Abstract

The fatigue crack growth characteristics of structural steel and weld connections are analyzed using quantitative acoustic emission (AE) technique. This was experimentally investigated by three-point bending testing of specimens under low cycle constant amplitude loading using the wavelet packet analysis. The crack growth sequence, that is, initiation, crack propagation, and fracture, is extracted from their corresponding frequency feature bands, respectively. The results obtained proved to be superior to qualitative AE analysis and the traditional linear elastic fracture mechanics for fatigue crack characterization in structural steel and welds.

1. Introduction

Paris and Erdogan [1] demonstrated that linear elastic fracture mechanics (LEFM) is a useful tool for characterizing crack growth by fatigue. Since that time, application of fracture mechanics to fatigue problems has become a fair routine. Acoustic emission technology is the most appropriate nondestructive testing (NDT) method for studying fatigue crack growth in civil engineering structure because it can monitor its health in real time [2]. Effective crack detection may lead to an early warning. The AE technique can be used to continuously detect slight deformation and damage in the interior of materials. In other words, sampling AE signals and analyzing their characteristics may contribute to the understanding of the real-time failure behavior of materials [3].

The AE parametric analyses have been commonly employed during fatigue crack growth characterization. Ohtsu and Tomoda [4] reported that the AE waveform shape depends on the cracking mode, enabling the classification of cracks in different materials. Shear cracks generally follow tensile as the material approaches to final failure. Yoneda and Ye [5] report that failure phenomena in metals can be interpreted by evaluating the amplitude distribution, AE event count, and total AE energy. Aggelis et al. [6] discuss the application of other AE parameters, such as rise angle (RA) value, rise time (RT), AE hit rate, and duration damage characterization of metal. They realized that as the duration and RT increase, there is a shift of cracking mode from tensile to shear. Boinet et al. [7] correlated the AE parameters like rise time and duration with corrosive processes in aluminium.

A good correlation between AE parameters and fracture mechanics principles during fatigue has been reported by [8, 9]. Grosse et al. [10] reported the pros and cons of the parametric AE analysis. They postulated that in practical applications it can be difficult to discriminate an AE signal from noise after the signal has been reduced to a few parameters.

Quantitative techniques that deal with the study of AE signal waveform have been applied in various engineering fields for damage evaluation. The fast Fourier transform (FFT) has been used to decompose a time-domain sequence in terms of a set of basic functions. A major problem in using the FFT results from the fact that the transform is the result of integration in the continuous time domain over the entire signal length [1113]. This problem led to the evolution of the time-frequency data processing methods, such as the short time Fourier transform (STFT). Neild et al. [14] provided a thorough review of various time-frequency techniques for structural vibration analysis. The wavelet transform which is the main interest of this paper has been successfully combined with AE signal parameter for analysis of real-time failure process, such as differentiation of crack types, quantification of damage, and identification of AE source locations [1517]. This paper discusses the fatigue crack growth characterization in structural steel and weld using quantitative methods. The frequency feature bands corresponding to crack growth sequence, that is, initiation, crack propagation, and fracture, are extracted and compared with qualitative AE analysis and LEFM.

2. Wavelet Packet Theory

Wavelet transform, a contemporary technique for data and signal analysis, has already found its distinguished place in nondestructive testing. Wavelets are mathematical functions that cut up data into different frequency components and then study each component with a resolution matched to its scale. Several types of wavelets which could be successfully applied to AE analysis are Shannon wavelets, Haar wavelets, Daubechies wavelets, Meyer wavelets, Gaussian wavelets, Mexican hat wavelets, Morlet wavelets, and complex frequency B-spline wavelets.

The continuous wavelet transform of an arbitrary function is defined as where The parameters “” and “” stand for scale and shift of the basic wavelet. For each scale “” and position “” the time-domain signal is multiplied by shifted and scaled versions of the wavelet function.

The discrete wavelet transform (DWT) of a discrete time sequence is given as where is the wavelet function and are scaled and shifted versions of based on the values of scaling coefficient “,” and shifting coefficient “” wavelet packets transform (WPT) is a generalization of wavelet analysis offering a richer decomposition procedure. WPT can be used to decompose signals into different components in different time windows and frequency bands which can be considered as features of the original signals. Wavelet packets decompose the low frequency component as well as the high frequency component in every subband. The Gabor function is used as the analyzing wavelet because it provides a small window in the time as well as in the frequency domain.

Consider In the frequency domain, the Gabor function is represented as

3. Experimental Details

3.1. Specimens Design

Received hot-rolled 16Mn steel was supplied in the standard thermomechanical heat treatment condition in the form of 16 mm thickness plates. The standard three-point bending (SENB) specimens were designed from the steel and the butt welded connection, as a representative part of a steel bridge in accordance with ASTM E647 standards. The mechanical properties and chemical composition of the specimens used are shown in Tables 1 and 2, respectively. The specimens were notched using electrical discharge machining (EDM) to an initial crack length of 18 mm. The specimen was fatigue precracked using the MTS machine at a frequency of 10 Hz of length 0.5 mm. The specimens’ surfaces were mechanically polished by grinding and buffing to permit observations of the crack path. The detailed geometry of the specimen is illustrated in Figure 1.

3.2. Test Instrument and Procedure

A servohydraulic testing machine with a maximum load capacity of 250 kN was used for the fatigue tests at an ambient temperature of 300 K (Figure 2). The specimens were tested under sinusoidal cyclic loading at a frequency of 7.5 Hz. The specimens were tested with different peak loads (16 kN and 10 kN) at a load R-ratios of 0.1. At least three specimens were tested under each condition in other to ensure regularity in the experiment. A SWAES full-waveform acoustic emission detector was used to record the AE signals generated during the fatigue tests.

The AE signals were detected by using 2 broadband piezoelectric sensors with frequency range of 10 kHz to 2 MHz. Vaseline was used at the interface between the sensors and the specimen surface to obtain proper signals. A preamplifier of 40 db gain was used to capture the AE signals. The crack-tip opening-displacement gauge (CTOD) was used to monitor the fatigue crack growth in the structure. The crack length at any given cycle was arithmetically computed using where , , , , , , , and .

4. Results and Discussions

4.1. Linear Elastic Fracture Mechanics

Paris and Erdogan [1] discovered the power-law relationship for the fatigue crack growth and proposed an exponent of 4 for the constant after series of experiments. Figures 3 and 4 show the relationship between the fatigue crack growth rates () and stress intensity factor ranges and crack length and number of cycles under different load ratios, respectively.

In nearly the whole fatigue lives, they obeyed the Paris law (7) for the steel and welds where is a representative crack length, is the number of fatigue cycles, is the applied stress intensity factor range, and and are assumed to be constants for a particular material. However, the crack growth rates were increased in the weld relative to in the base metal, suggesting that the cracks propagated more rapidly in the weld due to the changes in the microstructure. We realized from the diagram that peak load was less significant on the crack propagation rate.

4.2. Acoustic Emission during Fatigue Crack Propagation

The fatigue crack growth characteristics can be analyzed by studying the parameters of the AE signals so generated. Figure 5 shows the relationships between the cumulative AE counts rates () and stress intensity factor ranges for the welded specimens under different peak loads. The AE counts rates increased in a linear relationship with the increase in on the log-log axes, which is well consistent with (7). Compared to the results from LEFM, the peak load had influence on on the welded specimen. Moreover, higher AE counts rates were also observed in the welded specimens than in the base metal specimens. In addition, the slopes of the lines for the welded specimens were somehow higher than the base metal specimens, also suggesting that the weld generated more AE signals during fatigue crack propagation.

4.3. Wavelet Packet Analysis

The characteristics of fatigue crack propagation during the three-point bending testing of the steel beam and weld connection are classified under 3 stages: crack initiation, crack propagation, and failure at various peak loads corresponding to regions I, II, and III, respectively.

Figures 6(a) and 6(b) show the AE wave in region 1 which corresponds to fatigue source initiation for both weld metal and base metal, respectively. The waveform is low amplitude, wide pulse with a narrow frequency scale, mostly located at 80 kHz to 180 kHz. At this stage, the AE signals are generated by the formation of crack source and plastic deformation on the tip of the notch which generate intense AE events. Higher amplitudes are recorded for the weld than the base metal due to the release of residual stresses. Figures 7(a) and 7(b) show the AE in region 2 corresponding to fatigue crack propagation. The waveform at this stage as compared to the fatigue source has high amplitude, narrow pulse, with a wide energy scale, and a main frequency scale of 250 kHz to 350 kHz for the base metal and 250 kHz to 450 kHz for the welded specimen.

Figures 8(a) and 8(b) show the AE waveform at the rapid crack propagation stage; the energy of the AE signal increased until the specimen completely failed, and the AE waveform amplitude is higher than those of the earlier stages. The waveform characteristic shows that this type of AE signal is a burst signal. The fracture waveform is a high amplitude narrow pulse, with a wide energy scale, and a main frequency scale of 300 kHz to 400 kHz for the base metal and between 300 kHz and 600 kHz for the welded specimen.

5. Conclusion

From the above discussions, it is evident that fatigue crack growth rates for the welded specimen are higher than the base metal; this was enhanced by the presence of inclusions and heterogeneous microstructure of the welds. The effect of peak load on fatigue characterization was found to be insignificant. Furthermore, the quantitative technique of the wavelet transform provided clear results for crack propagation characterization in both the steel and welded specimen.