» » Numerical Methods in Rock Mechanics (Wiley Series in Numerical Methods in Engineering)

Download Numerical Methods in Rock Mechanics (Wiley Series in Numerical Methods in Engineering) fb2

by G. N. Pande
Download Numerical Methods in Rock Mechanics (Wiley Series in Numerical Methods in Engineering) fb2
Engineering
  • Author:
    G. N. Pande
  • ISBN:
    0471920215
  • ISBN13:
    978-0471920212
  • Genre:
  • Publisher:
    John Wiley & Sons Inc (June 1, 1990)
  • Pages:
    376 pages
  • Subcategory:
    Engineering
  • Language:
  • FB2 format
    1374 kb
  • ePUB format
    1528 kb
  • DJVU format
    1755 kb
  • Rating:
    4.1
  • Votes:
    383
  • Formats:
    doc lit rtf mbr


The most important methods used in numerical modelling, and their applications, are described. Reference lists direct the reader to a more detailed study of individual methods and applications.

The most important methods used in numerical modelling, and their applications, are described. Numerical methods in rock mechanics are FE and BE methods in rock mechanical applications. A great book for engineers in mining and tunneling engineering.

Start by marking Numerical Methods In Rock Mechanics as Want to Read . There have been important changes in rock mechanics during the last decade. This book reflects these changes, particularly in the use of computational methods

Start by marking Numerical Methods In Rock Mechanics as Want to Read: Want to Read savin. ant to Read. This book reflects these changes, particularly in the use of computational methods. It covers the properties and behaviour of rocks, and the ways in which these can be modelled numerically.

About the Authors Vladislav A. Yastrebov is a postdoctoral-fellow in Computational Solid Mechanics at MINES ParisTech in France

About the Authors Vladislav A. Yastrebov is a postdoctoral-fellow in Computational Solid Mechanics at MINES ParisTech in France. His work in computational contact mechanics was recognized by the CSMA award and by the Prix Paul Caseau of the French Academy of Technology and Electricité de France. Looks like you are currently in Russia but have requested a page in the United States site. Would you like to change to the United States site?

The finite element method (FEM) is a powerful numerical method, which is used as a computational technique for the solution of differential equations that arise in various fields of engineering and applied sciences.

The finite element method (FEM) is a powerful numerical method, which is used as a computational technique for the solution of differential equations that arise in various fields of engineering and applied sciences. The finite element method is based on the concept that one can replace any continuum by an assemblage of simply shaped elements, called finite elements with well-defined force, displacement, and material relationships.

Pande, G. Beer, and J. Williams, Numerical Methods in Rock Mechanics (Wiley, New York, 1990). A. V. Favorskaya, I. B. Petrov, D. I. Petrov, and N. Khokhlov, Numerical modeling of wave processes in layered media in the Arctic region, Math. zbMATHGoogle Scholar. 3. T. Belytschko, M. Plesha, and C. H. Dowding, A computer method for stability analysis of caverns in jointed rock, Int. J. Numer. CrossRefGoogle Scholar. 4. C. Dowding, T. Belytschko, and H. Yen, Dynamic computational analysis of openings in jointed rock, J. Geotech. Eng. 109, 1551–1566 (1983).

The three most commonly used numerical methods are considered: finite element,boundary element and A direct in situ stress monitoring system has been developed, discrete element. Deformation behaviour of intact rock and in which stress change is inferred from the reaction of a slen- rock masses is first introduced. The finite element method is der, compliant cavity to transient variations of the surround- then examined in detail, plus joint elements, infinite elements, ing stress field. A liquid filled pressurised cell provides the and constitutive models for jointed rocks

Fluid motion is governed by the Navier–Stokes equations, a set of coupled and nonlinear partial differential equations derived from the basic laws of conservation of mass, momentum and energy.

Fluid motion is governed by the Navier–Stokes equations, a set of coupled and nonlinear partial differential equations derived from the basic laws of conservation of mass, momentum and energy. The unknowns are usually the flow velocity, the pressure and density and temperature. The analytical solution of this equation is impossible hence scientists resort to laboratory experiments in such situations.

Numerical methods in rock mechanics$. 1. Introduction Because rock mechanics modelling has developed for the design of rock engineering structures in different circumstances and different purposes, and because different modelling techniques have been developed, we now have a wide spectrum of modelling and design approaches. These approaches can be presented in different ways.

There have been important changes in rock mechanics during the last decade. This book reflects these changes, particularly in the use of computational methods. It covers the properties and behaviour of rocks, and the ways in which these can be modelled numerically. The most important methods used in numerical modelling, and their applications, are described. Reference lists direct the reader to a more detailed study of individual methods and applications.