000 05276nam a22005295i 4500
001 978-3-030-93138-4
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008 230612s2023 sz | s |||| 0|eng d
020 _a9783030931384
_9978-3-030-93138-4
050 4 _aTA349-359
072 7 _aTGMD
_2bicssc
072 7 _aSCI096000
_2bisacsh
072 7 _aTGMD
_2thema
082 0 4 _a620.105
_223
100 1 _aHashiguchi, Koichi.
_eauthor.
_4aut
_4http://id.loc.gov/vocabulary/relators/aut
245 1 0 _aFoundations of Elastoplasticity: Subloading Surface Model
_h[electronic resource] /
_cby Koichi Hashiguchi.
250 _a4th ed. 2023.
264 1 _aCham :
_bSpringer International Publishing :
_bImprint: Springer,
_c2023.
300 _aXX, 853 p. 551 illus., 179 illus. in color.
_bonline resource.
336 _atext
_btxt
_2rdacontent
337 _acomputer
_bc
_2rdamedia
338 _aonline resource
_bcr
_2rdacarrier
347 _atext file
_bPDF
_2rda
500 _aAcceso multiusuario
505 0 _aMathematical Preliminaries: Vector and Tensor Analysis -- Description of Motion -- Description of Tensor (Rate) in Convected Coordinate System -- Deformation/Rotation Tensors -- Stress Tensors and Conservation Laws -- Objectivity and Objective (Rate) Tensors -- Elastic Constitutive Equations -- Elastoplastic Constitutive Equations -- Unconventional Elastoplasticity Model: Subloading Surface model -- Cyclic Plasticity Model: Critical Reviews and Assessments -- Extended Subloading Surface Model -- Constitutive Equations of Metals -- Constitutive Equations of Soils -- Subloading-overstress model -- Subloading-Damage Model -- Subloading Phase-transformation Model -- Multiplicative Hyperelastic-based Plasticity with Subloading Surface Concept -- Viscoelastic-viscoplastic Model of Polymers -- Corotational Rate Tensors -- Localization of Deformation -- Hypoelastic- and Multiplicative Hyperelastic-based Crystal Plasticity -- Constitutive Equation for Friction: Subloading-friction Model.
520 _aThis book is the standard text book for elastoplasticity which is explained comprehensively covering the rate-independent to -dependent finite deformations, soils, polymers, crystal plasticity, etc. and the friction phenomenon. Concise explanations on vector-tensor analysis and continuum mechanics are provided first, covering the underlying physical concepts, e.g. various time-derivatives, pull-back and push-forward operations, work-conjugacy and multiplicative decomposition of deformation gradient tensor. Then, the rigorous elastoplastic/viscoplastic models are explained comprehensively, which are based on the subloading surface model incorporating the crucially important variable "normal-yield ratio" in order to describe the continuous development of the plastic/viscoplastic strain rate with the approach to the yield stress but can never be described by the other plasticity models, e.g. the Chaboche-Ohno and the Dafalias-Yoshida models assuming the purely-elastic domain. The main of them are as follows: 1) The subloading surface concept underling the cyclic plasticity is introduced, which insists that the plastic deformation develops as the stress approaches the yield surface. Thus, the smooth elastic-plastic transition leading to the continuous variation of the tangent stiffness modulus is described always. 2) The subloading-overstress model is formulated by which the elastoplastic deformation during the quasi-static loading and the viscoplastic deformation during the dynamic and impact loading can be described by the unified equation. Then, only this model can be used to describe the deformation in the general rate of deformation, disusing the elastoplastic constitutive equation. 3) The hyperelastic-based (visco)plasticity based on the multiplicative decomposition of deformation gradient tensor and the subloading surface model is formulated for the exact descriptions of the finite elastic and (visco)plastic deformations. 4) The subloading-friction model is formulated for the exact description of the dry and the fluid (lubricated) frictions at the general rate of sliding from the static to the impact sliding. Thus, all the elastic and inelastic deformation/sliding phenomena of solids can be described accurately in the unified equation by the subloading-overstress model. The subloading surface model will be engraved as the governing law of irreversible deformation of solids in the history of solid mechanics. .
541 _fUABC ;
_cPerpetuidad
650 0 _aMechanics, Applied.
650 0 _aSolids.
650 0 _aMechanics.
650 1 4 _aSolid Mechanics.
650 2 4 _aClassical Mechanics.
710 2 _aSpringerLink (Online service)
773 0 _tSpringer Nature eBook
776 0 8 _iPrinted edition:
_z9783030931377
776 0 8 _iPrinted edition:
_z9783030931391
776 0 8 _iPrinted edition:
_z9783030931407
856 4 0 _zLibro electrónico
_uhttp://libcon.rec.uabc.mx:2048/login?url=https://doi.org/10.1007/978-3-030-93138-4
912 _aZDB-2-ENG
912 _aZDB-2-SXE
942 _cLIBRO_ELEC
999 _c261802
_d261801