MECHANICS OF MATERIALS. EQUATIONS AND THEOREMS
|
|
- Matilda Strickland
- 6 years ago
- Views:
Transcription
1 1 MECHANICS OF MATERIALS. EQUATIONS AND THEOREMS Version Stress tensor Definition of traction vector (1) Cauchy theorem (2) Equilibrium (3) Invariants (4) (5) (6) or, written in terms of principal stresses, (7) (8) (9) Coordinate transformation (10) or, inverted (11)
2 2 Stress deviator (12) Stress deviator invariants (13) Displacement and strain Definition of displacement (14) Definition of infinitesimal strain (15) Engineering shear ; (16) Voigt notation of stress and strain Elastic anisotropy A material is symmetric with respect to the transformation if (17) or, using Voigt notation (18)
3 3 where L is the transformation matrix for the transformation in Voigt notation: (19) Stiffness (C) and engineering compliance (S) matrices for some important classes of materials Linearly orthotropic material (20) and (21) In Eq. (21), the actual number of independent material constants is reduced to 9 by the relations (22) Transversely isotropic material (symmetry axis ) (23) and
4 4 (24) In Eq. (23), the actual number of independent material constants is reduced to 5 by the relation (25) Plasticity. Yield criteria Flow function and equivalent stress: von Mises (26) Flow function and equivalent stress: Tresca (27) Plasticity. Flow rules General (28) (29) (30) Perfect plasticity (31)
5 5 Perfect plasticity, von Mises (32) where the equivalent plastic strain increment d is defined as (33) Isotropic hardening, von Mises (34) or, in most cases, (35) where (36) (cf Eq. (31)). Flow rule: (37) or (38) Linear isotropic hardening, von Mises (39) Eqs. (37) and (38) can now be simplified into (40) and (41) (since during plastic flow).
6 6 In the uniaxial tensile test, during plastic flow Kinematic hardening, von Mises The hardening is described by a backstress (42) The flow rule is (43) Kinematic hardening, Prager/von Mises Prager s linear hypothesis: (44) This leads to a simplified expression for the flow rule: (45) In the uniaxial tensile test, during plastic flow (Note the factor 3/2 in the denominator, which is a difference against the corresponding isotropic uniaxial test!) Plasticity. Computational aspects Continuum tangent stiffness matrix (46) where is the continuum tangent matrix. has the following principal structure: (47) One common way of writing it in detail is
7 7 (48) Viscoplasticity Additive decomposition: (49) Norton uniaxial creep law for stationary creep (50) Multiaxial creep laws (51) with Stationary creep (von Mises/Norton/Odqvist) (52) Multiplicative isotropic hardening (53) Perzyna overstress model (54) Viscoelasticity Maxwell material (55) (56)
8 8 (57) Kelvin material (58) (59) (60) Standard linear solid (61) (62) (63) Relaxation modulus The Laplace transform of the relaxation modulus can be computed from the Laplace transform of the creep compliance as (64) Hereditary integrals For a given stress history, the strain response can be computed as the hereditary integral (65) or, in the Laplace transform space, (66) For a given strain history, the stress response can be computed as the hereditary integral
9 9 (67) or, in the Laplace transform space, (68) Multiaxial hereditary integral (69) or, split into a deviator ( and a bulk ( part (70) (71) In analogy with the previous uniaxial hereditary integrals, these can also be written as Laplacetransformed equations [cf Eq. (68)]: (be careful with the notations here: is the full 4 th order relaxation modulus tensor, while is the shear modulus; is the stress deviator, while is the Laplace space variable) These equations can be used together with the viscoelastic correspondence principle for solving multiaxial problems. (72) (73) (74) Damage Isotropic damage postulate (75) which replaces in the constitive laws. For instance, in linear elasticity: (76)
10 10 or, if (77) (78) Elastic damage: evolution law (79) ( is the maximum experienced value of the largest principal strain during the elastic history, is a fracture strain, and is a threshold strain.) Plastic damage: evolution lkaw (80) where is the critical damage Creep damage: Kachanov damage evolution law: (81) in which (82) where is the largest principal stress and is von Mises equivalent stress.
MHA042 - Material mechanics: Duggafrågor
MHA042 - Material mechanics: Duggafrågor 1) For a static uniaxial bar problem at isothermal (Θ const.) conditions, state principle of energy conservation (first law of thermodynamics). On the basis of
More informationConstitutive models: Incremental plasticity Drücker s postulate
Constitutive models: Incremental plasticity Drücker s postulate if consistency condition associated plastic law, associated plasticity - plastic flow law associated with the limit (loading) surface Prager
More informationThe Finite Element Method II
[ 1 The Finite Element Method II Non-Linear finite element Use of Constitutive Relations Xinghong LIU Phd student 02.11.2007 [ 2 Finite element equilibrium equations: kinematic variables Displacement Strain-displacement
More informationConstitutive Relations
Constitutive Relations Dr. Andri Andriyana Centre de Mise en Forme des Matériaux, CEMEF UMR CNRS 7635 École des Mines de Paris, 06904 Sophia Antipolis, France Spring, 2008 Outline Outline 1 Review of field
More informationFINITE ELEMENT ANALYSIS OF COMPOSITE MATERIALS
FINITE ELEMENT ANALYSIS OF COMPOSITE MATERIALS Ever J. Barbero Department of Mechanical and Aerospace Engineering West Virginia University USA CRC Press Taylor &.Francis Group Boca Raton London New York
More informationContinuum Mechanics and Theory of Materials
Peter Haupt Continuum Mechanics and Theory of Materials Translated from German by Joan A. Kurth Second Edition With 91 Figures, Springer Contents Introduction 1 1 Kinematics 7 1. 1 Material Bodies / 7
More informationMODELING OF CONCRETE MATERIALS AND STRUCTURES. Kaspar Willam. Uniaxial Model: Strain-Driven Format of Elastoplasticity
MODELING OF CONCRETE MATERIALS AND STRUCTURES Kaspar Willam University of Colorado at Boulder Class Meeting #3: Elastoplastic Concrete Models Uniaxial Model: Strain-Driven Format of Elastoplasticity Triaxial
More informationLecture 8. Stress Strain in Multi-dimension
Lecture 8. Stress Strain in Multi-dimension Module. General Field Equations General Field Equations [] Equilibrium Equations in Elastic bodies xx x y z yx zx f x 0, etc [2] Kinematics xx u x x,etc. [3]
More informationDEVELOPMENT OF A CONTINUUM PLASTICITY MODEL FOR THE COMMERCIAL FINITE ELEMENT CODE ABAQUS
DEVELOPMENT OF A CONTINUUM PLASTICITY MODEL FOR THE COMMERCIAL FINITE ELEMENT CODE ABAQUS Mohsen Safaei, Wim De Waele Ghent University, Laboratory Soete, Belgium Abstract The present work relates to the
More informationELASTOPLASTICITY THEORY by V. A. Lubarda
ELASTOPLASTICITY THEORY by V. A. Lubarda Contents Preface xiii Part 1. ELEMENTS OF CONTINUUM MECHANICS 1 Chapter 1. TENSOR PRELIMINARIES 3 1.1. Vectors 3 1.2. Second-Order Tensors 4 1.3. Eigenvalues and
More informationIndex 297. Comparison of explicit and implicit formulations,
Index Symbols 4th rank tensor of material anisotropy, 168 60 symmetry property, 162, 163 J-type plastic yield surface, 278 α-titanium, 201, 205, 214, 240 Ł62 brass, 184 2090-T3 Aluminum alloy, 270 4-rank
More informationMODELING OF CONCRETE MATERIALS AND STRUCTURES. Kaspar Willam
MODELING OF CONCRETE MATERIALS AND STRUCTURES Class Meeting #1: Fundamentals Kaspar Willam University of Colorado at Boulder Notation: Direct and indicial tensor formulations Fundamentals: Stress and Strain
More informationReference material Reference books: Y.C. Fung, "Foundations of Solid Mechanics", Prentice Hall R. Hill, "The mathematical theory of plasticity",
Reference material Reference books: Y.C. Fung, "Foundations of Solid Mechanics", Prentice Hall R. Hill, "The mathematical theory of plasticity", Oxford University Press, Oxford. J. Lubliner, "Plasticity
More informationModule-4. Mechanical Properties of Metals
Module-4 Mechanical Properties of Metals Contents ) Elastic deformation and Plastic deformation ) Interpretation of tensile stress-strain curves 3) Yielding under multi-axial stress, Yield criteria, Macroscopic
More informationDurability of bonded aircraft structure. AMTAS Fall 2016 meeting October 27 th 2016 Seattle, WA
Durability of bonded aircraft structure AMTAS Fall 216 meeting October 27 th 216 Seattle, WA Durability of Bonded Aircraft Structure Motivation and Key Issues: Adhesive bonding is a key path towards reduced
More informationUniversity of Sheffield The development of finite elements for 3D structural analysis in fire
The development of finite elements for 3D structural analysis in fire Chaoming Yu, I. W. Burgess, Z. Huang, R. J. Plank Department of Civil and Structural Engineering StiFF 05/09/2006 3D composite structures
More informationMODELING OF CONCRETE MATERIALS AND STRUCTURES. Kaspar Willam. Isotropic Elastic Models: Invariant vs Principal Formulations
MODELING OF CONCRETE MATERIALS AND STRUCTURES Kaspar Willam University of Colorado at Boulder Class Meeting #2: Nonlinear Elastic Models Isotropic Elastic Models: Invariant vs Principal Formulations Elastic
More informationConstitutive Relations
Constitutive Relations Andri Andriyana, Ph.D. Centre de Mise en Forme des Matériaux, CEMEF UMR CNRS 7635 École des Mines de Paris, 06904 Sophia Antipolis, France Spring, 2008 Outline Outline 1 Review of
More information202 Index. failure, 26 field equation, 122 force, 1
Index acceleration, 12, 161 admissible function, 155 admissible stress, 32 Airy's stress function, 122, 124 d'alembert's principle, 165, 167, 177 amplitude, 171 analogy, 76 anisotropic material, 20 aperiodic
More informationConstitutive Equations
Constitutive quations David Roylance Department of Materials Science and ngineering Massachusetts Institute of Technology Cambridge, MA 0239 October 4, 2000 Introduction The modules on kinematics (Module
More informationMathematical Background
CHAPTER ONE Mathematical Background This book assumes a background in the fundamentals of solid mechanics and the mechanical behavior of materials, including elasticity, plasticity, and friction. A previous
More information2. Mechanics of Materials: Strain. 3. Hookes's Law
Mechanics of Materials Course: WB3413, Dredging Processes 1 Fundamental Theory Required for Sand, Clay and Rock Cutting 1. Mechanics of Materials: Stress 1. Introduction 2. Plane Stress and Coordinate
More informationCONSTITUTIVE MODELING OF ENGINEERING MATERIALS - THEORY AND COMPUTATION Volume I General Concepts and Inelasticity
CONSTITUTIVE MODELING OF ENGINEERING MATERIALS - THEORY AND COMPUTATION Volume I General Concepts and Inelasticity by Kenneth Runesson, Paul Steinmann, Magnus Ekh and Andreas Menzel Preface There seems
More informationEnhancing Prediction Accuracy In Sift Theory
18 TH INTERNATIONAL CONFERENCE ON COMPOSITE MATERIALS Enhancing Prediction Accuracy In Sift Theory J. Wang 1 *, W. K. Chiu 1 Defence Science and Technology Organisation, Fishermans Bend, Australia, Department
More informationFundamentals of Linear Elasticity
Fundamentals of Linear Elasticity Introductory Course on Multiphysics Modelling TOMASZ G. ZIELIŃSKI bluebox.ippt.pan.pl/ tzielins/ Institute of Fundamental Technological Research of the Polish Academy
More informationTheory of Plasticity. Lecture Notes
Theory of Plasticity Lecture Notes Spring 2012 Contents I Theory of Plasticity 1 1 Mechanical Theory of Plasticity 2 1.1 Field Equations for A Mechanical Theory.................... 2 1.1.1 Strain-displacement
More informationTABLE OF CONTENTS. Mechanics of Composite Materials, Second Edition Autar K Kaw University of South Florida, Tampa, USA
Mechanics of Composite Materials, Second Edition Autar K Kaw University of South Florida, Tampa, USA TABLE OF CONTENTS 1. INTRODUCTION TO COMPOSITE MATERIALS 1.1 Introduction... 1.2 Classification... 1.2.1
More informationRheology. October 2013
Rheology Georges Cailletaud Centre des Matériaux MINES ParisTech/CNRS October 2013 Georges Cailletaud Rheology 1/44 Contents 1 Mechanical tests Structures Representative material elements 2 Rheological
More informationThe Finite Element Method for the Analysis of Non-Linear and Dynamic Systems. Prof. Dr. Eleni Chatzi Lecture ST1-19 November, 2015
The Finite Element Method for the Analysis of Non-Linear and Dynamic Systems Prof. Dr. Eleni Chatzi Lecture ST1-19 November, 2015 Institute of Structural Engineering Method of Finite Elements II 1 Constitutive
More informationPlasticity R. Chandramouli Associate Dean-Research SASTRA University, Thanjavur
Plasticity R. Chandramouli Associate Dean-Research SASTRA University, Thanjavur-613 401 Joint Initiative of IITs and IISc Funded by MHRD Page 1 of 9 Table of Contents 1. Plasticity:... 3 1.1 Plastic Deformation,
More informationComputational Inelasticity FHLN05. Assignment A non-linear elasto-plastic problem
Computational Inelasticity FHLN05 Assignment 2017 A non-linear elasto-plastic problem General instructions A written report should be submitted to the Division of Solid Mechanics no later than October
More informationSEMM Mechanics PhD Preliminary Exam Spring Consider a two-dimensional rigid motion, whose displacement field is given by
SEMM Mechanics PhD Preliminary Exam Spring 2014 1. Consider a two-dimensional rigid motion, whose displacement field is given by u(x) = [cos(β)x 1 + sin(β)x 2 X 1 ]e 1 + [ sin(β)x 1 + cos(β)x 2 X 2 ]e
More informationLectures on. Constitutive Modelling of Arteries. Ray Ogden
Lectures on Constitutive Modelling of Arteries Ray Ogden University of Aberdeen Xi an Jiaotong University April 2011 Overview of the Ingredients of Continuum Mechanics needed in Soft Tissue Biomechanics
More informationLecture #8: Ductile Fracture (Theory & Experiments)
Lecture #8: Ductile Fracture (Theory & Experiments) by Dirk Mohr ETH Zurich, Department of Mechanical and Process Engineering, Chair of Computational Modeling of Materials in Manufacturing 2015 1 1 1 Ductile
More informationPLASTICITY AND VISCOPLASTICITY UNDER CYCLIC LOADINGS
ATHENS Course MP06 Nonlinear Computational Mechanics March 16 to 20, 2009 PLASTICITY AND VISCOPLASTICITY UNDER CYCLIC LOADINGS Jean-Louis Chaboche ONERA, 29 av. de la Division Leclerc 92320 Châtillon,
More informationWhat we should know about mechanics of materials
What we should know about mechanics of materials 0 John Maloney Van Vliet Group / Laboratory for Material Chemomechanics Department of Materials Science and Engineering Massachusetts Institute of Technology
More informationDEFORMATION THEORY OF PLASTICITY
DEFORMATION THEORY OF PLASTICITY ROBERT M. JONES Professor Emeritus of Engineering Science and Mechanics Virginia Polytechnic Institute and State University Blacksburg, Virginia 240610219 Bull Ridge Publishing
More informationHÅLLFASTHETSLÄRA, LTH Examination in computational materials modeling
HÅLLFASTHETSLÄRA, LTH Examination in computational materials modeling TID: 2016-28-10, kl 14.00-19.00 Maximalt 60 poäng kan erhållas på denna tenta. För godkänt krävs 30 poäng. Tillåtet hjälpmedel: räknare
More informationMechanics PhD Preliminary Spring 2017
Mechanics PhD Preliminary Spring 2017 1. (10 points) Consider a body Ω that is assembled by gluing together two separate bodies along a flat interface. The normal vector to the interface is given by n
More informationCONSIDERATIONS CONCERNING YIELD CRITERIA INSENSITIVE TO HYDROSTATIC PRESSURE
CONSIDERATIONS CONCERNING YIELD CRITERIA INSENSITIVE TO HYDROSTATIC PRESSURE ADRIAN SANDOVICI, PAUL-DORU BARSANESCU Abstract. For distinguishing between pressure insensitive and pressure sensitive criteria,
More informationA Constitutive Framework for the Numerical Analysis of Organic Soils and Directionally Dependent Materials
Dublin, October 2010 A Constitutive Framework for the Numerical Analysis of Organic Soils and Directionally Dependent Materials FracMan Technology Group Dr Mark Cottrell Presentation Outline Some Physical
More informationCourse No: (1 st version: for graduate students) Course Name: Continuum Mechanics Offered by: Chyanbin Hwu
Course No: (1 st version: for graduate students) Course Name: Continuum Mechanics Offered by: Chyanbin Hwu 2011. 11. 25 Contents: 1. Introduction 1.1 Basic Concepts of Continuum Mechanics 1.2 The Need
More informationNon-linear and time-dependent material models in Mentat & MARC. Tutorial with Background and Exercises
Non-linear and time-dependent material models in Mentat & MARC Tutorial with Background and Exercises Eindhoven University of Technology Department of Mechanical Engineering Piet Schreurs July 7, 2009
More informationConcept Question Comment on the general features of the stress-strain response under this loading condition for both types of materials
Module 5 Material failure Learning Objectives review the basic characteristics of the uni-axial stress-strain curves of ductile and brittle materials understand the need to develop failure criteria for
More information3D Elasticity Theory
3D lasticity Theory Many structural analysis problems are analysed using the theory of elasticity in which Hooke s law is used to enforce proportionality between stress and strain at any deformation level.
More informationAnisotropic modeling of short fibers reinforced thermoplastics materials with LS-DYNA
Anisotropic modeling of short fibers reinforced thermoplastics materials with LS-DYNA Alexandre Hatt 1 1 Faurecia Automotive Seating, Simplified Limited Liability Company 1 Abstract / Summary Polymer thermoplastics
More informationLecture #6: 3D Rate-independent Plasticity (cont.) Pressure-dependent plasticity
Lecture #6: 3D Rate-independent Plasticity (cont.) Pressure-dependent plasticity by Borja Erice and Dirk Mohr ETH Zurich, Department of Mechanical and Process Engineering, Chair of Computational Modeling
More informationChapter 6: Plastic Theory
OHP Mechanical Properties of Materials Chapter 6: Plastic Theory Prof. Wenjea J. Tseng 曾文甲 Department of Materials Engineering National Chung Hsing University wenjea@dragon.nchu.edu.tw Reference: W. F.
More informationEsben Byskov. Elementary Continuum. Mechanics for Everyone. With Applications to Structural Mechanics. Springer
Esben Byskov Elementary Continuum Mechanics for Everyone With Applications to Structural Mechanics Springer Contents Preface v Contents ix Introduction What Is Continuum Mechanics? "I Need Continuum Mechanics
More informationANSYS Mechanical Basic Structural Nonlinearities
Lecture 4 Rate Independent Plasticity ANSYS Mechanical Basic Structural Nonlinearities 1 Chapter Overview The following will be covered in this Chapter: A. Background Elasticity/Plasticity B. Yield Criteria
More informationNonlinear Theory of Elasticity. Dr.-Ing. Martin Ruess
Nonlinear Theory of Elasticity Dr.-Ing. Martin Ruess geometry description Cartesian global coordinate system with base vectors of the Euclidian space orthonormal basis origin O point P domain of a deformable
More informationMITOCW MITRES2_002S10nonlinear_lec15_300k-mp4
MITOCW MITRES2_002S10nonlinear_lec15_300k-mp4 The following content is provided under a Creative Commons license. Your support will help MIT OpenCourseWare continue to offer high quality educational resources
More informationMECH 5312 Solid Mechanics II. Dr. Calvin M. Stewart Department of Mechanical Engineering The University of Texas at El Paso
MECH 5312 Solid Mechanics II Dr. Calvin M. Stewart Department of Mechanical Engineering The University of Texas at El Paso Table of Contents Thermodynamics Derivation Hooke s Law: Anisotropic Elasticity
More informationClassical fracture and failure hypotheses
: Chapter 2 Classical fracture and failure hypotheses In this chapter, a brief outline on classical fracture and failure hypotheses for materials under static loading will be given. The word classical
More informationThe Effect of Evolving Damage on the Finite Strain Response of Inelastic and Viscoelastic Composites
Materials 2009, 2, 858-894; doi:0.3390/ma204858 Article OPEN ACCESS materials ISSN 996-944 www.mdpi.com/journal/materials The Effect of Evolving Damage on the Finite Strain Response of Inelastic and Viscoelastic
More informationMeasurement of deformation. Measurement of elastic force. Constitutive law. Finite element method
Deformable Bodies Deformation x p(x) Given a rest shape x and its deformed configuration p(x), how large is the internal restoring force f(p)? To answer this question, we need a way to measure deformation
More informationComposite Structures. Indian Institute of Technology Kanpur
Mechanics of Laminated Composite Structures Nachiketa Tiwari Indian Institute of Technology Kanpur Lecture 23 Analysis of an Orthotropic Ply Lecture Overview Introduction Engineering constants for an 2
More informationLoading σ Stress. Strain
hapter 2 Material Non-linearity In this chapter an overview of material non-linearity with regard to solid mechanics is presented. Initially, a general description of the constitutive relationships associated
More informationHERCULES-2 Project. Deliverable: D4.4. TMF model for new cylinder head. <Final> 28 February March 2018
HERCULES-2 Project Fuel Flexible, Near Zero Emissions, Adaptive Performance Marine Engine Deliverable: D4.4 TMF model for new cylinder head Nature of the Deliverable: Due date of the Deliverable:
More informationCrash and Impact Simulation of Composite Structures by Using CAE Process Chain
Crash and Impact Simulation of Composite Structures by Using CAE Process Chain Madhukar Chatiri 1, Thorsten Schütz 2, Anton Matzenmiller 3, Ulrich Stelzmann 1 1 CADFEM GmbH, Grafing/Munich, Germany, mchatiri@cadfem.de
More informationViscoelastic Structures Mechanics of Growth and Aging
Viscoelastic Structures Mechanics of Growth and Aging Aleksey D. Drozdov Institute for Industrial Mathematics Ben-Gurion University of the Negev Be'ersheba, Israel ACADEMIC PRESS San Diego London Boston
More informationElements of Continuum Elasticity. David M. Parks Mechanics and Materials II February 25, 2004
Elements of Continuum Elasticity David M. Parks Mechanics and Materials II 2.002 February 25, 2004 Solid Mechanics in 3 Dimensions: stress/equilibrium, strain/displacement, and intro to linear elastic
More informationBulk Metal Forming II
Bulk Metal Forming II Simulation Techniques in Manufacturing Technology Lecture 2 Laboratory for Machine Tools and Production Engineering Chair of Manufacturing Technology Prof. Dr.-Ing. Dr.-Ing. E.h.
More information1. Background. is usually significantly lower than it is in uniaxial tension
NOTES ON QUANTIFYING MODES OF A SECOND- ORDER TENSOR. The mechanical behavior of rocks and rock-like materials (concrete, ceramics, etc.) strongly depends on the loading mode, defined by the values and
More informationMMJ1133 FATIGUE AND FRACTURE MECHANICS A - INTRODUCTION INTRODUCTION
A - INTRODUCTION INTRODUCTION M.N.Tamin, CSMLab, UTM Course Content: A - INTRODUCTION Mechanical failure modes; Review of load and stress analysis equilibrium equations, complex stresses, stress transformation,
More informationPressure Vessels Stresses Under Combined Loads Yield Criteria for Ductile Materials and Fracture Criteria for Brittle Materials
Pressure Vessels Stresses Under Combined Loads Yield Criteria for Ductile Materials and Fracture Criteria for Brittle Materials Pressure Vessels: In the previous lectures we have discussed elements subjected
More informationThe Influence of Strain Amplitude, Temperature and Frequency on Complex Shear Moduli of Polymer Materials under Kinematic Harmonic Loading
Mechanics and Mechanical Engineering Vol. 21, No. 1 (2017) 157 170 c Lodz University of Technology The Influence of Strain Amplitude, Temperature and Frequency on Complex Shear Moduli of Polymer Materials
More informationExercise: concepts from chapter 8
Reading: Fundamentals of Structural Geology, Ch 8 1) The following exercises explore elementary concepts associated with a linear elastic material that is isotropic and homogeneous with respect to elastic
More informationConstitutive models: Incremental (Hypoelastic) Stress- Strain relations. and
Constitutive models: Incremental (Hypoelastic) Stress- Strain relations Example 5: an incremental relation based on hyperelasticity strain energy density function and 14.11.2007 1 Constitutive models:
More informationUnderstand basic stress-strain response of engineering materials.
Module 3 Constitutive quations Learning Objectives Understand basic stress-strain response of engineering materials. Quantify the linear elastic stress-strain response in terms of tensorial quantities
More informationFatigue Damage Development in a Steel Based MMC
Fatigue Damage Development in a Steel Based MMC V. Tvergaard 1,T.O/ rts Pedersen 1 Abstract: The development of fatigue damage in a toolsteel metal matrix discontinuously reinforced with TiC particulates
More informationFailure surface according to maximum principal stress theory
Maximum Principal Stress Theory (W. Rankin s Theory- 1850) Brittle Material The maximum principal stress criterion: Rankin stated max principal stress theory as follows- a material fails by fracturing
More information7.6 Stress in symmetrical elastic beam transmitting both shear force and bending moment
7.6 Stress in symmetrical elastic beam transmitting both shear force and bending moment à It is more difficult to obtain an exact solution to this problem since the presence of the shear force means that
More informationF7. Characteristic behavior of solids
F7. Characteristic behavior of solids F7a: Deformation and failure phenomena: Elasticity, inelasticity, creep, fatigue. à Choice of constitutive model: Issues to be considered è Relevance? Physical effect
More informationSiping Road 1239, , Shanghai, P.R. China
COMPARISON BETWEEN LINEAR AND NON-LINEAR KINEMATIC HARDENING MODELS TO PREDICT THE MULTIAXIAL BAUSCHINGER EFFECT M.A. Meggiolaro 1), J.T.P. Castro 1), H. Wu 2) 1) Department of Mechanical Engineering,
More informationME 7502 Lecture 2 Effective Properties of Particulate and Unidirectional Composites
ME 75 Lecture Effective Properties of Particulate and Unidirectional Composites Concepts from Elasticit Theor Statistical Homogeneit, Representative Volume Element, Composite Material Effective Stress-
More informationStress, Strain, Mohr s Circle
Stress, Strain, Mohr s Circle The fundamental quantities in solid mechanics are stresses and strains. In accordance with the continuum mechanics assumption, the molecular structure of materials is neglected
More informationEngineering Sciences 241 Advanced Elasticity, Spring Distributed Thursday 8 February.
Engineering Sciences 241 Advanced Elasticity, Spring 2001 J. R. Rice Homework Problems / Class Notes Mechanics of finite deformation (list of references at end) Distributed Thursday 8 February. Problems
More informationLecture 7 Constitutive Behavior of Asphalt Concrete
Lecture 7 Constitutive Behavior of Asphalt Concrete What is a Constitutive Model? A constitutive model or constitutive equation is a relation between two physical quantities that is specific to a material
More informationNonlinear FE Analysis of Reinforced Concrete Structures Using a Tresca-Type Yield Surface
Transaction A: Civil Engineering Vol. 16, No. 6, pp. 512{519 c Sharif University of Technology, December 2009 Research Note Nonlinear FE Analysis of Reinforced Concrete Structures Using a Tresca-Type Yield
More informationFEM for elastic-plastic problems
FEM for elastic-plastic problems Jerzy Pamin e-mail: JPamin@L5.pk.edu.pl With thanks to: P. Mika, A. Winnicki, A. Wosatko TNO DIANA http://www.tnodiana.com FEAP http://www.ce.berkeley.edu/feap Lecture
More informationPrerequisites and co-requisites/ Recommended optional programme components :
PLASTICITY THEORY Course contents: The class presents the fundamentals of plasticity theory. This course aims to give a concise overview of the current state of the plasticity theory, and then to show
More informationDepartment of Computing and Software
Department of Computing and Software Faculty of Engineering McMaster University Commonality Analysis for a Family of Material Models by S. Smith, J. McCutchan and J. Carette C.A.S. Report Series CAS-17-01-SS
More informationVISCOELASTIC PROPERTIES OF POLYMERS
VISCOELASTIC PROPERTIES OF POLYMERS John D. Ferry Professor of Chemistry University of Wisconsin THIRD EDITION JOHN WILEY & SONS New York Chichester Brisbane Toronto Singapore Contents 1. The Nature of
More informationMODELING OF ELASTO-PLASTIC MATERIALS IN FINITE ELEMENT METHOD
MODELING OF ELASTO-PLASTIC MATERIALS IN FINITE ELEMENT METHOD Andrzej Skrzat, Rzeszow University of Technology, Powst. Warszawy 8, Rzeszow, Poland Abstract: User-defined material models which can be used
More informationPlastic Anisotropy: Relaxed Constraints, Theoretical Textures
1 Plastic Anisotropy: Relaxed Constraints, Theoretical Textures Texture, Microstructure & Anisotropy Last revised: 11 th Oct. 2016 A.D. Rollett 2 The objective of this lecture is to complete the description
More information2 CONSTITUTIVE MODELS: THEORY AND IMPLEMENTATION
CONSTITUTIVE MODELS: THEORY AND IMPLEMENTATION 2-1 2 CONSTITUTIVE MODELS: THEORY AND IMPLEMENTATION 2.1 Introduction There are twelve basic constitutive models provided in, arranged into null, elastic
More informationA Simple and Accurate Elastoplastic Model Dependent on the Third Invariant and Applied to a Wide Range of Stress Triaxiality
A Simple and Accurate Elastoplastic Model Dependent on the Third Invariant and Applied to a Wide Range of Stress Triaxiality Lucival Malcher Department of Mechanical Engineering Faculty of Tecnology, University
More information(MPa) compute (a) The traction vector acting on an internal material plane with normal n ( e1 e
EN10: Continuum Mechanics Homework : Kinetics Due 1:00 noon Friday February 4th School of Engineering Brown University 1. For the Cauchy stress tensor with components 100 5 50 0 00 (MPa) compute (a) The
More informationQUESTION BANK Composite Materials
QUESTION BANK Composite Materials 1. Define composite material. 2. What is the need for composite material? 3. Mention important characterits of composite material 4. Give examples for fiber material 5.
More informationCombined Isotropic-Kinematic Hardening Laws with Anisotropic Back-stress Evolution for Orthotropic Fiber-Reinforced Composites
Combined Isotropic-Kinematic Hardening Laws with Antropic Back-stress Evolution for Orthotropic Fiber- Reinforced Composites Combined Isotropic-Kinematic Hardening Laws with Antropic Back-stress Evolution
More informationTIME-DEPENDENT MESOSCOPIC MODELLING OF MASONRY USING EMBEDDED WEAK DISCONTINUITIES
XI International Conference on Computational Plasticity. Fundamentals and Applications COMPLAS 2011 E. Oñate and D.R.J. Owen (Eds) TIME-DEPENDENT MESOSCOPIC MODELLING OF MASONRY USING EMBEDDED WEAK DISCONTINUITIES
More informationMicroplane Model formulation ANSYS, Inc. All rights reserved. 1 ANSYS, Inc. Proprietary
Microplane Model formulation 2010 ANSYS, Inc. All rights reserved. 1 ANSYS, Inc. Proprietary Table of Content Engineering relevance Theory Material model input in ANSYS Difference with current concrete
More informationFinite Element Method in Geotechnical Engineering
Finite Element Method in Geotechnical Engineering Short Course on + Dynamics Boulder, Colorado January 5-8, 2004 Stein Sture Professor of Civil Engineering University of Colorado at Boulder Contents Steps
More information06 - concept of stress concept of stress concept of stress concept of stress. me338 - syllabus. definition of stress
holzapfel nonlinear solid mechanics [2000], chapter 3, pages 109-129 holzapfel nonlinear solid mechanics [2000], chapter 3, pages 109-129 1 2 me338 - syllabus definition of stress stress [ stres] is a
More informationGlossary. Glossary of Symbols. Glossary of Roman Symbols Glossary of Greek Symbols. Contents:
Glossary Glossary of Symbols Contents: Glossary of Roman Symbols Glossary of Greek Symbols Glossary G-l Glossary of Roman Symbols The Euclidean norm or "two-norm." For a vector a The Mooney-Rivlin material
More informationChapter 1. Continuum mechanics review. 1.1 Definitions and nomenclature
Chapter 1 Continuum mechanics review We will assume some familiarity with continuum mechanics as discussed in the context of an introductory geodynamics course; a good reference for such problems is Turcotte
More informationSimulation of Impact and Fragmentation with the Material Point Method
Simulation of Impact and Fragmentation with the Material Point Method Biswajit Banerjee J. Guilkey, T. Harman, J. Schmidt, P. McMurtry Center for the Simulation of Accidental Fires and xplosions University
More informationInternational Journal of Pure and Applied Mathematics Volume 58 No ,
International Journal of Pure and Applied Mathematics Volume 58 No. 2 2010, 195-208 A NOTE ON THE LINEARIZED FINITE THEORY OF ELASTICITY Maria Luisa Tonon Department of Mathematics University of Turin
More informationASSESSMENT OF MIXED UNIFORM BOUNDARY CONDITIONS FOR PREDICTING THE MACROSCOPIC MECHANICAL BEHAVIOR OF COMPOSITE MATERIALS
ASSESSMENT OF MIXED UNIFORM BOUNDARY CONDITIONS FOR PREDICTING THE MACROSCOPIC MECHANICAL BEHAVIOR OF COMPOSITE MATERIALS Dieter H. Pahr and Helmut J. Böhm Institute of Lightweight Design and Structural
More information