岩体结构均质区划分的体视学方法研究初探

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Abstract Based on the views of random point process theory and stereological interpretation，the first criterion is proposed to check that the trace midpoint in sampling window is the scope of structural homogeneity zone，which is simulated by the Poisson disc joint model and trace information revealed by sampling window. To check the validity of the first criterion，two examples are simulated by Monte Carlo method and their results are checked by statistical tests. Based on the characteristics of two dimensional Poisson process，the second criterion for the relationship between measuring scale of grid and Poisson point number covered by square grid is derived，which shows fractal characteristics in a specific scale range. Joint distribution density and joint orientation are both considered in the derivation of the formula. The Lyman formula is tested for accuracy by theoretical equations. The detailed implementation steps of the two criteria mentioned above are suggested. To check the validity of the detailed implementation steps，two examples are simulated by Monte Carlo method and their results are checked by statistical tests. Geological survey data of the experimental adit #3 in Jinping hydropower station are used to verify the existence of relationship between measuring scale of grid and Poisson point number；and it is shown that the two criterion is very convenient for engineering applications.

Key words： rock mechanics joint network Poisson disc model stereology interpretation homogeneity zone fractal Monte Carlo method

Received: 14 February 2011

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https://rockmech.whrsm.ac.cn/EN/Y2011/V30/I6/1239

[1] MILLER S M. A Statistical method to evaluate homogeneity of structural populations[J]. Mathematical Geology，1983，15(2)：317–328. [2] KULATILAKE P H S W，CHEN J，TENG J，et al. Discontinuity geometry characterization in a tunnel close to the proposed permanent shiplock area of the Three Gorges dam site in China[J]. International Journal of Rock Mechanics and Mining Sciences and Geomechanics Abstracts，1996，33(3)：255–277. [3] KULATILAKE P H S W，FIEDLER R，PANDA B B. Box fractal dimension as a measure of statistical homogeneity of jointed rock masses[J]. Engineering Geology，1997，48(3/4)：217–229. [4] 范留明，黄润秋，丁秀美. 一种基于结构面密度的岩体结构均质区划分方法[J]. 岩石力学与工程学报，2003，22(7)：1 132–1 136.(FAN Liuming，HUANG Runqiu，DING Xiumei. Analysis of structural homogeneity of rock mass based on discontinuity density[J]. Chinese Journal of Rock Mechanics and Engineering，2003，22(7)：1 132–1 136. (in Chinese)) [5] 刘国权. 关于体视学的定义、用途和方法学基本要素[J]. 中国体视学与图像分析，2001，6(1)：1–5.(LIU Guoquan. On the definition，application and methodology components of stereology[J]. Chinese Journal of Stereology and Image Analysis，2001，6(1)：1–5.(in Chinese)) [6] WARBURTON P M. A stereological interpretation of joint trace data[J]. International Journal of Rock Mechanics and Mining Sciences and Geomechanics Abstracts，1980，17(4)：181–190. [7] 邓之录，梁之舜. 随机点过程及其应用[M]. 北京：科学出版社，1998：36–37.(DENG Zhilu，LIANG Zhishun. Stochastic point process and its application[M]. Beijing：Science Press，1998：36–37.(in Chinese)) [8] 于青春，薛果夫，陈德基. 裂隙岩体一般块体理论[M]. 北京：中国水利水电出版社，2007：65–70.(YU Qingchun，XUE Guofu，CHEN Deji. General block theory of fractured rock mass[M]. Beijing：China Water Power Press，2007：65–70.(in Chinese)) [9] 刘晓丽，王恩志，王思敬，等. 裂隙岩体表征方法及岩体水力学特性研究[J]. 岩石力学与工程学报，2008，27(9)：1 814–1 822.(LIU Xiaoli，WANG Enzhi，WANG Sijing，et al. Representation method of fractured rock mass and its hydraulic properties study[J]. Chinese Journal of Rock Mechanics and Engineering，2008，27(9)：1 814–1 822. (in Chinese)) [10] BAECHER G B，LANNEY N A，EINSTEIN H H. Statistical description of rock properties and sampling[C]// Proceedings of the 18th U.S. Symposium on Rock Mechanics. Colorado，USA：[s. n.]，1977：1–8. [11] ROBERTSON A. The interpretation of geologic factors for use in slope theory[C]// Proceedings of Symposium on the Theoretical Background to the Planning of Open Pit Mines. Johannesburg，South Africa：[s. n.]，1970：55–71. [12] BARTON C M. Geotechnical analysis of rock structure and fabric in the CSA mine，Cobar，New South Wales[C]// Division of Applied Geomechanics Technical Paper：No 24. Melbourne：Common Wealth Scientific and Industrial Research Organization，1977：29–30. [13] DERSHOWITZ W S，EINSTEIN H H. Characterizing rock joint geometry with joint system models[J]. Rock Mechanics and Rock Engineering，1988，21(1)：21–51. [14] ROSS S M. 统计模拟[M]. 4版. 王兆军，陈广雷，邹长亮，译. 北京：人民邮电出版社，2007：67–69.(ROSS S M. Statistical simulation[M]. 4th ed. Translated by WANG Zhaojun，CHEN Guanglei，ZOU Changliang. Beijing：People?s Posts and Telecom Press，2007：67–69.(in Chinese)) [15] 张湘伟，何正友. 二维泊松过程的数值模拟及其在道路模型中的应用[J]. 重庆大学学报：自然科学版，1994，17(4)：12–16.(ZHANG Xiangwei，HE Zhengyou. A numerical simulation of two dimensional Poisson process and its application in an uneven road model[J]. Journal of Chongqing University：Natural Science，1994，17(4)：12–16.(in Chinese)) [16] 刘瑞元，张智霞. 二项分布与泊松分布判别的假设检验[J]. 青海大学学报：自然科学版，2008，26(1)：44–47.(LIU Ruiyuan，ZHANG Zhixia. Hypothesis test on the judgments on binomial distribution and Poisson distribution[J]. Journal of Qinghai University：Nature Science，2008，26(1)：44–47.(in Chinese)) [17] MAULDON M. Estimating mean fracture trace length and density from observations in convex windows[J]. Rock Mechanics and Rock Engineering，1998，31(4)：201–216. [18] KULATILAKE P H S W，WU T H. Estimation of mean trace length of discontinuities[J]. Rock Mechanics and Rock Engineering，1984，17(4)：215–232. [19] ZHANG L，EINSTEIN H H. Estimating the mean trace length of rock discontinuities[J]. Rock Mechanics and Rock Engineering，1998，31(4)：217–235. [20] SONG J J，LEE C I. Estimation of joint length distribution using window sampling[J]. International Journal of Rock Mechanics and Mining Sciences，2001，38(4)：519–528. [21] 谢和平. 分形–岩石力学导论[M]. 北京：科学出版社，1997：134–137.(XIE Heping. Introduction to fractal and rock mechanics[M]. Beijing：Science Press，1997：134–137.(in Chinese)) [22] 刘建国，彭功勋，韩文峰. 岩体裂隙网络的分形特征[J]. 兰州大学学报：自然科学版，2000，36(4)：96–99.(LIU Jianguo，PENG Gongxun，HAN Wenfeng. Fractal characteristics of fracture network in rock mass[J]. Journal of Lanzhou University：Natural Science，2000，36(4)：96–99.(in Chinese)) [23] LYMAN G J. Stereological and other methods applied to rock joint size estimation–does Crofton?s theorem apply[J]. Mathmatical Geology，2003，35(1)：9–23.