Influence of Joint Geometrical Parameters on Mechanical Properties of Rock Mass
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摘要: 岩体作为由完整岩块和节理组成的离散介质,其力学行为主要取决于节理的几何和力学特征,探明节理对岩体力学行为的影响具有重要的学术价值和工程意义。利用PFC2D软件,建立了人工合成岩体模型(SRM),研究了单轴压缩条件下节理几何参数对岩体力学强度指标和破坏模式等岩体力学特征的影响。通过正交实验分析,探讨了各节理几何参数对岩体强度指标的显著性影响。结果表明:当节理倾角为10°~50°时,节理长度、节理倾角、节理间距以及岩桥长度对岩体单轴压缩强度和弹性模量具有显著影响;当节理倾角为50°~90°时,岩桥长度对岩体单轴压缩强度和弹性模量的影响不明显;节理阶梯角在整个节理倾角范围内对岩体的单轴压缩强度和弹性模量没有显著影响。岩体破坏模式主要受节理倾角和节理阶梯角影响。研究结果可为岩体工程稳定性分析及支护方案设计提供借鉴。Abstract: Rock mass is a discontinuous medium composed of intact rock and joints, whose mechanical properties are mainly determined by the geometrical and mechanical characteristics of joint. It is significantly valuable to explore the influence of joint on the mechanical behaviors of rock mass. In this paper, a synthetic rock mass model (SRM) is established by PFC2D software at first. Then the influence of joint geometrical parameters on rock mass mechanical properties, such as the strength indices and failure modes under uniaxial compression are studied. Through the orthogonal experimental analysis, the influence of the joint geometrical parameter on the strength index of rock mass is discussed. The analysis results show that when the joint dip angle is between 10° and 50°, the joint length, dip angle, spacing and rock bridge length have significant effect on the uniaxial compressive strength and elastic modulus of rock mass. When the joint dip angle is between 50° and 90°, the influence of the rock bridge length on the uniaxial compressive strength and elastic modulus of rock mass is not significant. The joint step angle has no significant influence on the uniaxial compressive strength and elastic modulus of rock mass no matter how much the joint dip angle is. The failure mode of rock mass is mainly affected by the joint dip angle and step angle. The research results provide valuable reference for the stability analysis of rock mass and the support design.
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图 4 节理倾角对岩体强度指标的影响
Figure 4. Influence of joint dip angle on strength indices of rock mass
图 5 节理倾角对岩体破坏模式的影响(红色为受拉伸破坏裂纹,蓝色为受剪切破坏裂纹)
Figure 5. Influence of joint dip angle on failure mode of rock mass (The red denotes the tensile failure and the blue denotes the shear failure)
图 6 节理阶梯角对岩体强度指标的影响
Figure 6. Influence of joint step angle on strength indices of rock mass
图 7 节理阶梯角对岩体破坏模式的影响(
$ \gamma $ = 90°)Figure 7. Influence of joint step angle on failure mode of rock mass (
$ \gamma $ = 90°)
图 8 节理长度对岩体强度指标的影响
Figure 8. Influence of joint length on strength indices of rock mass
图 9 节理长度对岩体破坏模式的影响(
$ {L}_{\rm{j}}=20\;{\rm{mm}} $ )Figure 9. Influence of joint length on failure mode of rock mass (
$ {L}_{\rm{j}}=20\;{\rm{mm}} $ )
图 10 岩桥长度对岩体强度指标的影响
Figure 10. Influence of rock bridge length on strength indices of rock mass
图 11 岩桥长度对岩体破坏模式的影响(
$ {L}_{\rm{r}}=40\;{\rm{mm}} $ )Figure 11. Influence of rock bridge length on failure mode of rock mass (
$ {L}_{\rm{r}}=40\;{\rm{mm}} $ )
图 12 节理间距对岩体强度指标的影响
Figure 12. Influence of joint spacing on strength indices of rock mass
图 13 节理间距对岩体破坏模式的影响(
$ d=40\;{\rm{mm}} $ )Figure 13. Influence of joint spacing on failure mode of jointed rock mass (
$ d=40\;{\rm{mm}} $ )
图 15 不同尺寸完整岩体和节理岩体的力学强度指标
Figure 15. Mechanical strength indices of intact and jointed rock mass in different sizes
表 1 颗粒和平直节理模型的细观参数
Table 1. Meso parameters of particle and flat-joint model
$\,\rho /$
(g·${\rm{cm} }{^{-3}}$)${R}{_{\rm{min} } }/{\rm{mm} }$ ${R}{_{\rm{max} }}/{R}{_{\rm{min} }}$ ${\overline {E} }{_{\rm{c} }}/$GPa ${\sigma }{_{\rm{c} }}/$MPa $ c/ $MPa ${\overline {k} }{^{\rm{n} }}/{\overline {k} }{^{\rm{s} } }$ $ \overline {\mu } $ $ \overline {\varphi } $/(°) 2.1 1.5 1.5 2.31 1.52 ± 0.38 1.52 ± 0.38 2.5 0.38 20 
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表 2 数值模型和实际物理模型的宏观参数对比
Table 2. Comparison of macro parameters between numerical and physical model
Method ${\sigma }{_{\rm{u} }}$/MPa E/GPa $ \nu $ Numerical 3.88 2.42 0.15 Experimental[17] 3.84 2.40 Relative error/% 1.04 0.83
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表 3 光滑节理模型的宏观参数标定值和物理实验值对比
Table 3. Comparison between the calibrated and the tested macro parameters for smooth-joint model
Method ${\overline {\mu } }{_{\rm{j} }}$ ${k}{_{ {\rm{n} }{\rm{j} } }}$/(GPa·m−1) ${k}{_{ {\rm{s} }{\rm{j} } }}$/(GPa·m−1) Numerical 0.65 1.64 22.04 Experimental[17] 0.65 1.60 22.00 Relative error/% 0 2.50 0.18
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表 4 因数水平表
Table 4. Factor level table
Joint geometrical parameters Factor levels 1 2 3 4 5 $\,\beta /$(°) 10(50) 20(60) 30(70) 40(80) 50(90) ${L}{_{\rm{j} }}/{\rm{mm} }$ 10 20 30 40 50 ${L}{_{\rm{r} }}/{\rm{mm} }$ 10 20 30 40 50 $ d/{\rm{mm}} $ 10 20 30 40 50 $ \gamma / $(°) 60 75 90 105 120
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表 5 实验设计及结果(
$ \,\beta $ 为10°~50°)Table 5. Experimental design and results (
$ \,\beta $ : 10°–50°)No. $\,\beta /\left(^{\circ }\right)$ ${L}{_{\rm{j} }}/{\rm{mm} }$ ${L}{_{\rm{r} }}/{\rm{mm} }$ $ d/{\rm{mm}} $ $\gamma /\left(^{\circ }\right)$ m ${\sigma }{_{\rm{u} }}$/MPa E/GPa $ \nu $ 1 10 10 10 10 60 1 2.91 2.07 0.200 2 10 20 30 40 120 2 3.72 2.29 0.158 3 10 30 50 20 105 3 3.28 2.20 0.163 4 10 40 20 50 90 4 2.71 2.22 0.163 5 10 50 40 30 75 5 2.64 2.17 0.175 6 20 10 50 40 90 5 3.76 2.32 0.153 7 20 20 20 20 75 1 2.28 2.11 0.175 8 20 30 40 50 60 2 2.79 2.16 0.164 9 20 40 10 30 120 3 1.06 1.64 0.222 10 20 50 30 10 105 4 0.88 1.14 0.080 11 30 10 40 20 120 4 3.65 2.24 0.153 12 30 20 10 50 105 5 1.99 2.00 0.175 13 30 30 30 30 90 1 1.96 1.91 0.164 14 30 40 50 10 75 2 0.76 1.12 0.222 15 30 50 20 40 60 3 0.95 1.56 0.080 16 40 10 30 50 75 3 3.49 2.27 0.153 17 40 20 50 30 60 4 2.14 1.99 0.164 18 40 30 20 10 120 5 0.69 0.75 0.151 19 40 40 40 40 105 1 1.92 1.03 0.131 20 40 50 10 20 90 2 0.54 0.67 0.224 21 50 10 20 30 105 2 2.93 2.09 0.153 22 50 20 40 10 90 3 1.00 1.36 0.172 23 50 30 10 40 75 4 1.53 1.42 0.065 24 50 40 30 20 60 5 1.06 1.20 0.168 25 50 50 50 50 120 1 1.10 1.53 0.231
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表 6 实验设计及结果(
$ \,\beta $ 为50°~90°)Table 6. Experimental design and results (
$ \,\beta $ : 50°–90°)No. $\,\beta /\left(^{\circ }\right)$ ${L}{_{\rm{j} } }/{\rm{mm} }$ ${L}{_{\rm{r} }}/{\rm{mm} }$ $ d/{\rm{mm}} $ $ \gamma /\left(^{\circ }\right) $ m ${\sigma }{_{\rm{u} }}$/MPa E/GPa $ \nu $ 1 50 10 10 10 60 1 1.66 1.53 0.165 2 50 20 30 40 120 2 2.42 1.97 0.155 3 50 30 50 20 105 3 1.01 1.55 0.124 4 50 40 20 50 90 4 1.87 1.59 0.164 5 50 50 40 30 75 5 1.03 1.14 0.148 6 60 10 50 40 90 5 3.36 2.24 0.150 7 60 20 20 20 75 1 2.03 1.54 0.116 8 60 30 40 50 60 2 1.54 1.82 0.220 9 60 40 10 30 120 3 0.79 1.03 0.188 10 60 50 30 10 105 4 0.32 0.35 0.276 11 70 10 40 20 120 4 2.54 2.05 0.141 12 70 20 10 50 105 5 2.58 1.73 0.141 13 70 30 30 30 90 1 1.64 1.52 0.115 14 70 40 50 10 75 2 1.74 0.62 0.110 15 70 50 20 40 60 3 1.56 1.24 0.113 16 80 10 30 50 75 3 3.74 2.21 0.146 17 80 20 50 30 60 4 2.74 1.95 0.134 18 80 30 20 10 120 5 1.47 0.53 0.078 19 80 40 40 40 105 1 2.59 1.58 0.123 20 80 50 10 20 90 2 2.19 0.68 0.101 21 90 10 20 30 105 2 2.94 2.05 0.141 22 90 20 40 10 90 3 2.15 1.12 0.083 23 90 30 10 40 75 4 2.70 1.44 0.106 24 90 40 30 20 60 5 2.31 1.10 0.081 25 90 50 50 50 120 1 2.53 1.77 0.125
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表 7 节理参数对岩体力学特征影响的显著性分析
Table 7. Significance analysis of joint parameter effect on mechanical properties of rock mass
Factor 10° ≤ $\, \beta $< 50° 50° ≤ $\, \beta $ ≤ 90° ${F}{_{ {\sigma }_{\rm u} }}$ ${F}{_{E}}$ ${F}{_{\nu }}$ ${F}{_{ {\sigma }_{\rm u} }}$ ${F}{_{E}}$ ${F}{_{\nu }}$ $\,\beta$ 40.69** 25.98** 0.06 13.43* 0.51 4.03 ${L}{_{\rm{j} }}$ 77.84** 27.42** 0.40 18.48** 17.39** 0.55 Lr 11.28* 2.67 0.63 1.05 2.03 0.67 $ d $ 26.04** 20.87** 1.11 11.95* 16.65** 1.13 $ \gamma $ 1.10 0.96 0.47 1.84 0.21 0.73 Note: Superscript “*” and “**” represent significant and extremely significant, respectively.
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表 8 节理几何参数与岩体力学特征之间的回归方程
Table 8. Regression equations between joint geometrical parameters and rock mass mechanical properties
$\,\beta$/(°) Fitting formula ${R}{^{2} }$ 10−50 ${\sigma }{_{\rm{u} }}$ = 3.257 − 0.345$ {\,\beta' } $ − 0.498${L'}{_{\rm{j} } }$ + 0.169${L'}{_{\rm{r} }}$ + 0.255$ {d'} $ + 0.021$ {\gamma '} $ 0.841 E = 2.386 − 0.187$ {\,\beta '} $ − 0.208${L'}{_{\rm{j} } }$ + 0.059${L'}{_{\rm{r} } }$ + 0.154$ {d'} $ − 0.034$ {\gamma '} $ 0.818 50−90 ${\sigma }{_{\rm{u} }}$ = 2.103 + 0.017${\,\beta '}$ − 0.455${L'}{_{\rm{j} } }$ + 0.093${L'}{_{\rm{r} } }$ + 0.289$ {d'} $ − 0.067$ {\gamma '} $ 0.799 E = 1.598 − 0.015${\,\beta '}$ − 0.269${L'}{_{\rm{j} } }$ + 0.064${L'}{_{\rm{r} } }$ + 0.189$ {d'} $ − 0.020$ {\gamma '} $ 0.891 Note: The units of ${\sigma }{_{\rm{u} }}$ and E are MPa and GPa, respectively.
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