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E-book
Author Savruk, Mykhaylo P., author

Title Stress concentration at notches / Mykhaylo P. Savruk, Andrzej Kazberuk
Published Switzerland : Springer, [2017]

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Description 1 online resource : illustrations
Contents Preface; Contents; Acronyms; 1 Method of Singular Integral Equations in Application to Problems of the Theory of Elasticity; 1.1 Basic Relationships of the Plane Theory of Elasticity; 1.1.1 Basic Equations; 1.1.2 Complex Representation of General Solution for Equations of Plane Theory of Elasticity; 1.2 System of Curvilinear Cracks in Elastic Plane; 1.2.1 Selected Information Concerning the Theory of Analytical Functions; 1.2.2 Single Curvilinear Crack; 1.2.3 System of Curvilinear Cracks; 1.3 System of Curvilinear Holes and Cracks in Elastic Body; 1.3.1 Multiply Connected Region with Holes
1.3.2 Multiply Connected Region with Holes and Cracks1.4 Numerical Solution of Singular Integral Equations; 1.4.1 Quadrature Formulas; 1.4.2 Integral Equation on an Open Contour; 1.4.3 Integral Equation on a Closed Contour; References; 2 Stress Distribution in Elastic Plane with a Semi-infinite Notch; 2.1 Methods for Stress Analysis in Notched Bodies; 2.2 Eigensolutions of Elasticity Theory Plane Problem for Wedge; 2.2.1 Characteristic Equations; 2.2.2 Stress Intensity Factors in V-Notch Tip; 2.2.3 Constructing General Solution Using Eigenfunctions
2.3 Semi-infinite Curvilinear Notches in Elastic Plane2.3.1 Parabolic Notch; 2.3.2 Hyperbolic Notch; 2.3.3 Curvilinear Notch of Special Shape; 2.4 Rounded V-Notch Under Symmetrical Loading; 2.4.1 Problem Definition and Reduction to Singular Integral Equation; 2.4.2 Symmetrical Stress Distribution in Plane with Rounded V-Notch; 2.5 Rounded V-Notch Under Mixed Loading; 2.5.1 Antisymmetric Stress Distribution; 2.5.2 Complex-Stressed State; References; 3 Elastic Plane with Semi-infinite Notch and Cracks; 3.1 Elastic Wedge with Edge Crack at Notch Tip
3.1.1 Solutions Obtained Using Wiener -- Hopf Method3.1.2 Approximate Closed-Form Solution for Symmetrical Loading; 3.2 Edge Crack System in Semi-infinite Rounded V-Notch Tip; 3.2.1 Reduction of Problem to Singular Integral Equations; 3.2.2 Numerical Solution of Singular Integral Equations; 3.3 Symmetrical Edge Crack in Rounded V-Notch Tip; 3.4 Two Symmetrical Edge Cracks in Rounded V-Notch Tip; References; 4 Deformation Fracture Criterion for Bodies with Notches; 4.1 Fracture Criteria for Notched Solid Bodies; 4.2 Model of Plasticity Bands in Fracture Mechanics; 4.2.1 Plane Stress State
4.2.2 Plane Strain State4.3 Infinite Wedge with Plasticity Bands; 4.3.1 Plane Stress State; 4.3.2 Plane Strain State; 4.4 Plasticity Band Near Rounded V-Notch; 4.5 Two Plasticity Bands Near Rounded V-Notch; References; 5 Stress Concentration Near Hole in Elastic Plane; 5.1 Elliptical Hole; 5.1.1 Stress Concentration Near Elliptical Hole; 5.1.2 Limit Transition to Parabolic Notch; 5.1.3 Stress Distribution Around Notch Tip; 5.2 Oval Hole; 5.2.1 Stress Concentration Near Narrow Slot; 5.2.2 Stress Concentration Near Oval Hole; 5.2.3 Limit Transition to Two-Tip Lens-Like Hole; 5.3 Rhombic Hole
Summary This book compiles solutions of linear theory of elasticity problems for isotropic and anisotropic bodies with sharp and rounded notches. It contains an overview of established and recent achievements, and presents the authors? original solutions in the field considered with extensive discussion. The volume demonstrates through numerous, useful examples the effectiveness of singular integral equations for obtaining exact solutions of boundary problems of the theory of elasticity for bodies with cracks and notches. Incorporating analytical and numerical solutions of the problems of stress concentrations in solid bodies with crack-like defects, this volume is ideal for scientists and PhD students dealing with the problems of theory of elasticity and fracture mechanics. Stands as a modern and extensive compendium of solutions to the problems of linear theory of elasticity of isotropic and anisotropic bodies with sharp and rounded notches; Adopts a highly reader-friendly layout of tables, charts, approximation formulas suitable for use in research and engineering practice; Presents stress concentration factors calculated for blunt notches as well as smooth transition to the stress intensity factors for sharp notches; Includes a comprehensive survey of established and recent achievements in the field
Bibliography Includes bibliographical references
Notes Print version record
Subject Fracture mechanics -- Mathematical models
Stress concentration.
Integral equations.
Maths for engineers.
Classical mechanics.
Integral calculus & equations.
Mechanics of solids.
TECHNOLOGY & ENGINEERING -- Engineering (General)
TECHNOLOGY & ENGINEERING -- Reference.
Fracture mechanics -- Mathematical models
Integral equations
Stress concentration
Form Electronic book
Author Kazberuk, Andrzej, author
ISBN 9783319445557
3319445553