calculated. The components of P_w are then used to estimate x′, realizing a self-calibration of the sensor characteristic. Figure 2b plots the position error e_pos = x′ − x measured on the worn sensor obtained by using both P_w and P₀ to estimate x′. The reference cursor position x is obtained through the linear positioning stage. Consistently with the expectations, a larger error is successfully detected in the latter case. As an ongoing work, it is expected that fault typologies can be classified by using a machine learning algorithm trained on vectors ∆ obtained from different sensor wear conditions.