Abstract

The properties of anchored surrounding rock may vary considerably under complex geological and stress conditions, especially dynamic loading in deep mining. Therefore, comprehensive study of the reinforced mechanism is required to prevent failures associated with deep mining. In this paper, with sandstone as matrix and steel bar as bolt, the dynamic compression test of reinforced rock was carried out by using a 50 mm rod diameter split Hopkinson pressure bar (SHPB) test device. The mechanical and energy characteristics of reinforced rock under dynamic loading were analyzed. The results show that the dynamic strength of reinforced sample is greater than that of unreinforced sample and increases with the increase of the strain rate. The reflected energy and absorbed energy increase with the increase of incident energy, while the transmitted energy increases slightly. The higher the strain rate, the larger the energy dissipation rate and the higher the degree of fragmentation. It shows that the energy dissipation characteristic reflects the internal damage process to some extent. Compared with the results of unreinforced samples, the reflected energy of reinforced samples significantly increases and the absorbed energy will significantly decrease. It can be seen that the bolt can reduce absorbed energy of surrounding rock, thereby improving the stability of roadway surrounding rock. The results may provide reference for the stability of deep roadway and support design.

1. Introduction

Rockbolts are considered as a simple, safe, and economical rock mass reinforcement technology, which are widely used in mines, slopes, tunnels, and other geotechnical engineering, and have achieved good economic and social benefits [1]. Rockbolt performance and reinforcement are influenced by geological and stress conditions [2, 3], especially affected by impact loading, which are suspected as the great challenges to the reinforcement mechanism and support design [4, 5].

In recent decades, many scholars carried out lots of laboratory and numerical tests, complemented by theoretical analysis, to study the mechanism of anchored rock. In roadway support, the anchor housing is often installed in sections over a short section with one resin charge or using an expansion head [6, 7]. Carranza-Torres [8] proposed a closed-form solution of rockbolt reinforcement around tunnels, and numerical analysis confirmed that the bolt plays an important role in increasing the tunnel confining pressure and controlling the surrounding rock deformation. Zhao and Yang [9] designed the pull test of bolt with crack based on the separation defect in the anchorage area and analyzed the influence of crack on axial stress and shear stress distribution of bolt. Zhang et al. [10] analyzed the mechanical properties of reinforced rock mass with cross-flaws and obtained that the compressive strength of cross-flaws rock is higher than that of single-flaw rock. A new analytical model that represents the behavior of reinforced ground near a circular underground opening in a homogeneous, uniform stress field has been developed by considering the interaction behaviors between the grouted rockbolt and ground [11]. Moosavi and Grayeli [12] simulated rockbolt support problems by using the DDA method and mainly focused on the basic performance of the support system. Freeman [13] first proposed the concept of “neutral point” by analyzing the full-length bonded anchor in the test tunnel, which is widely recognized and applied, but the position of “neutral point” is difficult to determine.

In practical rock engineering, rock mass is subjected to static load and will also be affected by dynamic loads [14], such as impact, seismic, explosion, earthquake, and blasting. At present, some research studies have been carried out on the dynamic mechanical response of rock [1519]. Li et al. [16] analyzed the cracking of single-crack marble specimen under impact loading based on experimental study. For the difficulty of studying the failure process of underground rock, an experimental method is proposed to explore dynamic failure process of prestressed rock specimen with a circular hole [17]. Zhang et al. [18] and Hao et al. [19] studied the effects of bedding on the dynamic and static properties of coal and rock, respectively. However, few research studies have been carried out on the dynamic response of the rockbolt and reinforced surrounding rock [2023]. And due to complicated geological and mining conditions, a more complete understanding of the mechanical property of reinforced rock is required. Therefore, in this study, dynamic compression tests of sandstones reinforced by using a steel bar were conducted. The mechanical and energy characteristics of the reinforced rock under dynamic loading were investigated, and the results may provide reference for the stability of deep roadway and support design.

2. Specimen Preparation and Experimental Methods

2.1. Specimen Preparation

The sandstone used in the experiment was taken from Linyi, Shandong Province, China. According to the standard GB/T50266-2013 [24], standard cylindrical samples were made (A-1 and A-2). Mechanical parameters of the standard cylindrical specimen were obtained by using the RMT-150C rock mechanics test system (see Figure 1). The compression test was carried out by displacement control with a loading rate of 0.002 mm/s. Two displacement sensors with a range of 2 mm were used during the test to determine transverse deformation of sandstone samples. The average compressive strength and elastic modulus of the standard cylindrical specimen are 53.2 MPa and 4.3 GPa, respectively. Meanwhile, the sandstone specimen was observed by using a scanning electron microscope with SU3500, as shown in Figure 2. From the figure, it is observed that the internal microstructure of the rock is tight and mainly consists of quartz and feldspar.

The test samples, shown in Figure 3(a), were used for unreinforced and reinforced tests and labeled as US and RS, respectively. For example, “US-1” represents the #1 unreinforced specimen and “RS-1” represents the #1 reinforced specimen. The sample size is 50 mm in thickness and 50 mm in diameter. For the reinforced specimen, the bolt arrangement is shown in Figure 3(b). A hole with a diameter of 3 mm was drilled through the center side of the specimen. In this experiment, a steel bar was used to simulate the rockbolt. The steel bar was inserted into the hole and anchored on the rock with resin (the resin used is the same as in mine conditions). The steel bar is 60 mm long, 2 mm wide, and 2 mm thick with the tensile strength of 600 MPa, shear strength of 400 MPa, and elastic modulus of 210 GPa. Since the SHPB test can only directly control the impact pressure and cannot directly set different strain rates, the impact compression test was conducted under the impact pressure range of 0.35∼0.6 MPa.

2.2. Test System

The dynamic compression test of rock was carried out by using a 50 mm rod diameter split Hopkinson pressure bar (SHPB) test device. Figure 4 illustrates the schematic of the SHPB system, which mainly consists of two parts, i.e., three bars (an incident bar with a length of 2 m, a transmitted bar with a length of 1.5 m, and an absorbing bar with a length of 0.5 m) and a data acquisition subsystem. A semisine wave was generated by a special shape striker and used as the loading stress wave to ensure that the stress was even before failure of the specimens [25, 26]. The incident, transmitted, and absorbing bars were made of 40Cr alloy steel with a density of 7810 kg/m3, longitudinal wave velocity of 5410 m/s, and elastic modulus of 250 GPa. The strain gauge model on the incident and transmitted bars is BE120-5AA and the resistance value is 120 Ω. The measurement base has a length of 8.5 mm and a width of 4 mm. The KD 6009 strain amplifier is used to collect data signals.

According to the stress wave signals collected by strain gauges on the incident and transmitted bars, the stress, strain, and strain rate of the specimen during impact loading were calculated based on the one-dimensional stress wave theory and stress uniformity hypothesis. The calculation formula is as follows [25]:where , , and are the stress, strain, and strain rate, respectively. and are the area of the specimen and the bar, respectively. is the elastic modulus of bars. , , and are the incident wave, reflected wave, and transmitted wave, respectively. is the length of specimen. is the wave velocity of bars.

3. Experimental Results

3.1. Stress Equilibrium

For dynamic compression tests, it is necessary to eliminate wave dispersion and inertia effect to ensure the accuracy of test results. Therefore, the stress equilibrium at the two ends of the specimen before failure was reached. In this paper, the typical stress wave signals of samples US-4 and RS-4 from the dynamic loading experiment are shown in Figure 5. With increase of loading time, the curve of the sum of the incident and reflected waves (In. + Re.) almost overlaps with that of the stress (Tr.), indicating that the specimen is basically in a stress equilibrium state during this dynamic loading process, and the test data are reliable.

3.2. Stress-Strain Curve Characteristics

The strain signals on the incident and transmitted bars were recorded by using the ultradynamic strain gauge. Based on equations (1) and (2), the strain signals on the incident and transmitted bars can be converted into the stress and strain signals of the specimen during dynamic loading. The stress-strain curves of samples under dynamic loading are shown in Figure 6.

It can be seen from Figure 6 that the stress-strain curve of the specimen can be divided into the phase of linear elasticity, plasticity, and failure under dynamic loading. Due to the high impact velocity, the phase of macro-microscopic defect closure compaction is extremely short, and there is basically no sunken section in the stress-strain curve, which directly enters the phase of linear elasticity, and the stress increases linearly with the strain. Then, the phase of plasticity begins, and the slope of the curve decreases. Finally, the ultimate strength of the specimen is reached, accompanied by the failure of the specimen.

3.3. Dynamic Compressive Strength

The mechanical parameters of the specimens under impact loading are shown in Table 1. In order to analyze the effect of the loading rate and bolt on rock strength, the test results are plotted as scatter plot, as shown in Figure 7.

Figure 7 shows that the dynamic compressive strength of US and RS samples increases with the increase of strain rate. Moreover, the dynamic elastic modulus of the specimen is different under different strain rates (Figure 7), and the dynamic elastic modulus increases with the increase of strain rate. It shows that the rock specimen has a strong correlation with the strain rate. The dynamic compressive strength of RS samples is slightly higher than that of US samples. The results show that the strength and deformation ability of rock are improved by applying rockbolt and reflecting the obvious correlation of strain rate.

4. Energy Characteristics

4.1. Energy Calculation

According to the energy balance [27], the absorbed energy of rock during impact loading can be calculated using the following equation [28]:where are the absorbed energy, incident energy, reflected energy, and transmitted energy, respectively. can be calculated using the following equations [28]:

The results show that the absorbed energy of rock is mainly converted into the energy dissipation, kinetic energy, and other energy, among which the energy dissipation of specimen fragmentation is more than 90% of the absorbed energy [29]. Therefore, the absorbed energy is approximately substituted for the energy dissipation of specimen fragmentation in this study. In order to measure the strength of energy dissipation of the US and RS specimens under different loading rates, it is generally characterized by the energy dissipation rate, which can be calculated aswhere is the energy dissipation rate.

4.2. Analysis of Energy-Time Curves

Certainly, the deformation and destruction of rock is the whole process of the energy dissipation and energy release [3032]. Therefore, the energy dissipation characteristics of samples during impact loading are analyzed from the viewpoint of energy. According to equations (4)–(7), the strain-time curves of specimen are obtained by the experiment. The energy-time curves of all samples are plotted in Figures 8 and 9 by calculating.

It can be seen from Figures 8 and 9 that the same phenomenon occurs for US and RS samples under impact loading. The incident energy, reflected energy, and absorbed energy increase rapidly compared with the transmitted energy with the propagation of the stress wave, and their values maintain stable after reaching a certain value, while the transmitted energy-time curve is approximately a horizontal line. Based on the stress-time curve and energy-time curve, we can find that the appearance of maximum absorption energy indicates the failure of the US and RS samples [33].

4.3. Energy Change Characteristics

Test results of the energy distribution of samples under impact loading are shown in Table 2. In order to analyze the effect of loading rate and bolt on energy characteristics, the test results are plotted as scatter plot, as shown in Figures 10 and 11.

Because the generation of incident energy is caused by the impact between the striker bar and incident bar, the value of incident energy is determined only by the velocity of the impact bar. In this study, loading rates are the single factor, and the sample type (US and RS samples) has no effect on the incident energy. Figure 10(a) shows that the reflected energy of all samples increases linearly with the increase of incident energy, and the transmitted energy increases slightly. The absorbed energy of specimen increases as a power function with the incident energy (Figure 10(b)). As can be seen from Table 2, most of the energy is dissipated in the form of reflected wave with increase in the incident energy, which is consistent with the results of Li et al. [34].

Figure 11 shows that there is an exponential relation between the energy dissipation rate of samples and strain rate. The failure of sample becomes more severe with the strain rate, and the failure mode of sample develops from cleavage to fragmentation. That is to say, more energy was used to generate new cracks in the samples with the increase of strain rate, reflecting the obvious correlation of strain rate. Comparing the energy characteristics of US and RS samples, it is known that the absorbed energy and transmitted energy of the unreinforced specimen are higher than that of the reinforced specimen, while the reflected energy of the unreinforced specimen is lower than that of the reinforced specimen (Figure 10). As shown in Figure 11, the energy dissipation rate increases with the increase of strain rate, and the increased rate of the unreinforced specimen is slightly higher than that of the reinforced specimen. Under the same strain rate, compared with the unreinforced specimen, the less the energy dissipation of the reinforced specimen, the more difficult the crack propagation, and the smaller the destruction degree, the greater the fragment (Figure 11).

5. Discussion

With increasing coal mining depth and growing coal output, the geological and mining conditions have changed complicated considerably [35], and roadway instability has been a major concern for researchers. Floor heave, roof falling off, and splitting failure of roadway are often occurred. Roadway stability is analyzed from the viewpoint of energy. The energy is dissipated in the form of wave propagation in the rock. A graph of wave propagation in the interior of the reinforced specimen is shown in Figure 12. When the incident energy comes from the rock, three components of the energy are divided, namely, the absorbed energy, reflected energy, and transmitted energy. From the performance of reinforced specimen, as discussed in Sections.3 and 4, it is indicated that the dynamic strength and deformation ability of rock were enhanced by applying rockbolt, and the absorbed energy of the reinforced specimen was reduced. This is because the lateral confining pressure is equivalently applied by inserting the bolt in rock mass (Figure 12(b)); the material strength parameters of rock mass were improved [36], which improves the strength of the rock mass and restricts the crack propagation. Therefore, at the same incident energy, the more difficult the crack propagation of reinforced sample, the less the absorbed energy [37]. When the roadway reinforced by the rockbolt is subjected to dynamic loading, the rockbolt can share load, increasing the strength of roadway surrounding rock, so the deformation of roadway surrounding rock will be restricted. Furthermore, most of energy is transmitted in the form of reflected energy, and little absorbed energy is used to break the reinforced surrounding rock, so the roadway will retain stability.

6. Conclusions

The experimental investigation of steel bar-reinforced sandstones under impact loading is presented in this paper. The strengths, energy characteristics, and failure patterns of unreinforced and reinforced samples were studied. The following conclusions can be drawn based on this study:(1)The bolt can share the compressive stress of rock. The compressive strength of reinforced samples is greater than that of unreinforced samples under dynamic loading. And, the dynamic strength increases with the increase of strain rate, reflecting a strong correlation with the strain rate.(2)The reflected energy and absorbed energy increase with the increase of incident energy, while the transmitted energy increases slightly. The higher the strain rate, the larger the energy dissipation rate and the higher the degree of fragmentation. It shows that the energy dissipation characteristic reflects the internal damage process to some extent.(3)The bolt has an important influence on the absorbed energy and failure characteristics of rock. Compared with unreinforced rock, the lesser the absorbed energy of reinforced rock, the smaller the damage degree. Consequently, the bolt can minimize failure of surrounding rock.

Data Availability

The data used to support the findings of this study are included within the article.

Conflicts of Interest

The authors declare that they have no conflicts of interest regarding the publication of this paper.

Acknowledgments

This work was supported by the Postgraduate Research and Innovation Project of Hunan Province (CX20190657) and the National Natural Science Foundation of China (51674041 and 51474103).