In recent years, with the gradual reduction of conventional energy resources such as oil and natural gas, the exploration and development of shale gas have become a hot spot in current energy research. Shale gas is a kind of unconventional natural gas resource with large storage, wide and clean distribution. It has the advantages of long life and long production cycle, and has a broad prospect of progress. Exploration has found that China's shale gas reserve is abundant and its development potential is huge, which has a strategic position in China's future oil and gas exploration and development.^,, Because of the poor physical properties of shale gas reservoir and the extremely low porosity and permeability, hydraulic fracturing technology is the main method to increase production of shale gas reservoir at present.^,, In the exploration and development of shale gas, the mechanical characteristics and failure mode of shale are important index to evaluate the geo‐mechanical characteristics of the shale reservoir and development effect, which is very important to hydraulic fracturing design and horizontal well deployment.

At present, many domestic and foreign scholars have been done many researches about the mechanical properties and failure mode of shale. Niandou et al studied the mechanical anisotropy of Tournemire shale through hydrostatic pressure and triaxial compression test, analyzed the plastic deformation and failure modes of shale in detail, and obtained the relationship between elastic parameters and failure modes and confining pressure and dip angle. Valès et al studied the effects of the saturation of Tournemire gas‐bearing shale on mechanical properties through uniaxial and triaxial compression tests. The results showed that the shale mechanical properties were particularly sensitive to shale saturation,Mokhtari et al discussed the characteristics before and after the shale failure through triaxial and acoustic testing, obtained the relationship between residual strength and confining pressure and dip angle after peak failure. Sone & Zoback studied the relationship between elastic modulus, toughness creep behavior, and brittle strength of Barnett, Haynesville, Eagle Ford, and Fort St. John's shale gas reservoirs through series of triaxial tests. The tests showed that the viscoplastic creep strain was approximately linear with the applied differential stress, and the creep tendency was also correlated with the static Young's modulus. Chen et al,^, quantitatively analyzed the mechanical properties of shale through the microindentation test of shale. The results showed that the distribution of meso‐elastic modulus and indentation hardness was uniform, and the meso‐elastic modulus and indentation hardness increase nonlinearly with the increase in filler density. Based on the shale of direct shear test, Heng et al proposed the shear stress concentration coefficient. According to the shear mechanism, the mechanical properties of the bedding plane were studied, and the test results of shear strength anisotropy under different bedding angles were obtained. Gao et al used energy dispersive X‐ray scanning electron microscopy (SEM) to analyze the microstructure and material composition of gas‐bearing shale in Ohio, and through the ultrasonic test analysis, the shale showed obvious anisotropy. Rybacki et al studied the brittleness of black shale with different mineral composition, porosity, and maturity in Europe. The test showed that the deformation behavior of the sample from brittleness to semi‐brittleness changed with the increase in pressure and temperature. Wu et al used RFPA2D‐DIP numerical simulation software to study the impact of microstructure on shale compressive strength and failure mode under different loading directions. The results showed that the mesostructure had an important influence on the compressive strength and failure mode of shale under different loading directions.

With the deepening of shale research, several scholars have been done various researches on the shale permeability characteristics. For example, Dong et al, compared the permeability and porosity of shale and sandstone. The results show that the permeability of shale is more sensitive to effective confining pressure than sandstone, and the permeability and porosity follow a power relationship under effective stress. Chen et al,^, established a model of the relationship between crack permeability and effective stress of gas shale through theoretical derivation, and studied the influence of permeability on model coefficient and crack compressibility. Carey et al used three‐axis torus and X‐ray tomography technique, combined with finite‐discrete element model (FDEM) analysis to study the crack permeability of Utica shale. It is found that the new crack may be the source of permeability when the bedding plane is perpendicular and parallel to the direct shear loading. Wu et al studied the relationship between shale porosity and permeability and effective stress through experiments. The results show that the porosity and permeability of the shale decrease with the increase in effective stress. From the above studies, we can see that the current research on shale mainly focuses on the mechanical properties, failure mode, and permeability characteristics, the research on the fracture mechanism of shale with different bedding dip angle under the coupling of permeability and stress is lacking. But research in this area has had a significant influence on the hydraulic fracturing design of shale production and the deployment of horizontal wells. Therefore, it is necessary to do in‐depth research in this area.

The establishment of fractal dimension theory provides a new theoretical basis for rock fracture and damage analysis. Xie. applied fractal geometry to rock damage mechanics and made breakthroughs, and found that the fracture and damage processes of rock have fractal characteristics. Kusunose et al conducted triaxial compression tests on two different granitic granodiorite, Inada and Oshima, and discussed the fractal dimension of the acoustic emission spatial distribution. It was found that the rock particles can affect the spatial distribution and expansion of microcrack. Xie et al analyzed the fractal characteristics of the spatial distribution of acoustic emission during rock damage and failure, and obtained the fractal dimension value to reflect the failure state of the rock. Zhang et al analyzed the fractal dimension of the acoustic emission time series generated by the shale formation microcrack by the Brazilian splitting test. It was found that the fractal dimension can reflect the formation and expansion of the microcrack. From the above research, fractal theory plays an important role in the study of rock failure and damage.

In this paper, the shale core of Niutitang formation of Lower Cambrian in Fenggang block is taken as the research object. The numerical model of shale with different bedding angles is established by using RFPA2D‐Flow, and to conduct numerical simulation of shale percolation‐stress coupling under fixed osmotic pressure. The change of elastic modulus, compressive strength, and failure mode of shale with different bedding angles under fixed osmotic pressure were studied. In addition, we also carried out the fractal dimension calculation and analysis of the acoustic hair color image and analyzed the relationship between the shale failure mode and the fractal dimension. The research results will provide an important reference for the optimization of fracturing design schemes in shale hydraulic fracturing.

The shale gas exploration area in northern Guizhou is the most abundant shale gas reserves in Yunnan‐Guizhou‐Guangxi Delta and the Fenggang No. 3 block is the main component of shale gas exploration area in northern Guizhou. The study area of Fenggang No. 3 block is located in Fenggang and Meitan counties in the central part of the northern Guizhou region. It covers an area of 1167 square kilometers and has a thicker shale gas reservoir. As shown in Figure , the study area is located in the southern section of Wuling structural belt, where SN‐, NNE‐, and NE‐trending faults and folds are developed and superimposed. The compressive structural planes along SN‐, NE‐, and NNE‐trending fold axes and thrust sections constitute the main structural framework of the study area. The folds and faults are generally developed in the study area. The folds are dominated by NE‐trending and NNE‐trending “trough‐like” structures, and a series of NE‐trending composite anticlines and synclines are developed. The main faults are torsional faults in NNE‐trending and NE‐trending, and several strike faults interlace each other. Among these tectonic tracks, the SN‐trending tectonic belts were formed the earliest, the NE‐trending tectonic belts were formed the latest, and the formation time of the NNE‐trending tectonic belts was between the two.

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Regional tectonic locations of Feng'gang No. 3 block (a) Tectonic map of northern guizhou region. (b) Location of the study area. Maps show the elementary structural features of the Feng'gang No. 3 block. (c) Tectonic cross‐section of the location shown in (b)

The stratigraphic division of Meitan‐Fenggang area in which the study area is located belongs to South China stratigraphic region, Yangtze stratigraphic region, northern Guizhou‐southern Sichuan region and Zunyi Nanchuan district. Figure is a histogram of the Lower Cambrian lithofacies in northern Guizhou region. According to drilling data and regional outcrops, the strata developed in the study area include Cambrian, Ordovician, Lower‐Middle Silurian, Permian, Triassic, Paleogene and Quaternary strata, and the strata of Upper Silurian, Devonian, Carboniferous, Jurassic, and Cretaceous are missing. According to the data, the Niutitang shale in the study area has no exposed, which is mainly composed of black carbonaceous shale, siliceous shale, and phosphorous siliceous shale, and the reservoir thickness of about 24‐55 m. In early Cambrian Niutitang period, the northern part of the Yangtze platform was an active continental margin, while the southern part was a passive continental margin. At the beginning of Early Cambrian, the whole area of the study area and its surrounding areas sink, and most of them evolved into shelf sedimentary environment. At this time, the sedimentary paleogeomorphology pattern was high in NW and low in SE. From NW to SE, it was composed of ancient land, shore, shallow‐water shelf, deepwater shelf, and slope facies. The deepwater continental shelf generally evolved to shallow‐water continental shelf and tidal flat under the background of rapid Marine advancement and slow Marine retreat forming an inundation unconformity characterized by rapid deepening. As a result, the deepwater facies at the bottom of Niutitang formation directly overlaid the Dengying formation and deposited a set of mud shale formations. Because of sedimentation, there are structural weak planes containing quartz, calcite, and other minerals in the shale, forming carbonaceous shales with weak bedding planes.

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Lithological and stratigraphic system of the study area

The regional structure in the study area belongs to the Upper Yangtze platform, and the process of regional tectonic evolution has undergone several stages of tectonic movement superimposition, including the Snow Peak Movement, Early‐Middle Caledonian Movement, Late Caledonian Movement, Hercynian Movement, Indosinian Movement, Yanshanian Movement, and Himalayan Movement. The structural morphology of Yangtze platform is very complicated due to the superimposition of multi‐stage tectonic deformation. The Yanshanian movement is the most important period affecting the geological structure of the study area. During this period, the Asian plate was subjected to the intense subduction of the Pacific plate, and the research area was subjected to the compression stress field from northwest to southeast, forming a series of folds and fault zones. The Himalayan movement strengthened the fold belt deformation formed in the Yanshanian period. During this period, the whole area experienced the compression stress field from the near east to the west. With the formation of fold zones, shale structures in the study area are different, forming shale reservoirs with structural planes in different directions (Figure ).

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Niutitang Formation shale bedding plane photographs in Fenggang NO. 3 block. (a) The bedding plane is parallel to the horizontal axis. (b) The angle between the bedding plane and the horizontal axis is α

The higher the content of brittle minerals in shale, the more likely it is to produce fractures under pressure. In this paper, 19 shale samples of niutitang formation of Lower Cambrian with different buried depths of well FC‐1 are selected, and XRD whole‐rock diffraction and clay mineral analysis are carried out. The test results are shown in Figure .

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Mineral composition of shale in the study area

As shown in Figure , shale is mainly composed of quartz, potash feldspar, anorthose, calcite, ankerite, pyrite and clay, and the content of quartz ranges from 36% to 92%, with an average of 78%; the content of pyrite ranges from 2% to 25%, with an average content of 7.4%; the content of potash feldspar ranges from 3% to 23%, with an average content of 15%; the content of clay mineral is 2%‐30%, with an average content of 8%. The clay mineral is mainly Illite, with an average content of 87%. It can be seen that the black shale of niutitang formation in this area is dominated by brittle minerals, which make the shale more likely to appear joints in the formation process.

In the multi‐stage tectonic movement, the study area forms shale reservoirs with weak bedding planes in different directions, and the weak structure has an important impact on the mechanical properties of shale, which significantly affects the further exploitation of shale gas in the study area. Therefore, this paper uses FEM software to simulate the seepage‐stress coupling test of weak shale with different bedding, and studies its mechanical properties and failure mode, providing important theoretical support for the development of shale gas exploitation in the research area.

RFPA2D‐Flow numerical simulation software is a real fracture process analysis system based on elastic damage theory and finite element basic theory. It can simulate the permeability evolution law and the seepage‐stress coupling mechanism during crack initiation and expansion, which has been described in detail elsewhere,^,

Analysis of seepage‐stress coupled equations for mesoscopic unit damage evolution

Based on the constitutive relationship of uniaxial tension and compression, Yang et al elaborated the seepage‐stress coupling equation in the elastic damage evolution process of the element under general stress state. When the stress state or strain state of the unit reaches a given deformation threshold, the unit begins to damage. Figure shows the constitutive relation when the mesoscopic element is uniaxially loaded (either compression or tension). Initially, there is no deformation to the unit, and the stress‐strain curve is linear or elastic. When the maximum tensile or compressive strain is reached, the unit undergoes brittle deformation.

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Elastic damage constitutive law of element under uniaxial stress

The constitutive relation of elastic brittleness with residual strength under uniaxial tension is expressed as follows:[Image Omitted. See PDF]

The permeability coefficient K is expressed as.[Image Omitted. See PDF]

In Equations 8 and 9, β is the coupling coefficient; ω is the deformation variable; and f_t is the uniaxial tensile strength. ξ(ξ> 1) is the permeability jump coefficient, which characterizes the increase in the permeability coefficient before and after the unit deformation under the same stress state, it can be obtained by the stress‐strain‐permeability test; f_tr is the residual strength at the initial tensile failure; ɛ_t0 is the tensile strain threshold when the uniaxial stretching criterion (σ₃ ≤ −f_t) is employed. In the uniaxial tensile stress state, ɛ_t0 is obtained by the following formula.[Image Omitted. See PDF]

When the unit uniaxial tensile strain reaches ɛ_t0, the unit begins to failure; meanwhile, ω decreases continuously, and the permeability coefficient is calculated according to (Equation 9); when the maximum tensile principal stress reaches ɛ_tu, it is considered that the unit has completely lost the bearing capacity, the unit is under permanent strain, that is, ω = 1.

According to the Mohr‐coulomb criterion, the constitutive equation under uniaxial compression stress state is[Image Omitted. See PDF]

The expression of permeability coefficient K is[Image Omitted. See PDF]

In Equations 11 and 12, λ′ is the residual strength coefficient, which satisfies the relationship f_t/f_tr = f_c/f_cr = λ′; ɛ_c0 is the maximum pressure principal strain corresponding to the maximum compressive principal stress when reaching its uniaxial compressive strength. In the state of uniaxial compressive stress, ɛ_c0 is calculated by the following formula[Image Omitted. See PDF]

When the uniaxial tensile strain of the unit reaches ɛ_c0, the unit begins to deformation and ω decreases continuously, and the permeability coefficient is calculated according to (Equation 12); when the maximum tensile principal stress reaches ɛ_cu, it is considered that the unit has completely lost the bearing capacity, and the unit is in a completely damaged state.

Through the above analysis, the seepage‐stress coupling constitutive equation and the unit failure evolution constitutive equation are explained in detail. Based on the above equation, RFPA^2D‐Flow software conducts seepage analysis, stress analysis, failure analysis, and coupling analysis of rock failure process. It simulates the entire process of rock failure under seepage‐stress coupling.

RFPA2D‐Flow software discretizes the heterogeneous material. The mechanical properties of the discretized mesoscopic unit are subject to the Weibull statistical distribution law, and the homogeneity coefficient m is used to reflect the uniformity of the material. The larger the m, the more homogeneous the rock; on the contrary, the smaller the m, the less heterogeneous the rock. The unit's elastic modulus E₀, the uniaxial compressive strength σ_c, the Poisson's ratio ν, the pore water pressure coefficient α, and the permeability coefficient K obey the Weibull random distribution.[Image Omitted. See PDF]

In Equation (14), S is E₀ or σ_c or K; S₀ is the average value corresponding to it, and the specific values of the mechanical properties of the sample are shown in Table .

In order to simulate the failure of different bedding shale better, we use different dip angles to obtain different dip bedding shale to establish a numerical model, as is showed in Figure .

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Directional coring diagram of specimens with different bedding orientations (a) directional coring diagram for shale sample preparation and (b) diagram of the angles α (the angle between the bedding planes and the horizontal direction)

The calculation model was built‐in the RFPA^2D‐Flow software. Model height is 100 mm, and the diameter is 50 mm. The model is divided into 200 × 100 units. It is well known that shale has a layered structure plane. Therefore, we consider the shale and its bedding plane in the model establishment, and combine the mechanical parameters in the shale and the layer to establish two media with different mechanical properties to characterize the shale matrix and the weak surface of the layer, which is shown in Figure .

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Diagram of loading of shale at various azimuth angles (P1 is the axial load of the sample, P2 is the confining pressure of the sample, and ∆P = P3−P4 is the osmotic pressure difference)

In this experiment, we establish the shale numerical models with different dip angles of 0°, 15°, 30°, 45°, 60°, 75°, and 90°, as is showed in Figure . The brightness of the element in the model characterizes the element's modulus of elasticity. The brighter the color is, the greater the modulus of elasticity. Conversely, the darker the color is, the lower the modulus of elasticity. The model satisfies the results of coring at different angles to make the research results better in line with the actual situation. In this paper, we simulate the failure mode of shale under osmotic pressure‐stress coupling. The numerical model loading diagram is shown in Figure . And the bottom end of the sample is fixed. First, add a certain axial pressure P₁, the fixed confining pressure P₂ = 10 MPa, and set the osmotic pressure difference (Δ = P₃ − P₄) at the upper and lower ends of the sample, and the osmotic pressure is 4MPa. Then, the whole process is loaded by displacement control. The initial displacement is 0.001mm, and the displacement increment △S = 0.0002 mm.

Through this experiment, the following conclusions can be drawn:

1. The bedding has a significant effect on the compressive strength and modulus of elasticity of the shale. As the bedding angle α increases, the change curve of compressive strength was M‐shaped, showing obvious anisotropy. However, the elastic modulus of shale increased with the increase in bedding inclination α.
2. Due to the influence of the weak cementation of the bedding plane, the shale sedimentary structure, and loading conditions, the bedding plane of different dip angles has different effects on the failure mode of shale and finally show five failure modes, namely V type (0°), inverted V type (15°), multi‐line type (30°), oblique type I (45°, 90°), and oblique N type (60°, 75°).
3. Since the spatial distribution of the acoustic emission point has fractal characteristics, the magnitude of the fractal dimension can reflect the shale failure mode. After the stress level exceeds 50%, the fractal dimension shows a M‐type distribution trend with the increase in the bedding angle. When α = 30°, the maximum is 1.41 699, and the macroscopic crack is multi‐line type; the minimum is α = 45° and α = 90°, the values are 1.286 181 and 1.281 991, respectively, and the macro crack is inclined I. The fractal dimension values of other samples ring from 1.286 181 to 1.41 699, and the failure modes are V type (0°), inverted V type (15°), and oblique N type (60°, 75°). Therefore, the larger the fractal dimension of the acoustic emission point is, the more complicated the corresponding failure mode is; with the stress level increasing, the fractal dimension values of each group of samples increase.
4. The different distribution and groups of shale and the different environment of exploitation will affect the exploitation efficiency of shale gas. In this paper, only the osmotic‐stress coupling test of the Lower Cambrian Niutitang Formation shale in the Fenggang block provides a new idea for studying the physical properties and failure modes of shale, especially in layers with different dip angles. A detailed analysis is made in the influence of the rock failure mode. Subsequent effects of confining pressure, osmotic pressure, and other factors on the strength, failure modes, and fractal characteristics of different inclined bedding shale will be carried out.

This study was supported by the Talent Introduction Project of Guizhou University (Project No. [2017]63), the Cultivation Project of Guizhou University (Project No. [2017]5788‐49), the Guizhou Science and Technology Fund (Project No. [2019]1075 and [2018]1107), the Guizhou Postgraduate Research Fund (YJSCXJH [2019]033), the Project of Special Fund for Science and Technology of Water Resources Department of Guizhou Province (Project No. KT201804), the First‐class Discipline Construction Project in Guizhou Province (Project No. QYNYL[2017]0013), the National Natural Science Foundation of China (Project Nos. 51964007, 51574093, and 51774101), and the High‐Level Innovative Talents Training Project in Guizhou Province (Project No. 2016‐4011).