• Produktbild: Elasticity of Transversely Isotropic Materials
  • Produktbild: Elasticity of Transversely Isotropic Materials
Band 126

Elasticity of Transversely Isotropic Materials

138,99 €

inkl. gesetzl. MwSt., Versandkostenfrei

Lieferung nach Hause

Beschreibung

Produktdetails

Einband

Taschenbuch

Erscheinungsdatum

18.11.2010

Verlag

Springer Netherland

Seitenzahl

435

Maße (L/B/H)

23,5/15,5/2,5 cm

Gewicht

720 g

Auflage

1. Auflage

Sprache

Englisch

ISBN

978-90-481-7018-0

Beschreibung

Rezension

From the reviews:



"The authors’ main goal is to provide an introduction to the theory and applications of mechanics of transversely isotropic elastic materials. … Additional notes and bibliography to chapters, special functions and nomenclature are included in three appendices. … this book is written to meet the needs of modern topics on mechanics of transversely isotropic elastic solids. … It seems to be a useful reference book on the subject. … the book can be considered as an important contribution to the engineering literature." (Lokenath Debnath, Zentralblatt MATH, Vol. 1101 (3), 2007)


"Ideally and emphatically Elasticity of Transversely Isotropic Materials may claim to be the first monograph on mechanics of transversely isotropic materials, which is unique, covers topics of practical importance and provides many references for the reader. Engineers, production and field engineers in engineering disciplines;, designers, and researchers in industry who are interested in the solution of transversely isotropic elastic materials will find this text an inviting study … . a pleasure and an education to read. It is simply brilliant." (Current Engineering Practice, 2007)

Produktdetails

Einband

Taschenbuch

Erscheinungsdatum

18.11.2010

Verlag

Springer Netherland

Seitenzahl

435

Maße (L/B/H)

23,5/15,5/2,5 cm

Gewicht

720 g

Auflage

1. Auflage

Sprache

Englisch

ISBN

978-90-481-7018-0

Herstelleradresse

Springer-Verlag KG
Sachsenplatz 4-6
1201 Wien
AT

Email: GPSR Kontakt

Noch keine Bewertungen vorhanden

Verfassen Sie die erste Bewertung zu diesem Artikel

Helfen Sie anderen Kundinnen und Kunden durch Ihre Meinung.

Kundinnen und Kunden meinen

Bewertungen (0)

  • Produktbild: Elasticity of Transversely Isotropic Materials
  • Produktbild: Elasticity of Transversely Isotropic Materials
  • Preface;
    Chapter 1 BASIC EQUATIONS OF ANISOTROPIC ELASTICITY:
    1.1 Transformation of Strains and Stresses; 1.2 Basic Equations; 1.2.1 Geometric equations; 1.2.2 Equations of motion; 1.2.3 Constitutive equations; 1.3 Boundary and Initial Conditions; 1.3.1 Boundary conditions; 1.3.2 Initial conditions; 1.4 Thermoelasticity.
    Chapter 2 GENERAL SOLUTION FOR TRANSVERSELY ISOTROPIC PROBLEMS:
    2.1 Governing Equations; 2.1.1 Methods of solution; 2.1.2 Governing equations for the displacement method 2.1.3 Equations for a mixed method — the state-space method; 2.2 Displacement Method; 2.2.1 General solution in Cartesian coordinates; 2.2.2 General solution in cylindrical coordinates; 2.3 Stress Method for Axisymmetric Problems 2.4 Displacement Method for Spherically Isotropic Bodies; 2.4.1 General solution; 2.4.2 Relationship between transversely isotropic and spherically isotropic solutions.
    Chapter 3 PROBLEMS FOR INFINITE SOLIDS:
    3.1 The Unified Point Force Solution; 3.1.1 A point force perpendicular to the isotropic plane; 3.1.2 A point force within the isotropic plane; 3.2 The Point Force Solution for an Infinite Solid Composed of two Half-Spaces; 3.2. 1 A point force perpendicular to the isotropic plane; 3.2.2 A point force within the isotropic plane; 3.2.3 Some remarks; 3.3 An Infinite Transversely Isotropic Space with an Inclusions; 3.4 Spherically Isotropic Materials; 3.4.1 An infinite space subjected to a point force; 3.4.2 Stress concentration in neighbourhood of a spherical cavity.
    Chapter 4 HALF-SPACE AND LAYERED MEDIA:
    4.1 Unified Solution for a Half-Space Subjected to a Surface Point Force; 4.1.1 A point force normal to the half-space surface; 4.1.2 A point force tangential to the half-space surface; 4.2 A Half-Space Subjected to an Interior Point Force; 4.2. 1 A point force normal to the half-space surface; 4.2.2 A point force tangential to the half-spacesurface; 4.3 General Solution by Fourier Transform; 4.4 Point Force Solution of an Elastic Layer; 4.5 Layered Elastic Media.
    Chapter 5 EQUILIBRIUM OF BODIES OF REVOLUTION:
    5.1 Some Harmonic Functions; 5.1.1 Harmonic polynomials; 5.1.2 Harmonic functions containing ln(r I ij ); 5.1.3 Harmonic functions containing R; 5.2 An Annular (Circular) Plate Subjected to Axial Tension and Radial Compression; 5.3 An Annular (Circular) Plate Subjected to Pure Bending; 5.4 A Simply-Supported Annular (Circular) Plate Under Uniform Transverse Loading; 5.5 A Uniformly Rotating Annular (Circular) Plate; 5.6 Transversely Isotropic Cones; 5.6.1 Compression of a cone under an axial force; 5.6.2 Bending of a cone under a transverse force; 5.7 Spherically Isotropic Cones; 5.7.1. Equilibrium and boundary conditions; 5.7.2. A cone under tip forces; 5.7.3. A cone under concentrated moments at its apex; 5.7.4. Conical shells.
    Chapter 6 THERMAL STRESSES:
    6.1 Transversely Isotropic Materials; 6.2 A Different General Solution for Transversely Isotropic Thermoelasticity; 6.2. 1 General solution for dynamic problems; 6.2.2 General solution for static problems; 6.3 Spherically Isotropic Materials.
    Chapter 7 FRICTIONAL CONTACT:
    7.1 Two Elastic Bodies in Contact; 7.1.1 Mathematical description of a contact system; 7.1.2 Deformation of transversely isotropic bodies under frictionless contact; 7.1.3 A half-space under point forces; 7.2 Contact of a Sphere with a Half-Space; 7.2.1 Contact with normal loading; 7.2.2 Contact with tangential loading; 7.3 Contact of a Cylindrical Punch with a Half-Space; 7.3.1 Contact with normal loading; 7.3.2 Contact with tangential loading; 7.4 Indentation by a Cone; 7.4.1 Contact with normal loading; 7.4.2 Contact with tangential loading; 7.5 Inclined Contact of a Cylindrical Punch with a Half-Space; 7.5.1 Contact with normal loading; 7.5.2 Contact with tangential loading; 7.6 Discussions on Solu