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The Theory of Strata Mechanics PDF

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Further Titles in The Series: 1. G. SANGLERAT — THE PENETROMETER AND SOIL EXPLORATION 2. Q. ZARUBA AND V. MENCL—LANDSLIDES AND THEIR CONTROL 3. Ε. E. WAHLSTROM —TUNNELING IN ROCK 4. R. SILVESTER —COASTAL ENGINEERING, 1 and 2 5. R. N. YOUNG AND B. P. WARKENTIN — SOIL PROPERTIES AND BEHAVIOUR 6. Ε. E. WAHLSTROM — DAMS, DAM FOUNDATIONS, AND RESERVOIR SITES 7. W. F. CHEN — LIMIT ANALYSIS AND SOIL PLASTICITY 8. L. N. PERSEN — ROCK DYNAMICS AND GEOPHYSICAL EXPLORATION Introduction to Stress Waves in Rocks 9. M. D. GIDIGASU — LATERITE SOIL ENGINEERING 10. Q. ZARUBA AND V. MENCL —ENGINEERING GEOLOGY 11. Η. K. GUPTA AND Β. K. RASTOGI —DAMS AND EARTHQUAKES 12. F. H. CHEN — FOUNDATIONS ON EXPANSIVE SOILS 13. L. HOBST AND J. ZAjiC — ANCHORING IN ROCK 14. B. VOIGHT (Editor) — ROCKSLIDES AND AVALANCHES, 1 and 2 15. C. LOMNITZ AND E. ROSENBLUETH (Editors) — SEISMIC RISK AND ENGINEERING DECISIONS 16. C. A. BAAR —APPLIED SALT-ROCK MECHANICS, 1 The tn-Situ Behaviour of Salt Rocks 17. A. P. S. SELVADURAI — ELASTIC ANALYSIS OF SOIL-FOUNDATION INTERACTION 18. J. FEDA —STRESS IN SUBSOIL AND METHODS OF FINAL SETTLEMENT CALCULATION 19.A . K&ZDI — STABILIZED EARTH ROADS 20. E. W. BRAND AND R. P. BRENNER (Editors) — SOFT-CLAY ENGINEERING 21. A. MYSLIVEC AND Z. KYSELA —THE BEARING CAPACITY OF BUILDING FOUNDATIONS 22. R. N. CHOWDHURY — SLOPE ANALYSIS 23. P. BRUUN — STABILITY OF TIDAL INLETS Theory and Engineering 24. Ζ. ΒΑΖΑΜΕ —METHODS OF FOUNDATION ENGINEERING 25.A . KiZDI — SOIL PHYSICS Selected Topics 26. H. L. JESSBERGER (Editor) — GROUND FREEZING 27. D. STEPHENSON — ROCKFILL IN HYDRAULIC ENGINEERING 28. P. E. FRIVIK, N. JANBU, R. SAETERSDAL AND L. I. FINBORUD (Editors) — GROUND FREEZING 1980 29. P. PETER —CANALS AND RIVER LEVIES 30. J. FEDA—MECHANICS OF PARTICULATE MATERIALS THE PRINCIPLES 31. Q. ZARUBA AND V. MENCL—LANDSLIDES AND THEIR CONTROL Second, completely revised edition 32. I. W. FARMER (Editors) — STRATA MECHANICS 33. L. HOBST AND J. ZAJIC — ANACHORING IN ROCK AND SOIL Second, completely revised edition 34. G. SANGLERAT, G. OLIVARI AND B. CAMBOU — PRACTICAL PROBLEMS IN SOIL MECHANICS AND FOUNDATION ENGINEERING, 1 and 2 35. L. R£mAT I — GROUNDWATER IN CIVIL ENGINEERING 36. S. S. VYALOV — RHEOLOGICAL FUNDAMENTALS OF SOIL MECHANICS 37. P. BRUUN (Editor) — DESIGN AND CONSTRUCTION OF MOUNDS FOR BREAKWATERS AND COASTAL PROTECTION 38. W. K. CHEN AND G. Y. BALADI — SOIL PLASTICITY Theory and Implementation (continued on p. 279) 39. Ε. Τ. HAN RAH ΑΝ — THE GEOTECHNICS OF REAL MATERIALS The e e Method gt k 40. J. ALDORF AND K. EXNER —MINE OPENINGS Stability and Support 41. J. E. GILLOT — CLAY IN ENGINEERING GEOLOGY 42. A. S. CAKMAK (Editor) — SOIL DYNAMICS AND LIQUEFACTION 43. A. S. CAKMAK (Editor) — SOIL-STRUCTURE INTERACTION 44. A. S. CAKMAK (Editor) — GROUND MOTION AND ENGINEERING SEISMOLOGY 45. A. S. CAKMAK (Editor) — STRUCTURES, UNDERGROUND STRUCTURES, DAMS AND STOCHASTIC METHODS 46. L. RliTHATI — PROBABILISTIC SOLUTIONS IN GEOTECHNICS 47. Β. M. DAS —THEORETICAL FOUNDATION ENGINEERING 48. W. DERSKI, R. IZBICKI, I. KISIEL AND Z. MROZ — ROCK AND SOIL MECHANICS 49. T. ARIMAN, H. HAMADA, A. C. SINGHAL, M. A. HAROUN AND A. S. CAKMAK (Editors) — RECENT ADVANCES IN LIFELINE EARTHQUAKE ENGINEERING 50. Β. M. DAS —EARTH ANCHORS 51. K. THIEL—ROCK MECHANICS IN HYDROENGINEERING 52. W. F. CHEN AND X. L. LIU —LIMIT ANALYSIS IN SOIL MECHANICS Second, completely revised edition 53. W. F. CHEN AND E. MIZUNO — NONLINEAR ANALYSIS IN SOIL MECHANICS 54. F. H. CHEN —FOUNDATIONS ON EXPANSIVE SOILS Second, completely revised edition 55. J. VERFEL —ROCK GROUTING AND DIAPHRAGM WALL CONSTRUCTION 56. B.N. WHITTAKER AND D.J. REDDISH— SUBSIDENCE Occurrence, Prediction and Control 57. E. NONVEILLER —GROUTING Theory and Practice 58. V. KOLAR AND I. Ν EM EC — MODELLING OF SOIL-STRUCTURE INTERACTION 59A. R.S. SINHA —UNDERGROUND STRUCTURES Design and Instrumentation 59B. R.S. SINHA AND L. OZDEMIR — UNDERGROUND STRUCTURES Instrumentation and Constructions 60. R. L. HARLAN, Κ. E. KOLM AND E. D. GUTENTAG — WATER-WELL DESIGN AND CONSTRUCTION 61. I. KAZDA —FINITE ELEMENT TECHNIQUES IN GROUNDWATER FLOW STUDIES with applications in hydraulic and geotechnical engineering 62. L. FIALOVSZKY —SURVEYING INSTRUMENTS AND THEIR OPERATIONAL PRINCIPLES 63. H. GIL —THE THEORY OF STRATA MECHANICS DEVELOPMENTS IN GEOTECHNICAL ENGINEERING VOL. 63 THE THEORY OF STRATA MECHANICS by HENRYK GIL Silesian Technical University Gliwice, Poland ELSEVIER Amsterdam-Oxford-New York-Tokyo PWN —POLISH SCIENTIFIC PUBLISHERS Warsaw 1991 Translated from the Polish by Jolanta Krauze Distribution of this book is being handled by the following publishers: For the U.S.A. and Canada ELSEVIER SCIENCE PUBLISHING CO., INC. 655 Avenue of the Americas, New York, NY 10010 For Albania, Bulgaria, Cuba, Czechoslovakia, Hungary, Korean People's Democratic Republic, Mongolia, People's Republic of China, Poland, Romania, the U.S.S.R., Vietnam and Yugoslavia ARS POLONA Krakowskie Przedmiescie 7, 00-068 Warszawa, Poland For all remaining areas ELSEVIER SCIENCE PUBLISHERS B.V. 25 Sara Burgerhartstraat, P.O. Box 211, 1000 AE Amsterdam, The Netherlands Library of Congress Cataloging-in-Publication Data Gil, Henryk. 1933- The theory of strata mechanics / by Henryk Gil: [translated by Jolanta Krauze]. p. cm. — (Developments in geotechnical engineering: vol. 63) Includes bibliographical references. ISBN 0-444-98761-4 (U.S.) 1. Mining engineering. 2. Rock mechanics. I. Series: Developments in geotechnical engineering: 63. TO153.G49 1990 622'.2—dc20 90-31420 CIP ISBN 0-444-98761-4 (Vol. 63) ISBN 0-444-41662-5 (Series) Copyright (g) by PWN—Polish Scientific Publishers—Warszawa, 1991 All rightsr eserved. No part of this publication may be reproduced, stored in retrieval system or transmitted in any form or by any means, electronic, mechanical, photocopying, recording or otherwise, without the prior written permission of the copyright owner Printed in Poland Introduction 0.1 Development of rock mass mechanics During the last thirty years, the increasing need for extracting coal from new mining fields, especially from unmined protective pillars and seams that are threatened with rock bursts and rock-gas eruptions, has accelerated the development of research in the fundamental mining discipline known as rock mass mechanics or geomechanics. The importance of methods developed by rock mass mechanics is still growing because the depths at which mining is carried out nowadays increase, and this is associated with increased stresses and increased mining hazards. Moreover, at greater depths it is more difficult to maintain the transportation and mining drifts in continuous operation. Generally, rock mass mechanics is concerned with rock mass movements and with the phenomena accompanying them. The rock mass surrounding an excavation moves towards it, causing the rocks to deform and altering the primary stress state that existed when the rock mass was undisturbed. The strain and stress state produced by mining also depends essentially on the physical properties of the rocks. For this reason, in modern rock mass mech anics, the methods for evaluating the physical properties of rocks from the point of view of mining engineering are considered to be most important. Extensive theoretical, laboratory, and in-situ investigations carried out in many countries (including Poland), where coal production has been greatly developed, have resulted in considerable achievements in the field of rock mass mechanics. It is impossible to include all these achievements in a single monograph, and therefore in the present book the author has attempted to construct a synthetic mathematical description of the rock mass movements and of the strain and stress state induced by mining, in particular when extract ing mineral deposits. Studying the available literature on the subject, we can distinguish three major trends in the development of rock mass mechanics: 2 INTRODUCTION — The first approach, based on empirical investigations (carried out by Dumont, Goldreich, Szulz, Sparry, Hausse, Banneax, Thririart, and others), has developed integral-geometrical theories which using in-situ measurements of the profile of the so-called subsidence trough represent this profile by approxi mative integral functions. The required accuracy of this approximation can be achieved by appropriately assuming the form of the influence function which occurs as the kernel of the integral. This approach is represented by Bals (1931/1932), Beyer (1945), Brauner (1959), Flaschentrager (1938), Kein- horst (1925), Kuothe (1953), King and Whetton (1957), Kochmanski (1956), Perz (1948), and others. Their results have found wide practical applications in mining works carried out in protective pillars and in studying effects that this mining exerts upon the ground surface. — The second approach was initiated by Litwiniszyn (1953) who by com bining the Avershin hypothesis with the parabolic form of the continuity equation obtained a solution consistent with the Rnothe integral solution that involves the Gauss function. This inspired Litwiniszyn with the idea that a rock mass set in motion can be treated as a medium governed by certain rules of the probability calculus. As the model of the rock mass, he adopted a granular medium composed of isolated elements which, when in motion, may lose contact between one another. To describe movements of the grains of this granular medium placed in the gravity field and unbalanced, and the random movements of the voids formed when a certain number of the grains have been removed from the medium, Litwiniszyn used the probabilistic methods. Assuming that the displacement components are random variables dependent on a parameter, he has shown that the development of subsidences in a rock mass is a stochastic process. Litwiniszyn has created what is known as the kinetics of a stochastic medium, which may be modelled by a granular medium (Litwiniszyn, 1954, 1956, 1961). A movement of such a medium is governed by the "transition function". In a two-dimensional case (Litwiniszyn, 1956) this function satisfies an integral equation, analogous to Smoluchowski's equation known in the theory of diffusion and stochastic processes. In their several works Litwiniszyn and Smolarski (1962, 1964) and Smolarski (1967) have determined all the components of the displacement field induced in a sto chastic medium. They have shown that the transition functions satisfy a set of integral equations equivalent to Smoluchowski's equations. To find certain classes of solutions of this set, Litwiniszyn uses the Fourier transforms and shows that the set of integral equations can be reduced to a set of functional equations. Smolarski makes use of Kolmogorov's method for the solution of a single Smoluchowski equation and derives a set of second order partial differential equations whose integrals satisfy the set of Smoluchowski equa- DEVELOPMENT OF ROCK MASS MECHANICS 3 tions. Based on the equations of the stochastic model, Litwiniszyn (1956), Smolarski (1964) and also other investigators (Brauner, 1959; Klein, 1973, 1978; Ryncarz, 1968; Trutwin, 1962) solved several boundary value problems important for engineering practice. — The third approach uses the methods of the mechanics of continuous media, especially those of elasticity, viscoelasticfty, and plasticity. The state equations derived for an adopted model of the rock mass and describing the relations between stresses, strains and the rate of their variation, in conjunction with the equations of equilibrium subjected to assumed initial and boundary conditions, enable us to find not only the components of the displacement vector and of the strain tensor, but also those of the stress tensor. The fundamental assumptions underlying several solutions thus far ob tained using the continuous model are those of continuity, homogeneity, and isotropy of the rock mass which, in view of the well-known complexity of rock masses are far-fetched idealizations. Nevertheless, these solutions are very important since based on them we can examine the structure (e.g., strati fied) and the character (e.g., elasticoplastic) of deformation of more complex rock masses. In Poland, significant contributions to the development of this line of research were made by Salustowicz (1955, 1956) who determined the distribu tion of stress and displacement around drifts and mining excavations. Berry (1964), Barenblatt and Khrystyanovich (1955), Gerard and Harisson (1970), Dymek (1967, 1969), Golecki and Jozkiewicz (1963), Gupta (1967), Lisowski (1957), Mirsa and Sen (1976), Sales and Berry (1962), Salomon (1965), Szefer (1964, 1965), and other investigators used the elastic model of the rock mass in considering the distributions of stress and displacement. The visco-elastic model was first used for examining the movements of rock masses by Salustowicz (1958) and Litwiniszyn (1955), and later by Mar shall and Berry (1968) and others. In Poland, later studies based chiefly on the "standard" model were conducted by Filcek (1963), Gil and Kraj (1972, 1974), Krzyzowski (1976), Jaworski (1979), Dymek (1973, 1976), Zaj^c (1971), and Szefer (1964). Z. Yerzhanov applied the phenomenological theory of hereditary creep to studies on rocks. In this case, the state equation is the Boltzmann-Volterra inte gral equation with the kernel of Rabotnov's type, the constants that characterize the kernel being determined from a creep test. This model has mainly been applied to problems associated with the construction of underground structures. Elastic-plastic and pure plastic models have also been used, based on the known works of Ilyushin (1948, 1978), Sokolovski (1969), Kachnov (1969, 1974), Khrystyanovich and Shemyakin (1967), and others. These models also 4 INTRODUCTION include failure of the rocks surrounding the contour of an excavation (Ruppe- neit, 1954; Ruppeneit and Liberman, 1960; Iiberman, 1962, 1969; Protosenia, 1964; Olevyannyi and Amusin, 1974; Amusin, 1977; Alimzhanov, 1977; Fisenko, 1972; Guz, 1977). Mroz and Staroo (1977) proposed using the continuous model to describe the brittle-plastic properties of rocks. This model simulates the time-indepen dent properties of a progressively cracking medium. In studies based on the elastic model numerical methods have extensively been used and developed. They will not, however, be discussed in this book. We shall mention here the finite element method, which is broadly discussed by Zienkiewicz (1972), and the limit-element method devised by Brady and Bray (1977). These methods have found wide application in rock mass mech anics in solving two- and three-dimensional boundary problems, especially those involving excavations of complex shapes. Another numerical method for studying three-dimensional problems of rock mass mechanics based on the theory of elasticity has been proposed by Deist, Salomon and Georgiadis (1974). Although using two basic models of the rock mass, these studies have explained several phenomena that accompany mining, many vital problems encountered in modern mining have not been solved. Among them we may mention rock bursts in mines, gas-rock eruptions in rock masses that contain free or absorbed gases, and the influence of faults on the rock mass and on the ground surface. Moreover, laboratory examinations carried out on rock samples have proved that plastic deformations develop in rocks from the very beginning of load application. To deal with all these problems, the author proposes a model based on the continuous dislocation theory, which describes the elastic-plastic state of deformation developed in a rock mass. As applied to problems of rock mass mechanics this model belongs to the group of con tinuous elastic models that contain internal stress sources. It has two basic features: 1. It does not assume that plastic deformations in a rock mass can only be induced when the stress acting in it exceeds a certain definite value. 2. It assumes that the distribution of the Burgers vector in the rock mass is continuous. As to the first feature, the model is identical to Gilman's (1965) model proposed for describing dislocation movements and verified experimentally for certain Carboniferous rocks. The second feature implies that the tensor of plastic strain in the rock mass be known and that the tensor of dislocation density be expressed in terms of this tensor. MECHANICS OF ROCK MASSES AND CONTINUOUS MEDIA 5 0.2 Interrelation between the mechanics of rock masses and the mechanics of continuous media The development of the separate line of research in rock mass mechanics that makes use of continuous mathematical models provides a sufficient proof that the methods of the mechanics of continuous media can be used successfully in rock mass mechanics. The development of the mechanics of continuous media, in particular the theory of elasticity, rheology, the theory of plasticity, and the dislocation theory, contributes to the development of rock mass mechanics. The methods developed by these disciplines enable us to describe the complex phenomena occurring in rock masses more and more precisely. It should, however, be noted that none of the models so far constructed describes the behaviour of a rock mass disturbed by mining to an accuracy sufficient for practical purposes. The individual models do, however, permit us to study the behaviour of rocks in selected regions of the rock mass. For example, the process of unloading of the rock mass that surrounds narrow excavations is a typical elastic process and has successfully been examined using linear elastic models. The behaviour of rocks in the vicinity of longwalls is sufficiently represented by visco-elastic models. The elastic-plastic properties of seams when plastic and elastic deformations developed in them are of the same order of magnitude can be described by the dislocation model. Finally, the effect of cracking is well represented by the brittle-plastic model. The mining engineer supervising a mining project constructed under complex geological conditions may use several different models and combine them to obtain the required accuracy. 1. Rock masses disturbed by mining 1.1 General characteristics of rock masses As defined from the point of view of rock mechanics, a rock mass is that portion of the Earth's crust in which man carries out or plans to carry out mining of deposits. The rock mass is a medium showing a great variety of distinct properties which depend not only on the properties of the individual rocks of which it is built up but also on its entire mass. This means that the phenomena occurring in rocks manifest themselves in the laboratory in ways other than in nature. Rocks have a very complex structure. They are heterogeneous and de­ formed, which affects the properties of the rock mass to a great extent. If the rock mass is, in addition, saturated with water, its strength is considerably reduced. One of the most characteristic structural features of a rock mass is that it contains planes of reduced cohesion, such as planes of stratification and cleav­ age. These planes form an almost orthogonal system cutting the rock mass into blocks parallelepipedal in shape. A cross-section cut through one such plane shows traces of the remaining planes, forming a net. This net may be dense or loose. Dense nets may be found in weak rocks such as schists or car­ bons, whereas loose nets occur in very strong rocks such as sandstones with a silica cement. The pattern in which the planes of reduced cohesion are distributed in a rock mass essentially affects the behaviour of rocks surrounding mining excavations made in it. This is so since the tensile and shear strength of the rock is greatly reduced in these planes. Other important properties of rock masses are their stratification and pri­ mary stressing. Rock layers of considerable strength occur alternately with layers of weak rocks, so that the properties of adjacent layers of a rock mass differ in a step-wise manner. In Poland, the stress component acting in the direction of gravity increases by about 245 χ 104 N/m2 per each 100 m depth. This is the cause of the primary stressing of rocks.

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